Library mathcomp.ssreflect.ssreflect
(* (c) Copyright 2006-2016 Microsoft Corporation and Inria.
Distributed under the terms of CeCILL-B. *)
From Coq Require Export ssreflect.
Distributed under the terms of CeCILL-B. *)
From Coq Require Export ssreflect.
v8.20 additions:
[elaborate x] == triggers coq elaboration to fill the holes of the term x
The main use case is to trigger typeclass inference in
the body of a ssreflect have := [elaborate body].
Intro pattern ltac views:
- calling rewrite from an intro pattern, use with parsimony => / [1! rules] := rewrite rules => / [! rules] := rewrite !rules
Reserved Notation "[ 'elaborate' x ]" (at level 0).
Notation "[ 'elaborate' x ]" := (ltac:(refine x)) (only parsing).
Module Export ipat.
Notation "'[' '1' '!' rules ']'" := (ltac:(rewrite rules))
(at level 0, rules at level 200, only parsing) : ssripat_scope.
Notation "'[' '!' rules ']'" := (ltac:(rewrite !rules))
(at level 0, rules at level 200, only parsing) : ssripat_scope.
End ipat.
A class to trigger reduction by rewriting.
Usage: rewrite [pattern]vm_compute.
Alternatively one may redefine a lemma as in algebra/rat.v :
Lemma rat_vm_compute n (x : rat) : vm_compute_eq n%:Q x -> n%:Q = x.
Proof. exact. Qed.
Class vm_compute_eq {T : Type} (x y : T) := vm_compute : x = y.
#[global]
Hint Extern 0 (@vm_compute_eq _ _ _) ⇒
vm_compute; reflexivity : typeclass_instances.
#[deprecated(since="mathcomp 2.3.0", note="Use `Arguments def : simpl never` instead (should work fine since Coq 8.18).")]
Notation nosimpl t := (nosimpl t).