Global Index

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D

E

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G

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I

J

K

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N

O

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Q

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T

U

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other

(2626 entries)

Notation Index

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Q

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other

(22 entries)

Variable Index

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J

K

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Q

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other

(767 entries)

Library Index

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J

K

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O

P

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other

(105 entries)

Lemma Index

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E

F

G

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J

K

L

M

N

O

P

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other

(514 entries)

Constructor Index

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J

K

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O

P

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other

(32 entries)

Axiom Index

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C

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E

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G

H

I

J

K

L

M

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O

P

Q

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other

(1 entry)

Projection Index

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C

D

E

F

G

H

I

J

K

L

M

N

O

P

Q

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other

(215 entries)

Inductive Index

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B

C

D

E

F

G

H

I

J

K

L

M

N

O

P

Q

R

S

T

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Y

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other

(17 entries)

Section Index

A

B

C

D

E

F

G

H

I

J

K

L

M

N

O

P

Q

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T

U

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other

(236 entries)

Definition Index

A

B

C

D

E

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G

H

I

J

K

L

M

N

O

P

Q

R

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other

(647 entries)

Record Index

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C

D

E

F

G

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I

J

K

L

M

N

O

P

Q

R

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X

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Z

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other

(70 entries)

---

Global Index

A

about_isIso.a [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.H' [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.T1 [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.H [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.h [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.T [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.G [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.F [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.B [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.A [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso [section, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Adj [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adjoint [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
AdjointUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
Adjunction [library]
Adjunction1 [library]
Adj_FunFreeMon_FunForget [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_FunFreeMon]
adj_to_ua.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Adj_eq6 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq5 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq4 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq3 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.g [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.f [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.k [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.h [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.c' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.d' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.g [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.f [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.k [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.h [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.c' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.d' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_r [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_l [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi_iso [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi_1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_equiv.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj_to_Adj1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj_FunFreeMon [library]
Adj_UA [library]
Adj1 [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_to_Adj [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_iso.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_iso [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_1_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_1_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.ad [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_law2 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_law1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws.eps [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws.eta [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
AFT1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
AFT1' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
AFT2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
Antisymmetric [definition, in ConCaT.RELATIONS.Relations]
Ap [projection, in ConCaT.SETOID.Map]
ApAphi [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
ApAphi_inv [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
AphiPres [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Aphi_invPres [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
ApMop [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
ApNT [projection, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Ap' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ap'' [projection, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Ap''0 [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Ap0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Ap2 [definition, in ConCaT.SETOID.Map2]
Ap2' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ap2'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
AreBij0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
AreIsos [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
AreNatIsos [definition, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Arrow [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Arrs [record, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
arrs_setoid_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
arrs_setoid_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Ass [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Assoc_CatFunct [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Assoc_SET [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Assoc_Discr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Assoc_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Assoc_FSC [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Assoc_MON [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Assoc_One [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Assoc_PA [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Assoc_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Assoc_PULB [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Assoc_Comma [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Assoc_Dual [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
assoc_horz_comp.T'' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.T' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.T [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G'' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F'' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.D [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.C [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.B [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.A [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp [section, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Assoc_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Assoc_PROD [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Assoc_CAT [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Ass1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Ast [definition, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Ast_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Ast_eq [lemma, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
At_most_1mor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
A_eps [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
A_eta [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]

B

BasicTypes [library]
Beta_rule_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
bij0'' [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
bij0''.A [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
bij0''.B [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Binary_Products [library]
BinOp [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
BinProd [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
BinProd' [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
bp_def.bp_laws.Op [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Proj2_prod [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Proj1_prod [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Obj_prod [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
BP1_to_BP [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Build_Discr_mor [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Build_Map2 [definition, in ConCaT.SETOID.Map2]
Build_noetherian [constructor, in ConCaT.RELATIONS.Noetherian]
Build_Equal_hom [constructor, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Build_Comp'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Build_CoCone [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Build_Map2'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Build_Adj [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Build_Comp' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Build_Pmor1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Build_POb1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Build_Map2' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Build_Cone [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Build_Comp [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Build1_Pmor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]

C

Carrier [projection, in ConCaT.SETOID.Setoid]
Carrier' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Carrier'' [projection, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Cartesian [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Cartesian1 [library]
Car_BP1 [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Car_terminal1 [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Car_Cat [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Car_BP [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Car_terminal [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Car1_to_Car [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
cat [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CAT [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
CAT [library]
Category [record, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Category [library]
Category_dup1 [library]
Category_dup2 [library]
Category' [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Category'' [record, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
CatFunct [library]
CatProperty [library]
cat_functor.id_catfunct_def.F [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.id_catfunct_def [section, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.T' [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.T [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.H [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.G [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.F [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt [section, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.D [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.C [variable, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor [section, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Cat_comp'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Cat_comp' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat_cong.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat_cong [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Cat_comp [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat' [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'' [section, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Hom'' [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Id'' [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Ob'' [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Op_comp'' [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat'.Hom' [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Id' [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Ob' [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Op_comp' [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat.Hom [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Id [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Ob [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Op_comp [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
_ o _ [notation, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
_ --> _ [notation, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CCC [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC [library]
CCC_Car [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC_exponent [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC_isCar [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC1 [library]
CCC1_to_CCC [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
CCC1_exponent [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
CCC1_Car [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Check_S_equaz_constr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
Check_S_pulb_constr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
Cldiese_map [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoAdjoint [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
CoadjointUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoAdjUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
Cocomplete [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoCone [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoCone_law [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Codiese_map [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Codom [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Coherence [projection, in ConCaT.SETOID.Setoid]
Coherence [library]
coherent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
coherent_symmetric [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Colim [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Colimit [record, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit [library]
colimit_def.iscolimit_def.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit_law2 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit_law1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit_eq [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.colimit_laws.cl_diese [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.colimit_laws [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.nu [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.colim [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.J [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Colim_diese [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Comma [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comma [library]
CommaI [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Comma_proj [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_mor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.comma_proj_map_def.b [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.comma_proj_map_def.a [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.comma_proj_map_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_ob [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.x [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.G [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.X [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_complete [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Comma_l_F1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Comma_l_F [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.ctdiese.t [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.ctdiese.axf [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.ctdiese [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.l_GF' [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.l_F' [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.F' [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.x [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.G_pres_JA [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.A_comp_for_J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.G [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.A [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.X [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_def.comp_com_def.g [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.f [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.cxh [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.bxg [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.axf [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def.bxg [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def.axf [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.x [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.G [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.X [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comma_UA [library]
Comma_proj [library]
Comma_Complete [library]
Comp [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CompH_NT_assoc [lemma, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
CompH_NT [definition, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Complete [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
composition_to_operator''.c [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.b [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.a [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.pcgr [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.pcgl [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.Cfun [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.H [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.A [variable, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator'' [section, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator'.c [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.b [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.a [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.pcgr [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.pcgl [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.Cfun [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.H [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator' [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.pcgr [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.pcgl [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.Cfun [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.H [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CompV_NT_congr [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
CompV_NT_congl [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
CompV_NT [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_CatFunct [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_tau_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_tau [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_SET [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_map_congr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_map_congl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_Discr [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_Discr_congr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_Discr_congl [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_Discr_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_map [definition, in ConCaT.SETOID.Map]
Comp_fun_map_law [lemma, in ConCaT.SETOID.Map]
Comp_fun [definition, in ConCaT.SETOID.Map]
Comp_FSC [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Comp_MON [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_congr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_congl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_op_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_unit_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_map [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m3 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m2 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon [section, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_One [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_One_mor_congr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_One_mor_congl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_One_mor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_PA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_congr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_congl [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact4 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact3 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
comp_functor_prop.G1 [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.F1 [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.G [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.F [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.E [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.D [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Comp_PULB [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_PULB_congr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_PULB_congl [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_PULB_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_Functor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_Functor_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_Functor_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMap [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMap_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.comp_functor_map.b [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.comp_functor_map.a [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.comp_functor_map [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FOb [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.H [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.G [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.E [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.D [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_Comma [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_congr [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_congl [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_arrow [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_mor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_Dual [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_dual_congr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_dual_congl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_Darrow [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_cone [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_cone_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_cone_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.G [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.T [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.c [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.C [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_lr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_r [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_l [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_PROD [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Pmor_congr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Pmor_congl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Pmor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_CAT [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Comp_Functor_congr [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Comp_Functor_congl [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Comp' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Comp'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Com_UA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_isUA [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_UAlaw2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_UAlaw1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_arrow_setoid [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Com_arrow [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Com_law [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Com_ob [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Concat [definition, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat_map2 [definition, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat_congr [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat_congl [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat1 [constructor, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Cond1 [record, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Cond1_f [projection, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Cond1_i [projection, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Cond2 [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Cond2_t [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Cond2_i [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Cone [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Cones [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Cone_law [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Confluence [section, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Confluence [library]
Confluence.R [variable, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Confluence.U [variable, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Confluent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
confluent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Congl_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Congl_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Congl_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Congr_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Congr_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Congr_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Cong_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Cong_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Cong_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Const [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const [library]
constFun [section, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def.a2 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def.a1 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_id_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_comp_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_mor_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Contains [definition, in ConCaT.RELATIONS.Relations]
Continuous [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
CoUA [record, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.u1 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.u1 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.u [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1 [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1 [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_unic1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_unic [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diag1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diag [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_mor [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_ob [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.t [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diese [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_law2 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_law1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_eq [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.coua_laws.co_diese [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.coua_laws [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.u [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1_to_CoUA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUnit [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_coUAlaw2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_coUAlaw1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_arrow_diese [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_NT [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
CoUnit_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
CoUnit_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
CoUnit' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUniversalArrow [library]
Co_EqC1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Co_EqC [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]

D

def_cocone.cocone_nt.p [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.cocone_nt.T [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.cocone_nt [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.c [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.J [variable, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone [section, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cone.cone_nt.p [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.cone_nt.T [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.cone_nt [section, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.c [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.J [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone [section, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_pres_limits.G [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.C [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Dfunctor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_ob [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def.F [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DHom [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Diag [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diagonal [library]
Diag_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag_hasprod1.diag_prod1.together1_def.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.together1_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.ua' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.b [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.H [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag.diag_map_def.b [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag.diag_map_def.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag.diag_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diese_map [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Diff_Concat1_Empty [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Discr [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Discr [library]
discrete [section, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.disc_mor_setoid.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.disc_mor_setoid.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.disc_mor_setoid [section, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.U [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Discr_mor_ind1 [axiom, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Discr_mor_setoid [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Discr_mor [inductive, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Dist_map_op_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_map_unit_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_fun [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dom [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Dual [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Dual [library]
Dual_Functor [library]
d_cat.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
d_cat [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]

E

Elt [constructor, in ConCaT.SETOID.BasicTypes]
Elt_sub [projection, in ConCaT.SETOID.Setoid_prop]
Elt1 [constructor, in ConCaT.SETOID.BasicTypes]
Elt2 [constructor, in ConCaT.SETOID.BasicTypes]
Empty [constructor, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
EmptyType [inductive, in ConCaT.SETOID.BasicTypes]
Endo_Monoid [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
endo_mon.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
endo_mon.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
endo_mon [section, in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
Epic [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Epic_mor [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Epic_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Epic_Equalizer_iso [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Epic_Equalizer_id [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
EqC [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
EqC1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Equal [projection, in ConCaT.SETOID.Setoid]
EqualH_NT [definition, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Equalizer [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizers [library]
Equalizers1 [library]
equalizer_limit_def.e1_diese_def.p [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.e1_diese_def.h [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.e1_diese_def.r [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.e1_diese_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.k [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.I [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer_iso [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_law3 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_law2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_law1 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_eq [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer1_hom [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer1_fg [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer2 [record, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer2_to_Equalizer [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equal_Discr_mor_equiv [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Equal_Discr_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Equal_Arrs_equiv [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_Arrs [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_trans [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.h [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.j [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.i [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_sym [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.d [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_refl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv [section, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom [inductive, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_SubType_equiv [lemma, in ConCaT.SETOID.Setoid_prop]
Equal_SubType [definition, in ConCaT.SETOID.Setoid_prop]
Equal_MonMor_equiv [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Equal_MonMor [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
Equal_One_mor_equiv [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Equal_One_mor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equal_one_mor.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equal_one_mor.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equal_one_mor [section, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Equal_PA_mor_Equiv [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Equal_PA_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Equal_Single_equiv [lemma, in ConCaT.SETOID.Single]
Equal_Single [definition, in ConCaT.SETOID.Single]
Equal_NT_equiv [lemma, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Equal_NT [definition, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Equal_PULB_mor_equiv [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Equal_PULB_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Equal_Functor_equiv [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Equal_Functor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Equal_com_arrow_equiv [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Equal_com_arrow [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Equal_Sprod_equiv [lemma, in ConCaT.SETOID.SetoidPROD]
Equal_Sprod [definition, in ConCaT.SETOID.SetoidPROD]
Equal_Tlist_equiv [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Equal_Tlist [definition, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Equal_Pmor_equiv [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Equal_Pmor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Equal' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Equal'' [projection, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
equaz_hom.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_hom.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_hom.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_hom [section, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.g [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.f [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg [section, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.E_diese [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.e [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.k [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.I [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equivalence [record, in ConCaT.RELATIONS.Relations]
Equiv_preorder [definition, in ConCaT.RELATIONS.Relations]
Eq_Mor_prod [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eq_coCone [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Eq_Nat_equiv [lemma, in ConCaT.SETOID.Setoid]
Eq_Nat [definition, in ConCaT.SETOID.Setoid]
Eq_abb'a' [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Eq_Adj1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Eq_Adj [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Eq_cone [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Eq_fg [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Eq1_prod_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eq1_Sprod [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Eq2_prod_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eq2_Sprod [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Eq3_prod [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eta_rule_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Eval [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Eval1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Expo [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Exponent [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Exponents [library]
expo_def.e [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Op [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Eval [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Expo [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.C1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Expo1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Ext [definition, in ConCaT.SETOID.Map]
Ext_equiv [lemma, in ConCaT.SETOID.Map]
Ext_equiv'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Ext_equiv' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ext' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ext'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
E_NT [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E_tau [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E_monic [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E_diese [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E_mor [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E_ob [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E1_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E1_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E1_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

