Library Coq.Classes.SetoidTactics
Tactics for typeclass-based setoids.
Require Coq.Classes.CRelationClasses Coq.Classes.CMorphisms.
Require Import Coq.Classes.Morphisms Coq.Classes.Morphisms_Prop.
Require Export Coq.Classes.RelationClasses Coq.Relations.Relation_Definitions.
Require Import Coq.Classes.Equivalence Coq.Program.Basics.
Generalizable Variables A R.
Export ProperNotations.
Set Implicit Arguments.
Default relation on a given support. Can be used by tactics
to find a sensible default relation on any carrier. Users can
declare an Instance def : DefaultRelation A RA anywhere to
declare default relations.
To search for the default relation, just call default_relation.
Every Equivalence gives a default relation, if no other is given
(lowest priority).
The setoid_replace tactics in Ltac, defined in terms of default relations
and the setoid_rewrite tactic.
Ltac setoidreplace H t :=
let Heq := fresh "Heq" in
cut(H) ; unfold default_relation ; [ intro Heq ; setoid_rewrite Heq ; clear Heq | t ].
Ltac setoidreplacein H H' t :=
let Heq := fresh "Heq" in
cut(H) ; unfold default_relation ; [ intro Heq ; setoid_rewrite Heq in H' ; clear Heq | t ].
Ltac setoidreplaceinat H H' t occs :=
let Heq := fresh "Heq" in
cut(H) ; unfold default_relation ; [ intro Heq ; setoid_rewrite Heq in H' at occs ; clear Heq | t ].
Ltac setoidreplaceat H t occs :=
let Heq := fresh "Heq" in
cut(H) ; unfold default_relation ; [ intro Heq ; setoid_rewrite Heq at occs ; clear Heq | t ].
Tactic Notation "setoid_replace" constr(x) "with" constr(y) :=
setoidreplace (default_relation x y) idtac.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"at" int_or_var_list(o) :=
setoidreplaceat (default_relation x y) idtac o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"in" hyp(id) :=
setoidreplacein (default_relation x y) id idtac.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"in" hyp(id)
"at" int_or_var_list(o) :=
setoidreplaceinat (default_relation x y) id idtac o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"by" tactic3(t) :=
setoidreplace (default_relation x y) ltac:(t).
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"at" int_or_var_list(o)
"by" tactic3(t) :=
setoidreplaceat (default_relation x y) ltac:(t) o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"in" hyp(id)
"by" tactic3(t) :=
setoidreplacein (default_relation x y) id ltac:(t).
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"in" hyp(id)
"at" int_or_var_list(o)
"by" tactic3(t) :=
setoidreplaceinat (default_relation x y) id ltac:(t) o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel) :=
setoidreplace (rel x y) idtac.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"at" int_or_var_list(o) :=
setoidreplaceat (rel x y) idtac o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"by" tactic3(t) :=
setoidreplace (rel x y) ltac:(t).
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"at" int_or_var_list(o)
"by" tactic3(t) :=
setoidreplaceat (rel x y) ltac:(t) o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"in" hyp(id) :=
setoidreplacein (rel x y) id idtac.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"in" hyp(id)
"at" int_or_var_list(o) :=
setoidreplaceinat (rel x y) id idtac o.
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"in" hyp(id)
"by" tactic3(t) :=
setoidreplacein (rel x y) id ltac:(t).
Tactic Notation "setoid_replace" constr(x) "with" constr(y)
"using" "relation" constr(rel)
"in" hyp(id)
"at" int_or_var_list(o)
"by" tactic3(t) :=
setoidreplaceinat (rel x y) id ltac:(t) o.
The add_morphism_tactic tactic is run at each Add Morphism
command before giving the hand back to the user to discharge the
proof. It essentially amounts to unfold the right amount of
respectful calls and substitute leibniz equalities. One can
redefine it using Ltac add_morphism_tactic ::= t.
Require Import Coq.Program.Tactics.
Local Open Scope signature_scope.
Ltac red_subst_eq_morphism concl :=
match concl with
| @Logic.eq ?A ==> ?R' => red ; intros ; subst ; red_subst_eq_morphism R'
| ?R ==> ?R' => red ; intros ; red_subst_eq_morphism R'
| _ => idtac
end.
Ltac destruct_proper :=
match goal with
| [ |- @Proper ?A ?R ?m ] => red
end.
Ltac reverse_arrows x :=
match x with
| @Logic.eq ?A ==> ?R' => revert_last ; reverse_arrows R'
| ?R ==> ?R' => do 3 revert_last ; reverse_arrows R'
| _ => idtac
end.
Ltac default_add_morphism_tactic :=
unfold flip ; intros ;
(try destruct_proper) ;
match goal with
| [ |- (?x ==> ?y) _ _ ] => red_subst_eq_morphism (x ==> y) ; reverse_arrows (x ==> y)
end.
Ltac add_morphism_tactic := default_add_morphism_tactic.
Obligation Tactic := program_simpl.