Library Coq.Numbers.BinNums
Set Implicit Arguments.
positive is a datatype representing the strictly positive integers
in a binary way. Starting from 1 (represented by xH), one can
add a new least significant digit via xO (digit 0) or xI (digit 1).
Numbers in positive will also be denoted using a decimal notation;
e.g. 6%positive will abbreviate xO (xI xH)
Inductive positive : Set :=
| xI : positive -> positive
| xO : positive -> positive
| xH : positive.
Declare Scope positive_scope.
Delimit Scope positive_scope with positive.
Bind Scope positive_scope with positive.
Arguments xO _%positive.
Arguments xI _%positive.
Declare Scope hex_positive_scope.
Delimit Scope hex_positive_scope with xpositive.
Register positive as num.pos.type.
Register xI as num.pos.xI.
Register xO as num.pos.xO.
Register xH as num.pos.xH.
N is a datatype representing natural numbers in a binary way,
by extending the positive datatype with a zero.
Numbers in N will also be denoted using a decimal notation;
e.g. 6%N will abbreviate Npos (xO (xI xH))
Inductive N : Set :=
| N0 : N
| Npos : positive -> N.
Declare Scope N_scope.
Delimit Scope N_scope with N.
Bind Scope N_scope with N.
Arguments Npos _%positive.
Declare Scope hex_N_scope.
Delimit Scope hex_N_scope with xN.
Register N as num.N.type.
Register N0 as num.N.N0.
Register Npos as num.N.Npos.
Z is a datatype representing the integers in a binary way.
An integer is either zero or a strictly positive number
(coded as a positive) or a strictly negative number
(whose opposite is stored as a positive value).
Numbers in Z will also be denoted using a decimal notation;
e.g. (-6)%Z will abbreviate Zneg (xO (xI xH))
Inductive Z : Set :=
| Z0 : Z
| Zpos : positive -> Z
| Zneg : positive -> Z.
Declare Scope Z_scope.
Delimit Scope Z_scope with Z.
Bind Scope Z_scope with Z.
Arguments Zpos _%positive.
Arguments Zneg _%positive.
Declare Scope hex_Z_scope.
Delimit Scope hex_Z_scope with xZ.
Register Z as num.Z.type.
Register Z0 as num.Z.Z0.
Register Zpos as num.Z.Zpos.
Register Zneg as num.Z.Zneg.