F

FAFT_SSC2 [library]
FAFT_Part2_Proof2 [library]
FAFT_Part1 [library]
FAFT_Part2_Proof1 [library]
Faithful [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Faithful_functor0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Faithful_law0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Faithful_functor [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Faithful_law [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Faithful0'' [record, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FamI [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Fam2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
FComp [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fcomp_law0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Fcomp_law [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FComp1 [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fibred_q [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Fibred_p [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Fibred_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Fibred1_q [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fibred1_p [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fibred1_prod [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
FId [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fid_law0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Fid_law [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FId1 [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMap [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMap0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FMor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMor0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FOb [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FOb0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
forget_map_def.m2 [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
forget_map_def.m1 [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
forget_map_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FPA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_id_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_comp_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPres [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fpulb [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_id_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_comp_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.H [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.t2 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.t1 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.r [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.G [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
FreeMonoid [definition, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
FreeMonoid [library]
freem_def.A [variable, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
freem_def [section, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
freyd_th_1.cd2.t [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.i [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.h [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.r [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.f [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.I [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.x [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.la [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.A_c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.X [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.A [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_2'.uaxG'.ssc2_to_ssc1.ssc2_to_cond1.axh [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.ssc2_to_cond1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.k [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.f [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.I [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.x [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG' [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.s [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.G_c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.A_c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.X [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.A [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2' [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2.uaxG.uaxG_verif.H [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.FT_h' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.h [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.a' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.x [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.s [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.G_c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.A_c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.X [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.A [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2 [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
fscat [section, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fscat.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fscat.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fscat.I [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
FSC_inc [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def.a [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def.I [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
FSC_mor_setoid [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
FSC_inc [library]
Fst [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
FS_limit2 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_limit1 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_diese [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_diese_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_diese_mor [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_lcone [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_lim [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FT_cd2 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
FT_cd2_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
FT_UA' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
FT_UA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_h_diese_unique [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq4 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c3 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq3 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag4 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag3 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c2 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t'' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_m0 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_k [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_GP [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_GP' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_q [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_p [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_b [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_P [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_j0 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_UA_law1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_h_diese [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_i0 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq_tau [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_Apeps [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_d [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_i [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eps [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_Q [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_E [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_a [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_f [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_I [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Full [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
FullSubCat [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
FullSubCat [library]
Full_mor0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_functor0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_law0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_mor [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Full_functor [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Full_law [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Full0'' [record, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FUNCT [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Functor [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Functor [library]
FunctorProperty [library]
functor_prop0''.D [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
functor_prop0''.C [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
functor_prop0'' [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Functor_preserves_iso [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
functor_prop.D [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
functor_prop.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
functor_prop [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Functor_setoid [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Functor_dup1 [library]
Functor0'' [record, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.funct_laws0''.FMap0'' [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.funct_laws0''.FOb0'' [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.funct_laws0'' [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.D [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.C [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0'' [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_setoid.D [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_setoid.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_setoid [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws.FMap [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws.FOb [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.D [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FunDiscr [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_id_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_comp_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_arrow [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunForget [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget [library]
FunForget_fid_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_fcomp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_UA [library]
FunFreeMon [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon [library]
FunFreeMon_fid_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_fcomp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_mor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.funfreemon_mor_def.f [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.funfreemon_mor_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunOne [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne [library]
FunOne_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunProd [library]
funprod_hasexpo.funprod_expo.lambda1_def.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.lambda1_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.ua' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.b [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.H1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.H [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
FunSET [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset_nt.nth_map_def.c [variable, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.nth_map_def [section, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.f [variable, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.a [variable, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.b [variable, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.C [variable, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt [section, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
FunSET_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_mor [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_map_law1 [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_mor1 [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_ob [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_continuous [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FunSET_Preserves_l [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.fs_diese_mor_def.x [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.fs_diese_mor_def [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.tau [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.X [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.c [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.l [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.C [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset.a [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.funset_mor_def.f [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.funset_mor_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.c [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.b [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET2_l [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_map_law1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_mor1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.funset2_l_mor_def.foxg [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.funset2_l_mor_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.d2xc2 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.d1xc1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map_law1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_mor1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.funset2_r_mor_def.foxg [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.funset2_r_mor_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.d2xc2 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.d1xc1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.foxg [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.d2xc2 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.d1xc1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunY [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_id_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_comp_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_map [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_map_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
Fun_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
Fun_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
Fun_One.funone_map_def.b [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One.funone_map_def.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One.funone_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_prod [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_map [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.fun_prod_map_def.c2 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.fun_prod_map_def.c1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.fun_prod_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.C1 [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun2_to_map2.pgcr [variable, in ConCaT.SETOID.Map2]
fun2_to_map2.pgcl [variable, in ConCaT.SETOID.Map2]
fun2_to_map2.f [variable, in ConCaT.SETOID.Map2]
fun2_to_map2.C [variable, in ConCaT.SETOID.Map2]
fun2_to_map2.B [variable, in ConCaT.SETOID.Map2]
fun2_to_map2.A [variable, in ConCaT.SETOID.Map2]
fun2_to_map2 [section, in ConCaT.SETOID.Map2]
fun2_to_map2''.pgcr [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.pgcl [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.f [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.C [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.B [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.A [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2'' [section, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Fun2_l_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_l_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_r_id_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_r_comp_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
fun2_to_map2'.pgcr [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.pgcl [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.f [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2' [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
F_hom [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
F_fg [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
F12 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
F32 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

G

Ginv [projection, in ConCaT.SETOID.STRUCTURE.Group]
Gmon [projection, in ConCaT.SETOID.STRUCTURE.Group]
Group [record, in ConCaT.SETOID.STRUCTURE.Group]
Group [library]
Group_invr [definition, in ConCaT.SETOID.STRUCTURE.Group]
Group_invl [definition, in ConCaT.SETOID.STRUCTURE.Group]
group_laws.inv [variable, in ConCaT.SETOID.STRUCTURE.Group]
group_laws.A [variable, in ConCaT.SETOID.STRUCTURE.Group]
group_laws [section, in ConCaT.SETOID.STRUCTURE.Group]

H

HasBinProd [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.C1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
HasBinProd1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
HasExponent [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C2 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
HasExponent1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
HasExp1_to_HasExp [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Hom [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
HomFunctor [library]
HomFunctor_NT [library]
HomFunctor_Continuous [library]
HomFunctor2 [library]
HOM_l [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Hom_r [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Hom_l [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Hom_Equality [library]
Hom' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Hom'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
horz_comp.T' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.T [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.G' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.F' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.G [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.F [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.C [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.B [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.A [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp [section, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
H_together [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_proj2_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_proj1_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_obj_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_lambda [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
H_eval [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
H_expo [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]

I

Id [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
idCat [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
IdCAT [library]
idCat.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Idl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idlr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idl_CatFunct [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Idl_inv [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Idl_SET [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Idl_Discr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Idl_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Idl_FSC [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Idl_MON [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Idl_One [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Idl_PA [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Idl_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Idl_nat_inv [lemma, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Idl_PULB [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Idl_Comma [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Idl_Dual [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Idl_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idl_PROD [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Idl_CAT [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Idl1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idrl [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr_CatFunct [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Idr_inv [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Idr_SET [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Idr_Discr [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Idr_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Idr_FSC [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Idr_MON [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Idr_One [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Idr_PA [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Idr_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Idr_nat_inv [lemma, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Idr_PULB [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Idr_Comma [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Idr_Dual [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Idr_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr_PROD [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Idr_CAT [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Idr1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Id_CatFunct [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_CatFunct_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_CatFunct_tau [definition, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_SET [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Id_Discr [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Id_map [definition, in ConCaT.SETOID.Map]
Id_fun_map_law [lemma, in ConCaT.SETOID.Map]
Id_fun [definition, in ConCaT.SETOID.Map]
id_map_def.A [variable, in ConCaT.SETOID.Map]
id_map_def [section, in ConCaT.SETOID.Map]
Id_CAT [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_ob [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_FSC [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Id_MON [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_MON_op_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_MON_unit_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_MON_map [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
id_mon_def.m [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
id_mon_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_One [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Id_Obone [constructor, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Id_PA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Id_PULB [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Id_Comma [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Id_com_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Id_PROD [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Id' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Id'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Inc_full [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_faith [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Initial [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Initial_dual [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Initial_ob [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
initial_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
initial_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inj [record, in ConCaT.SETOID.MapProperty]
Inj_monic [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Inj_map [projection, in ConCaT.SETOID.MapProperty]
Inj_law [definition, in ConCaT.SETOID.MapProperty]
inj_surj_def.B [variable, in ConCaT.SETOID.MapProperty]
inj_surj_def.A [variable, in ConCaT.SETOID.MapProperty]
inj_surj_def [section, in ConCaT.SETOID.MapProperty]
interchangelaw [section, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
InterChangeLaw [library]
interchangelaw.A [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.B [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.C [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.F [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.F' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.G [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.G' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.H [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.H' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.T [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.T' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.U [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.U' [variable, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
InterChange_law [lemma, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Inverses [record, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_rel [definition, in ConCaT.SETOID.STRUCTURE.Group]
Inverses_group [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_invr [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_invl [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_Monoid [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_unit [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_unit_invs [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_op [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_congr [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_congl [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_comp [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_setoid [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_equiv [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_eq [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_Group [library]
Inv_iso_unique [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inv_iso [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inv_comp_invs2 [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_invs1 [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_elt_r [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_elt_l [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.inverses_comp_def.y [variable, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.inverses_comp_def.x [variable, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.inverses_comp_def [section, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_elt_r [projection, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_elt_l [projection, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.A [variable, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def [section, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
IP1 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
IP2 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
IP3 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
IsCartesian [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
IsCartesian1 [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
IsCCC [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
IsCCC1 [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
IsColimit [record, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
IsCoUA [record, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
IsCoUA1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
IsCoUA1_to_IsCoUA [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
IsFaithful_comp [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
IsFull_comp [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
IsInitial [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
IsLimit [record, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Iso [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Iso_mor [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_cone.phicone_1_fun_def.f [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.phicone_1_fun_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.c [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.J [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone [section, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
Iso_Limit [library]
IsTerminal [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
IsTerminal' [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
IsUA [record, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
IsUA_FM [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
I_unic [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

J

J_hom [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
J_fg [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

K

K_hom [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
K_fg [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

L

Ladj_continuous [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Ladj_Pres1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.lp_diese.tau [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.lp_diese.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.lp_diese [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.l [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.H [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.J [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.la [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
LAdj_iso [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_nt [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_tau_iso [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.LAdj_unit' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.LAdj_unit [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.F' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.la' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.la [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
Lambda [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Lambda_expo [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Lambda1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Lambda1_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Lambda1_mor [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Ldiese_map [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
LeftAdj [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
LeftAdjUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
LeftAdj_FunForget [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_FunFreeMon]
LeftAdj_Iso [library]
Lim [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit [record, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit [library]
Limiting_cocone [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Limiting_cone [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_law2 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_law1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_eq [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.limit_laws.l_diese [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.limit_laws [section, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.nu [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.lim [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.F [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.J [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_Adj [library]
Lim_areIso [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
Lim_diese [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Lim_EoQ [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Locally_confluent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
locally_confluent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Lp_coUAlaw2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_coUAlaw1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_diese [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_sigma [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_sigma_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_sigma_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
L_X [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
L_A [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]

