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21 (* v * The Coq Proof Assistant / The Coq Development Team *)
23 (* <O___,, * INRIA-Rocquencourt & LRI-CNRS-Orsay *)
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33 (*i $Id: EqNat.v,v 1.14 2003/11/29 17:28:28 herbelin Exp $ i*)
35 (*#* Equality on natural numbers *)
38 Open Local Scope nat_scope.
42 Implicit Types m n x y : nat.
45 inline procedural "cic:/Coq/Arith/EqNat/eq_nat.con" as definition.
47 inline procedural "cic:/Coq/Arith/EqNat/eq_nat_refl.con" as theorem.
50 Hint Resolve eq_nat_refl: arith v62.
53 inline procedural "cic:/Coq/Arith/EqNat/eq_eq_nat.con" as theorem.
56 Hint Immediate eq_eq_nat: arith v62.
59 inline procedural "cic:/Coq/Arith/EqNat/eq_nat_eq.con" as theorem.
62 Hint Immediate eq_nat_eq: arith v62.
65 inline procedural "cic:/Coq/Arith/EqNat/eq_nat_elim.con" as theorem.
67 inline procedural "cic:/Coq/Arith/EqNat/eq_nat_decide.con" as theorem.
69 inline procedural "cic:/Coq/Arith/EqNat/beq_nat.con" as definition.
71 inline procedural "cic:/Coq/Arith/EqNat/beq_nat_refl.con" as lemma.
73 inline procedural "cic:/Coq/Arith/EqNat/beq_nat_eq.con" as definition.