Mercurial > cpdt > repo
view src/CpdtTactics.v @ 366:03e200599633
Remove home page reference to Part IV
author | Adam Chlipala <adam@chlipala.net> |
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date | Sun, 06 Nov 2011 16:54:40 -0500 |
parents | d5787b70cf48 |
children | d1276004eec9 |
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(* Copyright (c) 2008-2011, Adam Chlipala * * This work is licensed under a * Creative Commons Attribution-Noncommercial-No Derivative Works 3.0 * Unported License. * The license text is available at: * http://creativecommons.org/licenses/by-nc-nd/3.0/ *) Require Import Eqdep List. Require Omega. Set Implicit Arguments. Ltac inject H := injection H; clear H; intros; try subst. Ltac appHyps f := match goal with | [ H : _ |- _ ] => f H end. Ltac inList x ls := match ls with | x => idtac | (_, x) => idtac | (?LS, _) => inList x LS end. Ltac app f ls := match ls with | (?LS, ?X) => f X || app f LS || fail 1 | _ => f ls end. Ltac all f ls := match ls with | (?LS, ?X) => f X; all f LS | (_, _) => fail 1 | _ => f ls end. Ltac simplHyp invOne := let invert H F := inList F invOne; (inversion H; fail) || (inversion H; [idtac]; clear H; try subst) in match goal with | [ H : ex _ |- _ ] => destruct H | [ H : ?F ?X = ?F ?Y |- ?G ] => (assert (X = Y); [ assumption | fail 1 ]) || (injection H; match goal with | [ |- X = Y -> G ] => try clear H; intros; try subst end) | [ H : ?F ?X ?U = ?F ?Y ?V |- ?G ] => (assert (X = Y); [ assumption | assert (U = V); [ assumption | fail 1 ] ]) || (injection H; match goal with | [ |- U = V -> X = Y -> G ] => try clear H; intros; try subst end) | [ H : ?F _ |- _ ] => invert H F | [ H : ?F _ _ |- _ ] => invert H F | [ H : ?F _ _ _ |- _ ] => invert H F | [ H : ?F _ _ _ _ |- _ ] => invert H F | [ H : ?F _ _ _ _ _ |- _ ] => invert H F | [ H : existT _ ?T _ = existT _ ?T _ |- _ ] => generalize (inj_pair2 _ _ _ _ _ H); clear H | [ H : existT _ _ _ = existT _ _ _ |- _ ] => inversion H; clear H | [ H : Some _ = Some _ |- _ ] => injection H; clear H end. Ltac rewriteHyp := match goal with | [ H : _ |- _ ] => rewrite H; auto; [idtac] end. Ltac rewriterP := repeat (rewriteHyp; autorewrite with cpdt in *). Ltac rewriter := autorewrite with cpdt in *; rewriterP. Hint Rewrite app_ass : cpdt. Definition done (T : Type) (x : T) := True. Ltac inster e trace := match type of e with | forall x : _, _ => match goal with | [ H : _ |- _ ] => inster (e H) (trace, H) | _ => fail 2 end | _ => match trace with | (_, _) => match goal with | [ H : done (trace, _) |- _ ] => fail 1 | _ => let T := type of e in match type of T with | Prop => generalize e; intro; assert (done (trace, tt)); [constructor | idtac] | _ => all ltac:(fun X => match goal with | [ H : done (_, X) |- _ ] => fail 1 | _ => idtac end) trace; let i := fresh "i" in (pose (i := e); assert (done (trace, i)); [constructor | idtac]) end end end end. Ltac un_done := repeat match goal with | [ H : done _ |- _ ] => clear H end. Require Import JMeq. Ltac crush' lemmas invOne := let sintuition := simpl in *; intuition; try subst; repeat (simplHyp invOne; intuition; try subst); try congruence in let rewriter := autorewrite with cpdt in *; repeat (match goal with | [ H : ?P |- _ ] => match P with | context[JMeq] => fail 1 | _ => (rewrite H; []) || (rewrite H; [ | solve [ crush' lemmas invOne ] ]) || (rewrite H; [ | solve [ crush' lemmas invOne ] | solve [ crush' lemmas invOne ] ]) end end; autorewrite with cpdt in *) in (sintuition; rewriter; match lemmas with | false => idtac | _ => repeat ((app ltac:(fun L => inster L L) lemmas || appHyps ltac:(fun L => inster L L)); repeat (simplHyp invOne; intuition)); un_done end; sintuition; rewriter; sintuition; try omega; try (elimtype False; omega)). Ltac crush := crush' false fail. Require Import Program.Equality. Ltac dep_destruct E := let x := fresh "x" in remember E as x; simpl in x; dependent destruction x; try match goal with | [ H : _ = E |- _ ] => rewrite <- H in *; clear H end. Ltac clear_all := repeat match goal with | [ H : _ |- _ ] => clear H end. Ltac guess v H := repeat match type of H with | forall x : ?T, _ => match type of T with | Prop => (let H' := fresh "H'" in assert (H' : T); [ solve [ eauto 6 ] | generalize (H H'); clear H H'; intro H ]) || fail 1 | _ => (generalize (H v); clear H; intro H) || let x := fresh "x" in evar (x : T); let x' := eval cbv delta [x] in x in clear x; generalize (H x'); clear H; intro H end end. Ltac guessKeep v H := let H' := fresh "H'" in generalize H; intro H'; guess v H'.