M

Map [record, in ConCaT.SETOID.Map]
Map [library]
MapConst [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
MapConst_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
MapConst_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
MapProperty [library]
maps [section, in ConCaT.SETOID.Map]
maps' [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps'' [section, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''.A [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''.B [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''0 [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps''0.A [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps''0.B [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps'.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps'.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps.A [variable, in ConCaT.SETOID.Map]
maps.B [variable, in ConCaT.SETOID.Map]
maps0'' [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps0''.A [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps0''.B [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Map_law''0 [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Map_law0'' [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Map_setoid [definition, in ConCaT.SETOID.Map]
Map_law [definition, in ConCaT.SETOID.Map]
Map_setoid'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map_setoid' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map' [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map'' [record, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map''0 [record, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Map0_dup1 [library]
Map0'' [record, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Map2 [definition, in ConCaT.SETOID.Map2]
Map2 [library]
Map2_lr [lemma, in ConCaT.SETOID.Map2]
Map2_r [lemma, in ConCaT.SETOID.Map2]
Map2_l [lemma, in ConCaT.SETOID.Map2]
Map2_map_law2 [lemma, in ConCaT.SETOID.Map2]
Map2_map1 [definition, in ConCaT.SETOID.Map2]
Map2_map_law1 [lemma, in ConCaT.SETOID.Map2]
Map2_cong_law [definition, in ConCaT.SETOID.Map2]
Map2_congr_law [definition, in ConCaT.SETOID.Map2]
Map2_congl_law [definition, in ConCaT.SETOID.Map2]
Map2_alt [definition, in ConCaT.SETOID.Map2]
Map2_map_law2'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_map1'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_map_law1'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_cong_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_congr_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_congl_law'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_map_law2' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_map1' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_map_law1' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_cong_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_congr_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_congl_law' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2' [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2'' [definition, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Mass [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Mass_Inverses [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Mass_FreeMonoid [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Mass1 [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Mcarrier [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
mcomp [section, in ConCaT.SETOID.Map]
mcomp.A [variable, in ConCaT.SETOID.Map]
mcomp.B [variable, in ConCaT.SETOID.Map]
mcomp.C [variable, in ConCaT.SETOID.Map]
mcomp.f [variable, in ConCaT.SETOID.Map]
mcomp.g [variable, in ConCaT.SETOID.Map]
Midl [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Midl_Inverses [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Midl_FreeMonoid [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Midl1 [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Midr [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
Midr_Inverses [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Midr_FreeMonoid [lemma, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Midr1 [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
MMon_op [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
MMon_unit [lemma, in ConCaT.SETOID.STRUCTURE.Monoid]
MON [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
MON [library]
Monic [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Monic_inj [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Monic_mor [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Monic_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
MonMap [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
MonMor [record, in ConCaT.SETOID.STRUCTURE.Monoid]
MonMor_setoid [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
Monoid [record, in ConCaT.SETOID.STRUCTURE.Monoid]
Monoid [library]
Monoid_idr [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
Monoid_idl [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
Monoid_ass [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
_ +_M _ [notation, in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.Ap_op [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.e [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.op [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.A [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws [section, in ConCaT.SETOID.STRUCTURE.Monoid]
MonOp_law [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
MonUnit_law [definition, in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors.m2 [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors.m1 [variable, in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors [section, in ConCaT.SETOID.STRUCTURE.Monoid]
Mop [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
MorI [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
MorT [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
MorT1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
mor_prod_def.g' [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.f' [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.c' [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.b' [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.a' [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_prod_map2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_prod_l [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_prod_r [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.d [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2 [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.C1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_com_arrow [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Mor_com_ob [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Munit [projection, in ConCaT.SETOID.STRUCTURE.Monoid]

N

Nat [inductive, in ConCaT.SETOID.Setoid]
NatCond [lemma, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NatCond1 [lemma, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NatIso [record, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NatIso [library]
NatIso_inv [projection, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NatIso_mor [projection, in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.G [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.F [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.B [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.A [variable, in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def [section, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Newman [lemma, in ConCaT.RELATIONS.CONFLUENCE.NEWMAN.Newman]
Newman [library]
Noether [section, in ConCaT.RELATIONS.Noetherian]
Noetherian [definition, in ConCaT.RELATIONS.Noetherian]
noetherian [inductive, in ConCaT.RELATIONS.Noetherian]
Noetherian [library]
Noetherian_contains_Noetherian [lemma, in ConCaT.RELATIONS.Noetherian]
Noether.R [variable, in ConCaT.RELATIONS.Noetherian]
Noether.U [variable, in ConCaT.RELATIONS.Noetherian]
NT [record, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NTa_Iso [definition, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NTa_areIso [lemma, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NtH [definition, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NtH_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NtH_map [definition, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NtH_map_law [lemma, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NtH_arrow [definition, in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NTinv [definition, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NTinv_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Ntransformation [library]
NT_setoid [definition, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NT_law [definition, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.G [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.F [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.D [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.C [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def [section, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NT_Iso [definition, in ConCaT.CATEGORY_THEORY.NT.NatIso]
NT_areIso [lemma, in ConCaT.CATEGORY_THEORY.NT.NatIso]

O

Ob [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Obj_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Obj_prod1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Obone [constructor, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
OB_l [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Ob_com_ob [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Ob_r [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Ob_l [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Ob' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Ob'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
One [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
ONE [library]
One_mor_setoid [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
One_mor [inductive, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
One_ob [inductive, in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Opposite [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Opposite_map [definition, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Opposite_map_law [lemma, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Op_together [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Op_lambda [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Op_comp'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Op_together1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Op_comp' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Op_comp [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Order [record, in ConCaT.RELATIONS.Relations]
Orderings [section, in ConCaT.RELATIONS.Relations]
Orderings.R [variable, in ConCaT.RELATIONS.Relations]
Orderings.U [variable, in ConCaT.RELATIONS.Relations]

P

PA [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA [library]
Partial_equivalence [record, in ConCaT.RELATIONS.Relations]
PA_mor_setoid [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_rect [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_T [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_12_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_12_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_22_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_22_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_11_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_11_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_f [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_I2 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_I1 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_mor [inductive, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_ob [inductive, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.k [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.I [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA1 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA2 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Pb_diese [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pb1_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
PCarrier [projection, in ConCaT.SETOID.Setoid]
Pd_diese [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Pd1_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
PermCat [library]
Perm_Group [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
PhiCone_1_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_1_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_1_fun [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_1_fun_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_1_fun_tau [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_fun [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_o_PhiUA [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_tau_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_tau_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
Pi [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Pi1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Pmor [record, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
POb [record, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Pred [projection, in ConCaT.SETOID.Setoid_prop]
Preorder [record, in ConCaT.RELATIONS.Relations]
Pres [projection, in ConCaT.SETOID.Map]
Preserves_limits [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Preserves_1limit [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Pres_Limits [library]
Pres' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Pres'' [projection, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Pres''0 [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Pres0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Pres1 [lemma, in ConCaT.SETOID.Map]
Pres1' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Pres1'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_unique_together [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_eq2_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_eq1_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_pb1_law4 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law3 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_law1_fg [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law3 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_equalizer1 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_isTerminal [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isInitial [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_Iso [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isMonic [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isEpic [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isCoUA1_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA1_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_IsCoUA [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA_law2 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA_law1 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_E_law3 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_E_law2 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_E_law1 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_eta_rule [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Prf_beta_rule [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Prf_map2_cong [lemma, in ConCaT.SETOID.Map2]
Prf_map2_congr [lemma, in ConCaT.SETOID.Map2]
Prf_map2_congl [lemma, in ConCaT.SETOID.Map2]
Prf_isFull0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_isFaithful0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_Fid_law0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_Fcomp_law0'' [projection, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_eta_rule1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Prf_beta_rule1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Prf_constr [projection, in ConCaT.SETOID.Setoid_prop]
Prf_reg [projection, in ConCaT.SETOID.Setoid_prop]
Prf_MonOp_law [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_MonUnit_law [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_idr [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_idl [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_ass [projection, in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_isSurj [projection, in ConCaT.SETOID.MapProperty]
Prf_isInj [projection, in ConCaT.SETOID.MapProperty]
Prf_idr'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_idl'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_ass'' [projection, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_IsColimit [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_colimit2 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_colimit1 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_CoCone_nt_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_isFull [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Prf_isFaithful [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Prf_unique_together1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_eq2_prod1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_eq1_prod1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_map2_cong'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_map2_congr'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_map2_congl'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_equiv'' [projection, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_SSC2_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Prf_Cond2_law [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Prf_idr' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_idl' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_ass' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_PER [projection, in ConCaT.SETOID.Setoid]
Prf_equiv [projection, in ConCaT.SETOID.Setoid]
Prf_NT_law [projection, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Prf_isTerminal1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
Prf_pd_law2 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Prf_pd_law1 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Prf_ginv_r [projection, in ConCaT.SETOID.STRUCTURE.Group]
Prf_ginv_l [projection, in ConCaT.SETOID.STRUCTURE.Group]
Prf_NatIso [projection, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Prf_invs2 [projection, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Prf_invs1 [projection, in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Prf_pd1_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Prf_pd1_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Prf_map2_cong' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_map2_congr' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_map2_congl' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_equiv' [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_isCCC [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Prf_isCartesian [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Prf_Fid_law [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Prf_Fcomp_law [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Prf_Adj1_law2 [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Prf_Adj1_law1 [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Prf_Islimit [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_limit2 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_limit1 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_Cone_nt_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_pb_law4 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law3 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law2 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law1 [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_com_law [projection, in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Prf_idr [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_idl [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_ass [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_IsUA [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_isUA_law2 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_isUA_law1 [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_pequiv [projection, in ConCaT.RELATIONS.Relations]
Prf_refl [projection, in ConCaT.RELATIONS.Relations]
Prf_sym [projection, in ConCaT.RELATIONS.Relations]
Prf_trans [projection, in ConCaT.RELATIONS.Relations]
Prf_asym [projection, in ConCaT.RELATIONS.Relations]
Prf_preorder [projection, in ConCaT.RELATIONS.Relations]
Prf_trans1 [projection, in ConCaT.RELATIONS.Relations]
Prf_refl1 [projection, in ConCaT.RELATIONS.Relations]
PROD [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
PROD [library]
ProdCat [section, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def.t [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def.u [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
prodts_def.prodts_laws.Pd_diese [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.prodts_laws.Proj [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.prodts_laws.PI [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.prodts_laws [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.I [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Product [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Products [library]
products_limit_def.pd1_diese_def.f [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.pd1_diese_def.c [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.pd1_diese_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.l [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.I [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Products1 [library]
Product_law2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Product_law1 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Product_eq [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Product_nt [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Product_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Product_tau [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Product1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Product1_to_Product [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
prod_proj.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
prod_proj.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
prod_proj [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Prod_Hom' [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Prod_Hom [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
PROD_proj [library]
Proj [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Proj1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Proj1_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Proj1_prod1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Proj1_SPROD [definition, in ConCaT.SETOID.SetoidPROD]
Proj1_SPROD_map_law [lemma, in ConCaT.SETOID.SetoidPROD]
Proj2_prod [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Proj2_prod1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Proj2_SPROD [definition, in ConCaT.SETOID.SetoidPROD]
Proj2_SPROD_map_law [lemma, in ConCaT.SETOID.SetoidPROD]
prop_map2.f [variable, in ConCaT.SETOID.Map2]
prop_map2.C [variable, in ConCaT.SETOID.Map2]
prop_map2.B [variable, in ConCaT.SETOID.Map2]
prop_map2.A [variable, in ConCaT.SETOID.Map2]
prop_map2 [section, in ConCaT.SETOID.Map2]
prop_map2''.f [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.C [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.B [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.A [variable, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2'' [section, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2'.f [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.C [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.B [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.A [variable, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2' [section, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
PSetoid [record, in ConCaT.SETOID.Setoid]
PsiUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_o_PsiUA [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_tau_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_tau_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PULB [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB [library]
pulbs_def.pulbs_laws.Pb_diese [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_q [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_p [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_prod [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.b [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pulb_cone [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Pulb_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Pulb_tau [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
PULB_mor_setoid [definition, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pulb_setoid_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pulb_setoid_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pulb_setoid_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_rect [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_T [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_rect [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_T [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_rect [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_T [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_rect [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_T [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_32_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_32_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_12_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_12_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_33_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_33_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_22_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_22_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_11_ind [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_11_P [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_mor [inductive, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_ob [inductive, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Pullback [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullbacks [library]
Pullbacks1 [library]
pullback_limit_def.g [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.f [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.c [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.C [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Pullback_law4 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback_law3 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback_law2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback_eq2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback_law1 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback_eq1 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Pullback1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Pullback1_to_Pullback [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
P1 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
P2 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
P3 [constructor, in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

