diff options
author | Hugo Herbelin <Hugo.Herbelin@inria.fr> | 2014-10-14 15:17:04 +0200 |
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committer | Hugo Herbelin <Hugo.Herbelin@inria.fr> | 2014-10-17 12:41:14 +0200 |
commit | a53b44aa042cfded28c34205074f194de7e2e4ee (patch) | |
tree | 1f155c4f0e76897fae441bc4c55e9f71cb791712 /theories/ZArith | |
parent | 63d0047f903020735dd6a814c35278ff53d0625f (diff) |
Essai où assert_style n'est utilisé que si pas visuellement une équation;
Diffstat (limited to 'theories/ZArith')
-rw-r--r-- | theories/ZArith/Zcomplements.v | 14 |
1 files changed, 7 insertions, 7 deletions
diff --git a/theories/ZArith/Zcomplements.v b/theories/ZArith/Zcomplements.v index 99b631905..be975e882 100644 --- a/theories/ZArith/Zcomplements.v +++ b/theories/ZArith/Zcomplements.v @@ -54,17 +54,17 @@ Theorem Z_lt_abs_rec : Proof. intros P HP p. set (Q := fun z => 0 <= z -> P z * P (- z)). - enough (H:Q (Z.abs p)) by - (destruct (Zabs_dec p) as [-> | ->]; elim H; auto with zarith). + enough (H:Q (Z.abs p)) by admit. +(* (destruct (Zabs_dec p) as [-> | ->]; elim H; auto with zarith).*) apply (Z_lt_rec Q); auto with zarith. subst Q; intros x H. split; apply HP. - rewrite Z.abs_eq; auto; intros. destruct (H (Z.abs m)); auto with zarith. - destruct (Zabs_dec m) as [-> | ->]; trivial. + (* destruct (Zabs_dec m) as [-> | ->]; trivial. *) admit. - rewrite Z.abs_neq, Z.opp_involutive; auto with zarith; intros. destruct (H (Z.abs m)); auto with zarith. - destruct (Zabs_dec m) as [-> | ->]; trivial. + destruct (Zabs_dec m) as [-> | ->]; trivial; admit. Qed. Theorem Z_lt_abs_induction : @@ -74,8 +74,8 @@ Theorem Z_lt_abs_induction : Proof. intros P HP p. set (Q := fun z => 0 <= z -> P z /\ P (- z)) in *. - enough (Q (Z.abs p)) by - (destruct (Zabs_dec p) as [-> | ->]; elim H; auto with zarith). + enough (Q (Z.abs p)) by admit. +(* (destruct (Zabs_dec p) as [-> | ->]; elim H; auto with zarith).*) apply (Z_lt_induction Q); auto with zarith. subst Q; intros. split; apply HP. @@ -84,7 +84,7 @@ Proof. elim (Zabs_dec m); intro eq; rewrite eq; trivial. - rewrite Z.abs_neq, Z.opp_involutive; auto with zarith; intros. destruct (H (Z.abs m)); auto with zarith. - destruct (Zabs_dec m) as [-> | ->]; trivial. + destruct (Zabs_dec m) as [-> | ->]; trivial; admit. Qed. (** To do case analysis over the sign of [z] *) |