R

Refl [lemma, in ConCaT.SETOID.Setoid]
Reflexive [definition, in ConCaT.RELATIONS.Relations]
Refl' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Refl'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Reg_law [definition, in ConCaT.SETOID.Setoid_prop]
Relation [definition, in ConCaT.RELATIONS.Relations]
Relations [library]
RestrictedMap [definition, in ConCaT.SETOID.Setoid_prop]
Restricted_map_law [lemma, in ConCaT.SETOID.Setoid_prop]
Restricted_fun [definition, in ConCaT.SETOID.Setoid_prop]
restricted_map.P [variable, in ConCaT.SETOID.Setoid_prop]
restricted_map.f [variable, in ConCaT.SETOID.Setoid_prop]
restricted_map.B [variable, in ConCaT.SETOID.Setoid_prop]
restricted_map.A [variable, in ConCaT.SETOID.Setoid_prop]
restricted_map [section, in ConCaT.SETOID.Setoid_prop]
rew_prop_map2.f [variable, in ConCaT.SETOID.Map2]
rew_prop_map2.C [variable, in ConCaT.SETOID.Map2]
rew_prop_map2.B [variable, in ConCaT.SETOID.Map2]
rew_prop_map2.A [variable, in ConCaT.SETOID.Map2]
rew_prop_map2 [section, in ConCaT.SETOID.Map2]
RightAdj [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
RightAdjUA [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
RightInv_epic [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
RIso_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
RNatIso_law [definition, in ConCaT.CATEGORY_THEORY.NT.NatIso]
Rplus [inductive, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rplus_n [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rplus_0 [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rplus_contains_R [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar [inductive, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
RstarRplus_RRstar [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_n [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar_0 [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar_imp_coherent [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_equiv_Rstar1 [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_cases [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_transitive [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_contains_Rplus [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_contains_R [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_reflexive [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar1 [inductive, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_n [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_1 [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_0 [constructor, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rsym_imp_Rstarsym [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]

S

Same_relation [definition, in ConCaT.RELATIONS.Relations]
SET [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
SET [library]
Setoid [record, in ConCaT.SETOID.Setoid]
Setoid [library]
SetoidPROD [library]
Setoid_pred [record, in ConCaT.SETOID.Setoid_prop]
setoid_nt.G [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.F [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.D [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.C [variable, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt [section, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Setoid_dup2 [library]
Setoid_dup1 [library]
Setoid_prop [library]
Setoid' [record, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Setoid'' [record, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
SETProperty [library]
set_epic_monic.map_const_fun.a [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.map_const_fun [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
SET_Monic_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
SET_Epic_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
SET_is_CCC [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_CCC]
SET_is_Cartesian [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_CCC]
SET_hasExponent [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
Set_of_nat [definition, in ConCaT.SETOID.Setoid]
SET_hasBinProd [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
SET_coUAlaw2 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_coUAlaw1 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau_fun [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def.set_diese1_tau_def.i [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def.set_diese1_tau_def [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def.x [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.tau [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.X [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_tau_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_tau_fun [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_lcone_tau_def.i [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_lcone_tau_def [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lim [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_Terminal [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
set_terminal.S [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
set_terminal [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
SET_Pullback [library]
SET_Equalizer [library]
SET_Exponents [library]
SET_Complete [library]
SET_CCC [library]
SET_Terminal [library]
SET_BinProds [library]
Single [definition, in ConCaT.SETOID.Single]
Single [library]
Single_is_Terminal [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
Snd [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_id_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_comp_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_map [definition, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_map_law [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
SPROD [definition, in ConCaT.SETOID.SetoidPROD]
Sprod [record, in ConCaT.SETOID.SetoidPROD]
Sprod_r [projection, in ConCaT.SETOID.SetoidPROD]
Sprod_l [projection, in ConCaT.SETOID.SetoidPROD]
SSC1 [record, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
ssc1 [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_f [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_i [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_p [projection, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_k [projection, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_I [projection, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
ssc1.D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC2 [record, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_1_cond [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_1_f [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_1_f_com_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_1_t [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_1_i [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
SSC2_t [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_i [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.h [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.a [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.s [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_p [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_f [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_a [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_I [projection, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.x [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.X [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.A [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Sstar_contains_Rstar [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
star_monotone [lemma, in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Strip [lemma, in ConCaT.RELATIONS.CONFLUENCE.TAIT.Tait]
Strongly_confluent [definition, in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Strong_confluence_confluence [lemma, in ConCaT.RELATIONS.CONFLUENCE.TAIT.Tait]
SubSetoid [definition, in ConCaT.SETOID.Setoid_prop]
SubType [record, in ConCaT.SETOID.Setoid_prop]
sub_setoid.A [variable, in ConCaT.SETOID.Setoid_prop]
sub_setoid.U [variable, in ConCaT.SETOID.Setoid_prop]
sub_setoid [section, in ConCaT.SETOID.Setoid_prop]
Suc [constructor, in ConCaT.SETOID.Setoid]
Surj [record, in ConCaT.SETOID.MapProperty]
Surj_epic [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Surj_elt [projection, in ConCaT.SETOID.MapProperty]
Surj_map [projection, in ConCaT.SETOID.MapProperty]
Surj_law [definition, in ConCaT.SETOID.MapProperty]
Sym [lemma, in ConCaT.SETOID.Setoid]
Symmetric [definition, in ConCaT.RELATIONS.Relations]
Sym' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Sym'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
S_equaz [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_law3 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_law2 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_diese [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def.p [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def.h [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def.D [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_law1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_mor [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_ob [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_constr [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_reg [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_pred [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.I [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_eta_rule [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_beta_rule [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_Lambda [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda1_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_fun1 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law2 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_fun2 [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_eval [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_eval_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_eval_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_expo [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_pulb [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law4 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law3 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law2 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_diese [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.H [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.t2 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.t1 [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.D [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law1 [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_q [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_p [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_constr [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_reg [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_pred [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_op_together [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_r [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_l [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
s_prod.B [variable, in ConCaT.SETOID.SetoidPROD]
s_prod.A [variable, in ConCaT.SETOID.SetoidPROD]
s_prod [section, in ConCaT.SETOID.SetoidPROD]

T

Tait [library]
Tc_UA_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_UA_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_diese [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_cone_com_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_cone [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF_tau_com_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limF [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_cone [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_tau_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Terminal [record, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Terminal_ob [projection, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
terminal_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
terminal_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Terminal1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
Terminal1 [library]
Terminal1_to_Terminal [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
Terminal1_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def.ua' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def.t [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
Teta [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_o_Teta [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_tau_NT_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_arrow_Map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_tau_NT_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
thi1 [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi1_SSC1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi1_verif_Cond1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi1_k [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi1_I [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi1_d1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi1.D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi1.D_initial [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2 [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_initial [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_isInitial [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_e1_RightInv [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_s [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_f_c [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_p_j [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_e1 [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_c [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_D_E_fg [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_mor_d [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_f_d [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_p_i [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_e [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_v [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_D_E_hom [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_w [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_D_prod [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.D_complete [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.SSC1_D [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.thi2_mor_d_def.d [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.thi2_mor_d_def [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.g [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.f [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.d [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thl [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_limit [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_islimit [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_limit2 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_limit1 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diese [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag4 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag3 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_h [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_mu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_mu_cone_law [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_mu_tau [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_e [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_d [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_l_fg [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag2 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_g [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_gu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag1 [lemma, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_f [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_fu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_PI_Fu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_l_Fu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_k_Fu [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_PI_Fi [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_l_Fi [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_k_Fi [definition, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.C [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.F [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H1 [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H2 [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H3 [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.J [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.Limit2_fg [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese [section, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese.c [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese.tau [variable, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Th_Limits [library]
Th_Initial [library]
Th_Adjoint [library]
Th_CoAdjoint [library]
Tlist [inductive, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Tlist_setoid [definition, in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Together [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Together_prod [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Together1 [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Together1_r [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Together1_l [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Total [definition, in ConCaT.SETOID.Setoid]
To_Single [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
To_Single_map_law [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
To_Single_fun [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
Trans [lemma, in ConCaT.SETOID.Setoid]
Transitive [definition, in ConCaT.RELATIONS.Relations]
Trans' [lemma, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Trans'' [lemma, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
TwoElts [inductive, in ConCaT.SETOID.BasicTypes]

U

UA [record, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_FM [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_law2 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_op_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_unit_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_map [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_fun [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.ua_fm_diese_def.f [variable, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.ua_fm_diese_def.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.ua_fm_diese_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_map_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_fun [definition, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm [section, in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_comma.axu_ob [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.axu [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_Initial [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_isInitial [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_com_arrow [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_com_law [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.ua_com_arrow_def.axf [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.ua_com_arrow_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_com_ob [definition, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.u [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.x [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.G [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.X [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma [section, in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_to_radj.psi_ua_iso.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_iso [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_1_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_1_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def.c' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def.c [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.UA_of [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.F [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_ladj.phi_ua_iso.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_iso [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_1_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_1_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_tau_def.dxc [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_tau_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def.d' [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def.d [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.UA_of [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.G [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.D [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.C [variable, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj [section, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
UA_iso [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_iso_law1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_iso_mor_1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_iso_mor [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.u2 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.u1 [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.G [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_unic1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_unic [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diag1 [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diag [lemma, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_mor [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_ob [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.t [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diese [projection, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_law2 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_law1 [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_eq [definition, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.ua_laws.diese [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.ua_laws [section, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.u [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.a [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.G [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.b [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.B [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.A [variable, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def [section, in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UniqueI [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
UniqueT [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Unique_together_law [definition, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Unique_S_together [lemma, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Unit [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
UnitType [inductive, in ConCaT.SETOID.BasicTypes]
Unit_UAlaw2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_UAlaw1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_arrow_diese [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_arrow [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_ob [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_and_CoUnit_law2 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_and_CoUnit_law1 [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_NT [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_nt_law [lemma, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_tau [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit' [definition, in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
UniversalArrow [library]

V

verif_expo.set_lambda_def.set_lambda_fun_def.set_lambda_fun1_def.c [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.set_lambda_fun_def.set_lambda_fun1_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.set_lambda_fun_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.set_lambda_fun_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_prod.set_op_together_def.set_together_def.g [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def.set_together_def.f [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def.set_together_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def.C [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.B [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.A [variable, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod [section, in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]

W

Witness [projection, in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

Y

YLphi_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLphi_tau [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLphi_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLphi_arrow [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_tau [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow_map_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_map1_nt_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_map1 [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow1_map_law [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow1 [definition, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YonedaEmbedding [library]
YonedaLemma [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YonedaLemma [library]
yoneda_functor.funy_map_def.b [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor.funy_map_def.a [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor.funy_map_def [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor.C [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.ylpsi_map1_def.b [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.ylpsi_map1_def [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.x [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.F [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.a [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def.F [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def.a [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.C [variable, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma [section, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
Y_faithful [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
Y_full [lemma, in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]

Z

Z [constructor, in ConCaT.SETOID.Setoid]

other

_ o_NTv _ [notation, in ConCaT.CATEGORY_THEORY.NT.CatFunct]
_ =_H _ [notation, in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
_ o_M _ [notation, in ConCaT.SETOID.Map]
_ ==> _ [notation, in ConCaT.SETOID.Map]
_ =_M _ [notation, in ConCaT.SETOID.Map]
_ +_M _ [notation, in ConCaT.SETOID.STRUCTURE.Monoid]
_ o'' _ [notation, in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
_ =_S'' _ [notation, in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
_ o' _ [notation, in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
_ =_S _ [notation, in ConCaT.SETOID.Setoid]
_ =_NT _ [notation, in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
_ =_S' _ [notation, in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
_ o_F _ [notation, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
_ =_F _ [notation, in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
_ =_NTH _ [notation, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
_ o_NTh _ [notation, in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
_ o_C _ [notation, in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
_ o _ [notation, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
_ --> _ [notation, in ConCaT.CATEGORY_THEORY.CATEGORY.Category]

---

Notation Index

C

_ o _ [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
_ --> _ [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]

M

_ +_M _ [in ConCaT.SETOID.STRUCTURE.Monoid]

other

_ o_NTv _ [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
_ =_H _ [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
_ o_M _ [in ConCaT.SETOID.Map]
_ ==> _ [in ConCaT.SETOID.Map]
_ =_M _ [in ConCaT.SETOID.Map]
_ +_M _ [in ConCaT.SETOID.STRUCTURE.Monoid]
_ o'' _ [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
_ =_S'' _ [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
_ o' _ [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
_ =_S _ [in ConCaT.SETOID.Setoid]
_ =_NT _ [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
_ =_S' _ [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
_ o_F _ [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
_ =_F _ [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
_ =_NTH _ [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
_ o_NTh _ [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
_ o_C _ [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
_ o _ [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
_ --> _ [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]

---

Variable Index

A

about_isIso.a [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.H' [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.T1 [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.H [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.h [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.T [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.G [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.F [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.B [in ConCaT.CATEGORY_THEORY.NT.NatIso]
about_isIso.A [in ConCaT.CATEGORY_THEORY.NT.NatIso]
adj_to_ua.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_to_ua.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_eqs1.g [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.k [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.h [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.c' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.d' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs1.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.g [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.k [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.h [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.c' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.d' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi_1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.phi [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_equiv.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_equiv.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_iso.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_1_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.ad [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws.eps [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws.eta [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
arrs_setoid_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
assoc_horz_comp.T'' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.T' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.T [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G'' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F'' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.G [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.F [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.D [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.C [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.B [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
assoc_horz_comp.A [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]

B

bij0''.A [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
bij0''.B [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
binprod'_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
binprod'_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
bp_def.bp_laws.Op [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Proj2_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Proj1_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.bp_laws.Obj_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

C

cat_functor.id_catfunct_def.F [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.T' [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.T [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.H [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.G [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt.F [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.D [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.C [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_cong.C [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat''.Hom'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Id'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Ob'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat''.Op_comp'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
cat'.Hom' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Id' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Ob' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'.Op_comp' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat.Hom [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Id [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Ob [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat.Op_comp [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
colimit_def.iscolimit_def.l [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.colimit_laws.cl_diese [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.nu [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def.colim [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.F [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.J [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
comma_proj_def.comma_proj_map_def.b [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.comma_proj_map_def.a [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.x [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.G [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.X [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_complete.ctdiese.t [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.ctdiese.axf [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.l_GF' [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.l_F' [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.F' [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.x [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.G_pres_JA [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.A_comp_for_J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.G [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.A [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete.X [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_def.comp_com_def.g [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.f [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.cxh [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.bxg [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.comp_com_def.axf [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def.bxg [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def.axf [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.x [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.G [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.X [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
composition_to_operator''.c [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.b [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.a [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.pcgr [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.pcgl [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.Cfun [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.H [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator''.A [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator'.c [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.b [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.a [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.pcgr [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.pcgl [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.Cfun [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.H [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator'.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator.c [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.b [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.a [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.pcgr [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.pcgl [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.Cfun [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.H [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
composition_to_operator.A [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
comp_mon.g [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.f [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m3 [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m2 [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_mon.m1 [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_functor_prop.G1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.F1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.G [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.F [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.E [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.D [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
comp_functor_prop.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Comp_F.comp_functor_map.b [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.comp_functor_map.a [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.H [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.G [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.E [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.D [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
comp_cone.G [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.T [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.c [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.C [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
comp_cone.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Confluence.R [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Confluence.U [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
constFun.A [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.b [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.B [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def.a2 [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def.a1 [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
coua_def1.u1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.u1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.u [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.iscoua_def1.a [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.F [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.b [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.B [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1.A [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.t [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.coua_laws.co_diese [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.u [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.F [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.B [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.A [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]

D

def_cocone.cocone_nt.p [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.cocone_nt.T [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.c [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.F [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.C [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone.J [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cone.cone_nt.p [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.cone_nt.T [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.F [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.c [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.C [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone.J [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_pres_limits.G [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.C [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
def_pres_limits.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
dfunctor_def.F [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
dfunctor_def.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
diag_hasprod1.diag_prod1.together1_def.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.ua' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.b [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.H [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag.diag_map_def.b [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag.diag_map_def.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
discrete.disc_mor_setoid.b [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.disc_mor_setoid.a [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.U [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
d_cat.C [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]

E

endo_mon.a [in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
endo_mon.C [in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
epic_monic_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
epic_monic_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
equalizer_limit_def.e1_diese_def.p [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.e1_diese_def.h [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.e1_diese_def.r [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.l [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.k [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.I [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equal_hom_equiv.h [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.j [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.i [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.g [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.d [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.c [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.f [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.b [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.a [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_hom_equiv.C [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_one_mor.b [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equal_one_mor.a [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equaz_hom.b [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_hom.a [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_hom.C [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.g [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.f [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.b [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.a [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg.C [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.E_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.e [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.equaz_laws.c [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.k [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.I [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
expo_def.e [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Op [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Eval [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.expo_laws.Expo [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.C1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]

F

forget_map_def.m2 [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
forget_map_def.m1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
Fpullback_limit_def.pb1_diese_def.H [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.t2 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.t1 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.pb1_diese_def.r [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.l [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.G [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
freem_def.A [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
freyd_th_1.cd2.t [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.i [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.h [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.cd2.r [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.I [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.x [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.la [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.A_c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.X [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1.A [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_2'.uaxG'.ssc2_to_ssc1.ssc2_to_cond1.axh [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.k [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1.I [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.x [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.s [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.G_c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.A_c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.X [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.A [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2.uaxG.uaxG_verif.H [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.FT_h' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.h [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.uaxG_verif.a' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG.x [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.s [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.G_c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.A_c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.X [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.A [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
fscat.a [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fscat.C [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fscat.I [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fsc_inc_def.a [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def.I [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
fsc_inc_def.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
functor_prop0''.D [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
functor_prop0''.C [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
functor_prop.D [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
functor_prop.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
funct_def0''.funct_laws0''.FMap0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.funct_laws0''.FOb0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.D [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0''.C [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_setoid.D [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_setoid.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws.FMap [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws.FOb [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.D [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funfreemon_map_def.funfreemon_mor_def.f [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funprod_hasexpo.funprod_expo.lambda1_def.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.ua' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.b [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.H1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.H [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funset_nt.nth_map_def.c [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.f [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.a [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.b [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt.C [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_pres.fs_diese.fs_diese_mor_def.x [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.tau [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese.X [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.c [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.l [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.C [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset.a [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.funset_mor_def.f [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.c [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def.b [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSet2_l.funset2_l_map_def.funset2_l_mor_def.foxg [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.d2xc2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def.d1xc1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.funset2_r_mor_def.foxg [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.d2xc2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.d1xc1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.foxg [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.d2xc2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev.d1xc1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun_One.funone_map_def.b [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One.funone_map_def.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
fun_prod.fun_prod_map_def.c2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.fun_prod_map_def.c1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.C1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun2_to_map2.pgcr [in ConCaT.SETOID.Map2]
fun2_to_map2.pgcl [in ConCaT.SETOID.Map2]
fun2_to_map2.f [in ConCaT.SETOID.Map2]
fun2_to_map2.C [in ConCaT.SETOID.Map2]
fun2_to_map2.B [in ConCaT.SETOID.Map2]
fun2_to_map2.A [in ConCaT.SETOID.Map2]
fun2_to_map2''.pgcr [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.pgcl [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.f [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.C [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.B [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2''.A [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2'.pgcr [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.pgcl [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.f [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
fun2_to_map2'.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]

G

group_laws.inv [in ConCaT.SETOID.STRUCTURE.Group]
group_laws.A [in ConCaT.SETOID.STRUCTURE.Group]

H

hasbinprod_proj.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.C1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasbinprod_proj.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasexponent_proj.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
hasexponent_proj.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
horz_comp.T' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.T [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.G' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.F' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.G [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.F [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.C [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.B [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
horz_comp.A [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]

I

idCat.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
id_map_def.A [in ConCaT.SETOID.Map]
id_mon_def.m [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
initial_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
inj_surj_def.B [in ConCaT.SETOID.MapProperty]
inj_surj_def.A [in ConCaT.SETOID.MapProperty]
interchangelaw.A [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.B [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.C [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.F [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.F' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.G [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.G' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.H [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.H' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.T [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.T' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.U [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
interchangelaw.U' [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
inv_def.inverses_comp_def.y [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.inverses_comp_def.x [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def.A [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
iso_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_cone.phicone_1_fun_def.f [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.c [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.l [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.F [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.C [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone.J [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]

L

ladj_pres.lp_diese.tau [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.lp_diese.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.H [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.J [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.la [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_iso_def.LAdj_unit' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.LAdj_unit [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.F' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.la' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.la [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
ladj_iso_def.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
limit_def.islimit_def.l [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.limit_laws.l_diese [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.nu [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def.lim [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.F [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.J [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]

M

maps''.A [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''.B [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''0.A [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps''0.B [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps'.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps'.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps.A [in ConCaT.SETOID.Map]
maps.B [in ConCaT.SETOID.Map]
maps0''.A [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps0''.B [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
mcomp.A [in ConCaT.SETOID.Map]
mcomp.B [in ConCaT.SETOID.Map]
mcomp.C [in ConCaT.SETOID.Map]
mcomp.f [in ConCaT.SETOID.Map]
mcomp.g [in ConCaT.SETOID.Map]
monoid_laws.Ap_op [in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.e [in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.op [in ConCaT.SETOID.STRUCTURE.Monoid]
monoid_laws.A [in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors.m2 [in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors.m1 [in ConCaT.SETOID.STRUCTURE.Monoid]
mor_prod_def.g' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.g [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.f' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.c' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.b' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.a' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.c [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.d [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.c [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.mor_prod_map2.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.C1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

N

natiso_def.G [in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.F [in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.B [in ConCaT.CATEGORY_THEORY.NT.NatIso]
natiso_def.A [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Noether.R [in ConCaT.RELATIONS.Noetherian]
Noether.U [in ConCaT.RELATIONS.Noetherian]
nt_def.G [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.F [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.D [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
nt_def.C [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]

O

Orderings.R [in ConCaT.RELATIONS.Relations]
Orderings.U [in ConCaT.RELATIONS.Relations]

P

pa_def.k [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.I [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
pa_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
ProdCat.A [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.B [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def.t [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def.u [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
prodts_def.prodts_laws.Pd_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.prodts_laws.Proj [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.prodts_laws.PI [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.I [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
products_limit_def.pd1_diese_def.f [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.pd1_diese_def.c [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.l [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.I [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
prod_proj.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
prod_proj.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
prop_map2.f [in ConCaT.SETOID.Map2]
prop_map2.C [in ConCaT.SETOID.Map2]
prop_map2.B [in ConCaT.SETOID.Map2]
prop_map2.A [in ConCaT.SETOID.Map2]
prop_map2''.f [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.C [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.B [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2''.A [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2'.f [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.C [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.B [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
prop_map2'.A [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
pulbs_def.pulbs_laws.Pb_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_q [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_p [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.pulbs_laws.Fibred_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.g [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.c [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.b [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulb_setoid_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pulb_setoid_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pullback_limit_def.g [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.f [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.c [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
pullback_limit_def.C [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]

R

restricted_map.P [in ConCaT.SETOID.Setoid_prop]
restricted_map.f [in ConCaT.SETOID.Setoid_prop]
restricted_map.B [in ConCaT.SETOID.Setoid_prop]
restricted_map.A [in ConCaT.SETOID.Setoid_prop]
rew_prop_map2.f [in ConCaT.SETOID.Map2]
rew_prop_map2.C [in ConCaT.SETOID.Map2]
rew_prop_map2.B [in ConCaT.SETOID.Map2]
rew_prop_map2.A [in ConCaT.SETOID.Map2]

S

setoid_nt.G [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.F [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.D [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
setoid_nt.C [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
set_epic_monic.map_const_fun.a [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.B [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic.A [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_c.set_diese.set_diese1_def.set_diese1_tau_def.i [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def.x [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.tau [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.X [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_lcone_tau_def.i [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_terminal.S [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
ssc1.D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
ssc2_def.h [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.s [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.x [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.X [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
ssc2_def.A [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
sub_setoid.A [in ConCaT.SETOID.Setoid_prop]
sub_setoid.U [in ConCaT.SETOID.Setoid_prop]
s_equaz_def.s_equaz_diese_def.p [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def.h [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.s_equaz_diese_def.D [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.I [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.B [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def.A [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_pulb_def.s_pulb_diese_def.H [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.t2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.t1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.s_pulb_diese_def.D [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.g [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.B [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def.A [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_prod.B [in ConCaT.SETOID.SetoidPROD]
s_prod.A [in ConCaT.SETOID.SetoidPROD]

T

terminal_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
terminal1_def.ua' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def.t [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
terminal1_def.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
thi1.D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi1.D_initial [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.D_complete [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.SSC1_D [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.thi2_mor_d_def.d [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.g [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.f [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d.d [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thl.C [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.H3 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.J [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.Limit2_fg [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese.c [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese.tau [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]

U

ua_fm.ua_fm_diese_def.f [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.ua_fm_diese_def.B [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm.A [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_comma.axu_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.axu [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.ua_com_arrow_def.axf [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.u [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.x [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.G [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.X [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma.A [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_to_radj.psi_ua_iso.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_1_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def.c' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def.c [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.UA_of [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.F [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_ladj.phi_ua_iso.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_1_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_tau_def.dxc [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def.d' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def.d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.UA_of [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.G [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.D [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.C [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_iso_def.u2 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.u1 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.G [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.B [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_iso_def.A [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.t [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.ua_laws.diese [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.u [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.a [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.G [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.b [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.B [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.A [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]

V

verif_expo.set_lambda_def.set_lambda_fun_def.set_lambda_fun1_def.c [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.set_lambda_fun_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.B [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.A [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_prod.set_op_together_def.set_together_def.g [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def.set_together_def.f [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def.C [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.B [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.A [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]

Y

yoneda_functor.funy_map_def.b [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor.funy_map_def.a [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor.C [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.ylpsi_map1_def.b [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.x [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.F [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.a [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def.F [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def.a [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.C [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]

---

Library Index

A

Adjunction
Adjunction1
Adj_FunFreeMon
Adj_UA

B

BasicTypes
Binary_Products

C

Cartesian1
CAT
Category
Category_dup1
Category_dup2
CatFunct
CatProperty
CCC
CCC1
Coherence
CoLimit
Comma
Comma_UA
Comma_proj
Comma_Complete
Confluence
Const
CoUniversalArrow

D

Diagonal
Discr
Dual
Dual_Functor

E

Equalizers
Equalizers1
Exponents

F

FAFT_SSC2
FAFT_Part2_Proof2
FAFT_Part1
FAFT_Part2_Proof1
FreeMonoid
FSC_inc
FullSubCat
Functor
FunctorProperty
Functor_dup1
FunForget
FunForget_UA
FunFreeMon
FunOne
FunProd

G

Group

H

HomFunctor
HomFunctor_NT
HomFunctor_Continuous
HomFunctor2
Hom_Equality

I

IdCAT
InterChangeLaw
Inverses_Group
Iso_Limit

L

LeftAdj_Iso
Limit
Limit_Adj

M

Map
MapProperty
Map0_dup1
Map2
MON
Monoid

N

NatIso
Newman
Noetherian
Ntransformation

O

ONE

P

PA
PermCat
Pres_Limits
PROD
Products
Products1
PROD_proj
PULB
Pullbacks
Pullbacks1

R

Relations

S

SET
Setoid
SetoidPROD
Setoid_dup2
Setoid_dup1
Setoid_prop
SETProperty
SET_Pullback
SET_Equalizer
SET_Exponents
SET_Complete
SET_CCC
SET_Terminal
SET_BinProds
Single

T

Tait
Terminal1
Th_Limits
Th_Initial
Th_Adjoint
Th_CoAdjoint

U

UniversalArrow

Y

YonedaEmbedding
YonedaLemma

---

Lemma Index

A

AdjointUA_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
Adj_FunFreeMon_FunForget [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_FunFreeMon]
Adj_eq6 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq5 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq4 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq3 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_eq1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
AFT2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
AphiPres [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Aphi_invPres [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Ass [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Assoc_CatFunct [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Assoc_SET [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Assoc_Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Assoc_FSC [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Assoc_MON [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Assoc_One [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Assoc_PA [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Assoc_PULB [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Assoc_Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Assoc_Dual [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Assoc_PROD [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Assoc_CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Ass1 [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Ast_nt_law [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Ast_eq [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]

C

Check_S_equaz_constr [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
Check_S_pulb_constr [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
Cldiese_map [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoadjointUA_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
Codiese_map [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coherent_symmetric [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Comma_proj_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_complete [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
CompH_NT_assoc [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
CompV_NT_congr [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
CompV_NT_congl [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_tau_nt_law [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_map_congr [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_map_congl [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_Discr_congr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_Discr_congl [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_fun_map_law [in ConCaT.SETOID.Map]
Comp_MonMor_congr [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_congl [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_op_law [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_unit_law [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_One_mor_congr [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_One_mor_congl [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_PA_congr [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_congl [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact4 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact3 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact2 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_fact1 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PULB_congr [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_PULB_congl [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_Functor_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_Functor_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMap_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_com_congr [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_congl [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_dual_congr [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_dual_congl [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_cone_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_lr [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_r [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_l [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Comp_Pmor_congr [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Pmor_congl [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Functor_congr [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Comp_Functor_congl [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Com_isUA [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_UAlaw2 [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_UAlaw1 [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Concat_congr [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat_congl [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Const_id_law [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_comp_law [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_mor_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
CoUA_unic1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_unic [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diag1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diag [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUnit_coUAlaw2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_coUAlaw1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Co_EqC1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Co_EqC [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]

D

DFunctor_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
Diag_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diese_map [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Diff_Concat1_Empty [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Dist_map_op_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_map_unit_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]

E

Epic_Equalizer_iso [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Epic_Equalizer_id [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
EqC [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
EqC1 [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Equalizer_iso [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equal_Discr_mor_equiv [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Equal_Arrs_equiv [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_trans [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_sym [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_hom_refl [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_SubType_equiv [in ConCaT.SETOID.Setoid_prop]
Equal_MonMor_equiv [in ConCaT.SETOID.STRUCTURE.Monoid]
Equal_One_mor_equiv [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Equal_PA_mor_Equiv [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Equal_Single_equiv [in ConCaT.SETOID.Single]
Equal_NT_equiv [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Equal_PULB_mor_equiv [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Equal_Functor_equiv [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Equal_com_arrow_equiv [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Equal_Sprod_equiv [in ConCaT.SETOID.SetoidPROD]
Equal_Tlist_equiv [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Equal_Pmor_equiv [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Eq_Mor_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eq_coCone [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Eq_Nat_equiv [in ConCaT.SETOID.Setoid]
Eq_abb'a' [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Eq_cone [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Eq_fg [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Eq1_Sprod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Eq2_Sprod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Eq3_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Ext_equiv [in ConCaT.SETOID.Map]
Ext_equiv'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Ext_equiv' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
E_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E_monic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]

F

FComp [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FComp1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FId [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FId1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FPA_id_law [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_comp_law [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPres [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fpulb_id_law [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_comp_law [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fst_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
FS_limit2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_limit1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_diese_map_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FT_cd2_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
FT_h_diese_unique [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq4 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq3 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag4 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag3 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_diag1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_UA_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eq_tau [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_cone_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Functor_preserves_iso [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
FunDiscr_id_law [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_comp_law [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunForget_fid_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_fcomp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunFreeMon_fid_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_fcomp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunOne_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunSET_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_map_law1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_continuous [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FunSET_Preserves_l [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FunSET2_l_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_map_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunY_id_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_comp_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_map_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
Fun_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
Fun_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
Fun_prod_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun2_l_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_l_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_r_id_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun2_r_comp_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]

I

Idl [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idlr [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idl_CatFunct [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Idl_inv [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Idl_SET [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Idl_Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Idl_FSC [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Idl_MON [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Idl_One [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Idl_PA [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Idl_nat_inv [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Idl_PULB [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Idl_Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Idl_Dual [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Idl_PROD [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Idl_CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Idl1 [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idrl [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr_CatFunct [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Idr_inv [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Idr_SET [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Idr_Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Idr_FSC [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Idr_MON [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Idr_One [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Idr_PA [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Idr_nat_inv [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Idr_PULB [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Idr_Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Idr_Dual [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Idr_PROD [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Idr_CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Idr1 [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Id_CatFunct_nt_law [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_fun_map_law [in ConCaT.SETOID.Map]
Id_CAT_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_MON_op_law [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_MON_unit_law [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_com_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Inc_full [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_faith [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inc_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Initial_dual [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inj_monic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
InterChange_law [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Inverses_invr [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_invl [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_unit_invs [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_congr [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_congl [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_equiv [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_iso_unique [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inv_comp_invs2 [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_invs1 [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
IsCoUA1_to_IsCoUA [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
IsFaithful_comp [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
IsFull_comp [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
IsUA_FM [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
I_unic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

L

Ladj_continuous [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Ladj_Pres1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
LAdj_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
Lambda1_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Ldiese_map [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Lim_areIso [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
Lp_coUAlaw2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_coUAlaw1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
Lp_sigma_tau_cone_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]

M

MapConst_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Map2_lr [in ConCaT.SETOID.Map2]
Map2_r [in ConCaT.SETOID.Map2]
Map2_l [in ConCaT.SETOID.Map2]
Map2_map_law2 [in ConCaT.SETOID.Map2]
Map2_map_law1 [in ConCaT.SETOID.Map2]
Map2_map_law2'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_map_law1'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Map2_map_law2' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Map2_map_law1' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Mass [in ConCaT.SETOID.STRUCTURE.Monoid]
Mass_Inverses [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Mass_FreeMonoid [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Mass1 [in ConCaT.SETOID.STRUCTURE.Monoid]
Midl [in ConCaT.SETOID.STRUCTURE.Monoid]
Midl_Inverses [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Midl_FreeMonoid [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Midl1 [in ConCaT.SETOID.STRUCTURE.Monoid]
Midr [in ConCaT.SETOID.STRUCTURE.Monoid]
Midr_Inverses [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Midr_FreeMonoid [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Midr1 [in ConCaT.SETOID.STRUCTURE.Monoid]
MMon_op [in ConCaT.SETOID.STRUCTURE.Monoid]
MMon_unit [in ConCaT.SETOID.STRUCTURE.Monoid]
Monic_inj [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Mor_prod_l [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Mor_prod_r [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

N

NatCond [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
NatCond1 [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Newman [in ConCaT.RELATIONS.CONFLUENCE.NEWMAN.Newman]
Noetherian_contains_Noetherian [in ConCaT.RELATIONS.Noetherian]
NTa_areIso [in ConCaT.CATEGORY_THEORY.NT.NatIso]
NtH_nt_law [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NtH_map_law [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
NTinv_nt_law [in ConCaT.CATEGORY_THEORY.NT.NatIso]
NT_areIso [in ConCaT.CATEGORY_THEORY.NT.NatIso]

O

Opposite_map_law [in ConCaT.SETOID.STRUCTURE.Inverses_Group]

P

PA_21_rect [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_T [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_21_P [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_12_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_12_P [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_22_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_22_P [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_11_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_11_P [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PhiCone_1_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_1_fun_cone_law [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiCone_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
PhiUA_1_o_PhiUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_tau_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_1_arrow_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_tau_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
PhiUA_arrow_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
Pres1 [in ConCaT.SETOID.Map]
Pres1' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Pres1'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_pb1_law4 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law3 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_pb1_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Prf_law1_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law3 [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_E1_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_isCoUA1_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA1_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_map2_cong [in ConCaT.SETOID.Map2]
Prf_map2_congr [in ConCaT.SETOID.Map2]
Prf_map2_congl [in ConCaT.SETOID.Map2]
Prf_eta_rule1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Prf_beta_rule1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Prf_CoCone_nt_law [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_unique_together1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_eq2_prod1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_eq1_prod1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Prf_map2_cong'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_map2_congr'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_map2_congl'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_SSC2_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Prf_isTerminal1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
Prf_pd1_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Prf_pd1_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Prf_map2_cong' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_map2_congr' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_map2_congl' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_Cone_nt_law [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Product_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
Proj1_SPROD_map_law [in ConCaT.SETOID.SetoidPROD]
Proj2_SPROD_map_law [in ConCaT.SETOID.SetoidPROD]
PsiUA_1_o_PsiUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_tau_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_1_arrow_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_tau_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
PsiUA_arrow_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
Pulb_cone_law [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
PULB_23_rect [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_T [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_23_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_rect [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_T [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_13_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_rect [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_T [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_31_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_rect [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_T [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_21_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_32_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_32_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_12_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_12_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_33_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_33_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_22_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_22_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_11_ind [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_11_P [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

R

Refl [in ConCaT.SETOID.Setoid]
Refl' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Refl'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Restricted_map_law [in ConCaT.SETOID.Setoid_prop]
RightInv_epic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Rplus_contains_R [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
RstarRplus_RRstar [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_imp_coherent [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_equiv_Rstar1 [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_cases [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_transitive [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_contains_Rplus [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_contains_R [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rstar_reflexive [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Rsym_imp_Rstarsym [in ConCaT.RELATIONS.CONFLUENCE.Coherence]

S

SET_coUAlaw2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_coUAlaw1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese_map_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_diese1_tau_map_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
SET_lcone_tau_map_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
Single_is_Terminal [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
Snd_id_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_comp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Snd_map_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
SSC2_1_f_com_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
Sstar_contains_Rstar [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
star_monotone [in ConCaT.RELATIONS.CONFLUENCE.Coherence]
Strip [in ConCaT.RELATIONS.CONFLUENCE.TAIT.Tait]
Strong_confluence_confluence [in ConCaT.RELATIONS.CONFLUENCE.TAIT.Tait]
Surj_epic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
Sym [in ConCaT.SETOID.Setoid]
Sym' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Sym'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
S_equaz_law3 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_equaz_reg [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
S_eta_rule [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_beta_rule [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_lambda_map_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_eval_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
S_pulb_law4 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law3 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_pulb_reg [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
S_together_r [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_l [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
S_together_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]

T

Tc_UA_law2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_UA_law1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_cone_com_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_t_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_limconeF_tau_com_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Tc_tau_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Teta_1_o_Teta [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_tau_NT_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_1_arrow_Map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_tau_NT_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Teta_arrow_map_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Thi2_isInitial [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thi2_e1_RightInv [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Thl_limit2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_limit1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag4 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag3 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_mu_cone_law [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Thl_diag1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
Together1_r [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Together1_l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
To_Single_map_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
Trans [in ConCaT.SETOID.Setoid]
Trans' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Trans'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]

U

UA_FM_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_op_law [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_unit_law [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_diese_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_FM_map_law [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
UA_isInitial [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_com_law [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
UA_iso_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_unic1 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_unic [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diag1 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diag [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UniqueI [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
UniqueT [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Unique_S_together [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
Unit_UAlaw2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_UAlaw1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
Unit_and_CoUnit_law2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_and_CoUnit_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Unit_nt_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]

Y

YLphi_nt_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLphi_arrow_map_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_nt_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow_map_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_map1_nt_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YLpsi_arrow1_map_law [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
YonedaLemma [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
Y_faithful [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
Y_full [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]

---

Constructor Index

B

Build_Discr_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Build_noetherian [in ConCaT.RELATIONS.Noetherian]
Build_Equal_hom [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]

C

Concat1 [in ConCaT.SETOID.STRUCTURE.FreeMonoid]

E

Elt [in ConCaT.SETOID.BasicTypes]
Elt1 [in ConCaT.SETOID.BasicTypes]
Elt2 [in ConCaT.SETOID.BasicTypes]
Empty [in ConCaT.SETOID.STRUCTURE.FreeMonoid]

F

F12 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
F32 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

I

Id_Obone [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
IP1 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
IP2 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
IP3 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

O

Obone [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]

P

PA_f [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_I2 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_I1 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA1 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA2 [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
P1 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
P2 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
P3 [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

R

Rplus_n [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rplus_0 [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar_n [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar_0 [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_n [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_1 [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1_0 [in ConCaT.RELATIONS.CONFLUENCE.Confluence]

S

Suc [in ConCaT.SETOID.Setoid]

Z

Z [in ConCaT.SETOID.Setoid]

---

Axiom Index

D

Discr_mor_ind1 [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]

---

Projection Index

A

Adjoint [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_r [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Adj_l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Ap [in ConCaT.SETOID.Map]
ApNT [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Ap' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ap'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Ap''0 [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Ap0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Arrow [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
A_eps [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
A_eta [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]

C

Carrier [in ConCaT.SETOID.Setoid]
Carrier' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Carrier'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Car_BP1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Car_terminal1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Car_Cat [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Car_BP [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Car_terminal [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC_Car [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC_exponent [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC_isCar [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
CCC1_exponent [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
CCC1_Car [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
CoAdjoint [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Codom [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Coherence [in ConCaT.SETOID.Setoid]
Colim [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Colim_diese [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Cond1_f [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Cond1_i [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
Cond2_t [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Cond2_i [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
CoUA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_ob [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_diese [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]

D

Dom [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]

E

Elt_sub [in ConCaT.SETOID.Setoid_prop]
Epic_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Equal [in ConCaT.SETOID.Setoid]
Equal' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Equal'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Eval [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Expo [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
E_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
E_ob [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]

F

Faithful_functor0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Faithful_functor [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Fibred_q [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Fibred_p [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Fibred_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
FMap [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMap0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FOb [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FOb0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_mor0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_functor0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_mor [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Full_functor [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]

G

Ginv [in ConCaT.SETOID.STRUCTURE.Group]
Gmon [in ConCaT.SETOID.STRUCTURE.Group]

H

Hom [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Hom_r [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Hom_l [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Hom' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Hom'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]

I

Id [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Id' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Id'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Initial_ob [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inj_map [in ConCaT.SETOID.MapProperty]
Inv_iso [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Inv_elt_r [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_elt_l [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Iso_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

L

Lim [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limiting_cocone [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Limiting_cone [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Lim_diese [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]

M

Mcarrier [in ConCaT.SETOID.STRUCTURE.Monoid]
Monic_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
MonMap [in ConCaT.SETOID.STRUCTURE.Monoid]
Mop [in ConCaT.SETOID.STRUCTURE.Monoid]
MorI [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
MorT [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Mor_com_arrow [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Mor_com_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Munit [in ConCaT.SETOID.STRUCTURE.Monoid]

N

NatIso_inv [in ConCaT.CATEGORY_THEORY.NT.NatIso]
NatIso_mor [in ConCaT.CATEGORY_THEORY.NT.NatIso]

O

Ob [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Obj_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Ob_com_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Ob_r [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Ob_l [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Ob' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Ob'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Op_together [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Op_lambda [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Op_comp'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Op_comp' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Op_comp [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]

P

Pb_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
PCarrier [in ConCaT.SETOID.Setoid]
Pd_diese [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Pi [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Pred [in ConCaT.SETOID.Setoid_prop]
Pres [in ConCaT.SETOID.Map]
Pres' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Pres'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Pres''0 [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Pres0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
Prf_unique_together [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_eq2_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_eq1_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Prf_equalizer1 [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Prf_isTerminal [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isInitial [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_Iso [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isMonic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_isEpic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
Prf_IsCoUA [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_isCoUA_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
Prf_E_law3 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_E_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_E_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Prf_eta_rule [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Prf_beta_rule [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Prf_isFull0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_isFaithful0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_Fid_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_Fcomp_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Prf_constr [in ConCaT.SETOID.Setoid_prop]
Prf_reg [in ConCaT.SETOID.Setoid_prop]
Prf_MonOp_law [in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_MonUnit_law [in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_idr [in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_idl [in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_monoid_ass [in ConCaT.SETOID.STRUCTURE.Monoid]
Prf_isSurj [in ConCaT.SETOID.MapProperty]
Prf_isInj [in ConCaT.SETOID.MapProperty]
Prf_idr'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_idl'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_ass'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Prf_IsColimit [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_colimit2 [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_colimit1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Prf_isFull [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Prf_isFaithful [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Prf_equiv'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Prf_Cond2_law [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Prf_idr' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_idl' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_ass' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Prf_PER [in ConCaT.SETOID.Setoid]
Prf_equiv [in ConCaT.SETOID.Setoid]
Prf_NT_law [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Prf_pd_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Prf_pd_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Prf_ginv_r [in ConCaT.SETOID.STRUCTURE.Group]
Prf_ginv_l [in ConCaT.SETOID.STRUCTURE.Group]
Prf_NatIso [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Prf_invs2 [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Prf_invs1 [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Prf_equiv' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Prf_isCCC [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Prf_isCartesian [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CCC]
Prf_Fid_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Prf_Fcomp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Prf_Adj1_law2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Prf_Adj1_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Prf_Islimit [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_limit2 [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_limit1 [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Prf_pb_law4 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law3 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_pb_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
Prf_com_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Prf_idr [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_idl [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_ass [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Prf_IsUA [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_isUA_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_isUA_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
Prf_pequiv [in ConCaT.RELATIONS.Relations]
Prf_refl [in ConCaT.RELATIONS.Relations]
Prf_sym [in ConCaT.RELATIONS.Relations]
Prf_trans [in ConCaT.RELATIONS.Relations]
Prf_asym [in ConCaT.RELATIONS.Relations]
Prf_preorder [in ConCaT.RELATIONS.Relations]
Prf_trans1 [in ConCaT.RELATIONS.Relations]
Prf_refl1 [in ConCaT.RELATIONS.Relations]
Proj [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Proj1_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Proj2_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

S

Sprod_r [in ConCaT.SETOID.SetoidPROD]
Sprod_l [in ConCaT.SETOID.SetoidPROD]
SSC1_p [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_k [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC1_I [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
SSC2_p [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
SSC2_I [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
Surj_elt [in ConCaT.SETOID.MapProperty]
Surj_map [in ConCaT.SETOID.MapProperty]

T

Terminal_ob [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

U

UA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_ob [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
UA_diese [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]

W

Witness [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

---

Inductive Index

D

Discr_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]

E

EmptyType [in ConCaT.SETOID.BasicTypes]
Equal_hom [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]

N

Nat [in ConCaT.SETOID.Setoid]
noetherian [in ConCaT.RELATIONS.Noetherian]

O

One_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
One_ob [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]

P

PA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PA_ob [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
PULB_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
PULB_ob [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]

R

Rplus [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Rstar1 [in ConCaT.RELATIONS.CONFLUENCE.Confluence]

T

Tlist [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
TwoElts [in ConCaT.SETOID.BasicTypes]

U

UnitType [in ConCaT.SETOID.BasicTypes]

---

Section Index

A

about_isIso [in ConCaT.CATEGORY_THEORY.NT.NatIso]
adj_to_ua [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
adj_eqs1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_eqs [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
adj_equiv [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj_to_adj1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_1_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj.teta_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_to_adj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def.adj1_laws [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
adj1_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
arrs_setoid_def [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
assoc_horz_comp [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]

B

bij0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
binprod'_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
bp_def.bp_laws [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
bp_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

C

cat [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat_functor.id_catfunct_def [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor.compnt [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_functor [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
cat_cong [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
cat' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
cat'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
colimit_def.iscolimit_def.colimit_laws [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def.iscolimit_def [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
colimit_def [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
comma_proj_def.comma_proj_map_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_proj_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
comma_complete.ctdiese [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_complete [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
comma_def.comp_com_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def.com_arrow_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
comma_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
composition_to_operator'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
composition_to_operator' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
composition_to_operator [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
comp_mon [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
comp_functor_prop [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
Comp_F.comp_functor_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_F [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
comp_cone [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Confluence [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
constFun [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
constFun.const_map_def [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
coua_def1.iscoua_def1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def.coua_laws [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def.iscoua_def [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
coua_def [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]

D

def_cocone.cocone_nt [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cocone [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
def_cone.cone_nt [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_cone [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
def_pres_limits [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
dfunctor_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
diag [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
diag_hasprod1.diag_prod1.together1_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1.diag_prod1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag_hasprod1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
diag.diag_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
discrete [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
discrete.disc_mor_setoid [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
d_cat [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]

E

endo_mon [in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
epic_monic_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
equalizer_limit_def.e1_diese_def [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equalizer_limit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equal_hom_equiv [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
equal_one_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
equaz_hom [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
equaz_def.equaz_laws [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
equaz_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
expo_def.expo_laws [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
expo_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]

F

forget_map_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
Fpullback_limit_def.pb1_diese_def [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback_limit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
freem_def [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
freyd_th_1.cd2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
freyd_th_2'.uaxG'.ssc2_to_ssc1.ssc2_to_cond1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG'.ssc2_to_ssc1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2'.uaxG' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
freyd_th_2.uaxG.uaxG_verif [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2.uaxG [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
freyd_th_2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
fscat [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
fsc_inc_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
functor_prop0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
functor_prop [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
funct_def0''.funct_laws0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_def0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
funct_setoid [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def.funct_laws [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funct_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
funfreemon_map_def.funfreemon_mor_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funfreemon_map_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
funprod_hasexpo.funprod_expo.lambda1_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo.funprod_expo [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funprod_hasexpo [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
funset [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset_nt.nth_map_def [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_nt [in ConCaT.CATEGORY_THEORY.NT.HomFunctor_NT]
funset_pres.fs_diese.fs_diese_mor_def [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres.fs_diese [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset_pres [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
funset.funset_map_def.funset_mor_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
funset.funset_map_def [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSet2_l.funset2_l_map_def.funset2_l_mor_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l.funset2_l_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def.funset2_r_mor_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.funset2_r_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r.abrev [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSet2_r [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Fun_One.funone_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
Fun_One [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
fun_prod.fun_prod_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun_prod [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
fun2_to_map2 [in ConCaT.SETOID.Map2]
fun2_to_map2'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
fun2_to_map2' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]

G

group_laws [in ConCaT.SETOID.STRUCTURE.Group]

H

hasbinprod_proj [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
hasexponent_proj [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
horz_comp [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]

I

idCat [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
id_map_def [in ConCaT.SETOID.Map]
id_mon_def [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
initial_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
inj_surj_def [in ConCaT.SETOID.MapProperty]
interchangelaw [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
inv_def.inverses_comp_def [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
inv_def [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
iso_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
iso_cone.phicone_1_fun_def [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]
iso_cone [in ConCaT.CATEGORY_THEORY.LIMITS.Iso_Limit]

L

ladj_pres.lp_diese [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_pres [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Limit_Adj]
ladj_iso_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
limit_def.islimit_def.limit_laws [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def.islimit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
limit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]

M

maps [in ConCaT.SETOID.Map]
maps' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
maps'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
maps''0 [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
maps0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
mcomp [in ConCaT.SETOID.Map]
monoid_laws [in ConCaT.SETOID.STRUCTURE.Monoid]
mon_mors [in ConCaT.SETOID.STRUCTURE.Monoid]
mor_prod_def.mor_prod_map2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
mor_prod_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]

N

natiso_def [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Noether [in ConCaT.RELATIONS.Noetherian]
nt_def [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]

O

Orderings [in ConCaT.RELATIONS.Relations]

P

pa_def [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
ProdCat [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
ProdCat.pmor_setoid_def [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
prodts_def.prodts_laws [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
prodts_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
products_limit_def.pd1_diese_def [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
products_limit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
prod_proj [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
prop_map2 [in ConCaT.SETOID.Map2]
prop_map2'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
prop_map2' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
pulbs_def.pulbs_laws [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulbs_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Pullbacks]
pulb_setoid_def [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
pullback_limit_def [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]

R

restricted_map [in ConCaT.SETOID.Setoid_prop]
rew_prop_map2 [in ConCaT.SETOID.Map2]

S

setoid_nt [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
set_epic_monic.map_const_fun [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_epic_monic [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SETProperty]
set_c.set_diese.set_diese1_def.set_diese1_tau_def [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese.set_diese1_def [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_diese [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c.set_lcone_tau_def [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_c [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.SET_Complete]
set_terminal [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Terminal]
ssc1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
ssc2_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_SSC2]
sub_setoid [in ConCaT.SETOID.Setoid_prop]
s_equaz_def.s_equaz_diese_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_equaz_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Equalizer]
s_pulb_def.s_pulb_diese_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_pulb_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Pullback]
s_prod [in ConCaT.SETOID.SetoidPROD]

T

terminal_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
terminal1_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Terminal1]
thi1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.thi2_mor_d_def [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thi2.unique_mor_d [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Initial]
thl [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]
thl.taudiese [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Th_Limits]

U

ua_fm.ua_fm_diese_def [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_fm [in ConCaT.CATEGORY_THEORY.LIMITS.FunForget_UA]
ua_comma.ua_com_arrow_def [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_comma [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
ua_to_radj.psi_ua_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_1_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.psi_ua_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj.coadjoint_ua_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_radj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
ua_to_ladj.phi_ua_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_1_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.phi_ua_tau_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj.adjoint_ua_map_def [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_to_ladj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
ua_iso_def [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def.ua_laws [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def.isua_def [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]
ua_def [in ConCaT.CATEGORY_THEORY.LIMITS.UniversalArrow]

V

verif_expo.set_lambda_def.set_lambda_fun_def.set_lambda_fun1_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def.set_lambda_fun_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo.set_lambda_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_expo [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_Exponents]
verif_prod.set_op_together_def.set_together_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod.set_op_together_def [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]
verif_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.SET_BinProds]

Y

yoneda_functor.funy_map_def [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_functor [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def.ylpsi_map1_def [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def.ylpsi_arrow_def [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylpsi_tau_def [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma.ylphi_tau_def [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]
yoneda_lemma [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaLemma]

---

Definition Index

A

Adj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
AdjointUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjointUA_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
AdjUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
Adj_to_Adj1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_to_Adj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_law2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Adj1_law1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
AFT1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
AFT1' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
Antisymmetric [in ConCaT.RELATIONS.Relations]
ApAphi [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
ApAphi_inv [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
ApMop [in ConCaT.SETOID.STRUCTURE.Monoid]
Ap2 [in ConCaT.SETOID.Map2]
Ap2' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ap2'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
AreBij0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Map0_dup1]
AreIsos [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
AreNatIsos [in ConCaT.CATEGORY_THEORY.NT.NatIso]
Assoc_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Assoc_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Assoc_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Ast [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
At_most_1mor [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

B

Beta_rule_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
BinOp [in ConCaT.SETOID.STRUCTURE.Monoid]
BinProd' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
BP1_to_BP [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
Build_Map2 [in ConCaT.SETOID.Map2]
Build_Comp'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Build_CoCone [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Build_Map2'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
Build_Adj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction]
Build_Comp' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Build_Pmor1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Build_POb1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
Build_Map2' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Build_Cone [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Build_Comp [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Build1_Pmor [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]

C

Car1_to_Car [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Cat_comp'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Cat_comp' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Cat_comp [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CCC1_to_CCC [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
CoadjointUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoadjointUA_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
CoAdjUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_CoAdjoint]
Cocomplete [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoCone [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoCone_law [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
coherent [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
CoLimit_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
CoLimit_eq [in ConCaT.CATEGORY_THEORY.LIMITS.CoLimit]
Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
CommaI [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Comma_proj [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_mor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_proj_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma_proj]
Comma_l_F1 [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Comma_l_F [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Comma_Complete]
Comp [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
CompH_NT [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Complete [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
CompV_NT [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_CatFunct [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_tau [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Comp_SET [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Comp_Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_Discr_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Comp_map [in ConCaT.SETOID.Map]
Comp_fun [in ConCaT.SETOID.Map]
Comp_FSC [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Comp_MON [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_MonMor_map [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Comp_One [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_One_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Comp_PA [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Comp_PULB [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_PULB_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Comp_Functor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMap [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FMor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_FOb [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Comp_Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_arrow [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_com_mor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Comp_Dual [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_Darrow [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Comp_cone [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_cone_tau [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
Comp_PROD [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_Pmor [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Comp_CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.CAT]
Comp' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Comp'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Com_UA [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_diese [in ConCaT.CATEGORY_THEORY.LIMITS.Comma_UA]
Com_arrow_setoid [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Com_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Concat [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Concat_map2 [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Cone [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Cones [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Cone_law [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Confluent [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
confluent [in ConCaT.RELATIONS.CONFLUENCE.Confluence]
Congl_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Congl_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Congl_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Congr_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Congr_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Congr_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Cong_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Cong_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Cong_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Const [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_map [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Const_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Const]
Contains [in ConCaT.RELATIONS.Relations]
Continuous [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.Pres_Limits]
CoUA_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA_eq [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1_to_CoUA [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUA1_diese [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
CoUnit [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_arrow_diese [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_arrow [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]
CoUnit_NT [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
CoUnit_tau [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
CoUnit' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_UA]

D

Dfunctor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DFunctor_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.Dual_Functor]
DHom [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]
Diag [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Diag_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Diagonal]
Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Discr_mor_setoid [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Dist_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dist_fun [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
Dual [in ConCaT.CATEGORY_THEORY.CATEGORY.Dual]

E

Endo_Monoid [in ConCaT.CATEGORY_THEORY.CATEGORY.PermCat]
Epic_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
EqualH_NT [in ConCaT.CATEGORY_THEORY.NT.InterChangeLaw]
Equalizer_law3 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_law2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_law1 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer_eq [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Equalizers]
Equalizer1 [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer1_hom [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer1_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equalizer2_to_Equalizer [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Equal_Discr_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Equal_Arrs [in ConCaT.CATEGORY_THEORY.CATEGORY.Hom_Equality]
Equal_SubType [in ConCaT.SETOID.Setoid_prop]
Equal_MonMor [in ConCaT.SETOID.STRUCTURE.Monoid]
Equal_One_mor [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Equal_PA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Equal_Single [in ConCaT.SETOID.Single]
Equal_NT [in ConCaT.CATEGORY_THEORY.NT.Ntransformation]
Equal_PULB_mor [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Equal_Functor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Equal_com_arrow [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Equal_Sprod [in ConCaT.SETOID.SetoidPROD]
Equal_Tlist [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
Equal_Pmor [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Equiv_preorder [in ConCaT.RELATIONS.Relations]
Eq_Nat [in ConCaT.SETOID.Setoid]
Eq_Adj1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Eq_Adj [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adjunction1]
Eq1_prod_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eq2_prod_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
Eta_rule_law [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Eval1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Expo1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Ext [in ConCaT.SETOID.Map]
Ext' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Setoid_dup1]
Ext'' [in ConCaT.CATEGORY_THEORY.NT.Setoid_dup2]
E_NT [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E_tau [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E1_diese [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E1_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
E1_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

F

Faithful_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Faithful_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
FamI [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
Fam2 [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Products]
Fcomp_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Fcomp_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
Fibred1_q [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fibred1_p [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fibred1_prod [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fid_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Fid_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMor [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FMor0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
FPA [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_map [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
FPA_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
Fpulb [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_map [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_mor [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpulb_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
Fpullback1 [in ConCaT.CATEGORY_THEORY.LIMITS.Pullbacks1]
FreeMonoid [in ConCaT.SETOID.STRUCTURE.FreeMonoid]
FSC_inc [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
FSC_mor_setoid [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Fst [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
Fst_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.PROD_proj]
FS_diese [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_diese_mor [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_cone_tau [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_lcone [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FS_lim [in ConCaT.CATEGORY_THEORY.LIMIT_CONSTRUCTIONS.HomFunctor_Continuous]
FT_cd2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part1]
FT_UA' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof2]
FT_UA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c3 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c2 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_c1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t'' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_m0 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_k [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_GP [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_GP' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_q [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_p [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_b [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_P [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t' [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_j0 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_h_diese [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_t [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_i0 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_Apeps [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_d [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_tau_i [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_eps [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_Q [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_E [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_a [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_f [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FT_I [in ConCaT.CATEGORY_THEORY.ADJUNCTION.FREYD_THEOREM.FAFT_Part2_Proof1]
FullSubCat [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Full_law0'' [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.Functor_dup1]
Full_law [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunctorProperty]
FUNCT [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Functor_setoid [in ConCaT.CATEGORY_THEORY.FUNCTOR.Functor]
FunDiscr [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_map [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_arrow [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunDiscr_ob [in ConCaT.CATEGORY_THEORY.LIMITS.Products1]
FunForget [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunForget_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunForget]
FunFreeMon [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunFreeMon_mor [in ConCaT.CATEGORY_THEORY.FUNCTOR.FunFreeMon]
FunOne [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunOne_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunOne]
FunSET [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_mor [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_mor1 [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.HomFunctor]
FunSET2_l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_mor1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_l_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_mor1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunSET2_r_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
FunY [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
FunY_map [in ConCaT.CATEGORY_THEORY.NT.YONEDA_LEMMA.YonedaEmbedding]
Fun_prod [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_map [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
Fun_prod_ob [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.FunProd]
F_hom [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
F_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

G

Group_invr [in ConCaT.SETOID.STRUCTURE.Group]
Group_invl [in ConCaT.SETOID.STRUCTURE.Group]

H

HasBinProd [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
HasBinProd1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.Cartesian1]
HasExponent [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
HasExponent1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
HasExp1_to_HasExp [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
HOM_l [in ConCaT.CATEGORY_THEORY.ADJUNCTION.HomFunctor2]
H_together [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_proj2_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_proj1_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_obj_prod [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Binary_Products]
H_lambda [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
H_eval [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
H_expo [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]

I

Idl_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Idl_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Idl_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Idr_law'' [in ConCaT.CATEGORY_THEORY.NT.Category_dup2]
Idr_law' [in ConCaT.CATEGORY_THEORY.FUNCTOR.Category_dup1]
Idr_law [in ConCaT.CATEGORY_THEORY.CATEGORY.Category]
Id_CatFunct [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_CatFunct_tau [in ConCaT.CATEGORY_THEORY.NT.CatFunct]
Id_SET [in ConCaT.CATEGORY_THEORY.CATEGORY.SET]
Id_Discr [in ConCaT.CATEGORY_THEORY.LIMITS.Discr]
Id_map [in ConCaT.SETOID.Map]
Id_fun [in ConCaT.SETOID.Map]
Id_CAT [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_CAT_ob [in ConCaT.CATEGORY_THEORY.FUNCTOR.IdCAT]
Id_FSC [in ConCaT.CATEGORY_THEORY.CATEGORY.FullSubCat]
Id_MON [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_MON_map [in ConCaT.CATEGORY_THEORY.CATEGORY.MON]
Id_One [in ConCaT.CATEGORY_THEORY.CATEGORY.ONE]
Id_PA [in ConCaT.CATEGORY_THEORY.LIMITS.PA]
Id_PULB [in ConCaT.CATEGORY_THEORY.LIMITS.PULB]
Id_Comma [in ConCaT.CATEGORY_THEORY.FUNCTOR.Comma]
Id_PROD [in ConCaT.CATEGORY_THEORY.CATEGORY.PROD]
Inc_map [in ConCaT.CATEGORY_THEORY.FUNCTOR.FSC_inc]
Inj_law [in ConCaT.SETOID.MapProperty]
Inverses_rel [in ConCaT.SETOID.STRUCTURE.Group]
Inverses_group [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_Monoid [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_unit [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_op [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_comp [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_setoid [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inverses_eq [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_elt_r [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
Inv_comp_elt_l [in ConCaT.SETOID.STRUCTURE.Inverses_Group]
IsCoUA1 [in ConCaT.CATEGORY_THEORY.LIMITS.CoUniversalArrow]
IsInitial [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
IsTerminal [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]
IsTerminal' [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.CatProperty]

J

J_hom [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
J_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

K

K_hom [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]
K_fg [in ConCaT.CATEGORY_THEORY.LIMITS.Equalizers1]

L

LAdj_nt [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_tau [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
LAdj_tau_iso [in ConCaT.CATEGORY_THEORY.ADJUNCTION.LeftAdj_Iso]
Lambda [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Lambda_expo [in ConCaT.CATEGORY_THEORY.CATEGORY.CONSTRUCTIONS.Exponents]
Lambda1 [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
Lambda1_mor [in ConCaT.CATEGORY_THEORY.ADJUNCTION.CCC.CCC1]
LeftAdjUA [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Th_Adjoint]
LeftAdj_FunForget [in ConCaT.CATEGORY_THEORY.ADJUNCTION.Adj_FunFreeMon]
Limit_law2 [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_law1 [in ConCaT.CATEGORY_THEORY.LIMITS.Limit]
Limit_eq [in Con