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Diffstat (limited to 'theories/Arith/Gt.v')
| -rwxr-xr-x | theories/Arith/Gt.v | 148 |
1 files changed, 148 insertions, 0 deletions
diff --git a/theories/Arith/Gt.v b/theories/Arith/Gt.v new file mode 100755 index 00000000..299c664d --- /dev/null +++ b/theories/Arith/Gt.v @@ -0,0 +1,148 @@ +(************************************************************************) +(* v * The Coq Proof Assistant / The Coq Development Team *) +(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *) +(* \VV/ **************************************************************) +(* // * This file is distributed under the terms of the *) +(* * GNU Lesser General Public License Version 2.1 *) +(************************************************************************) + +(*i $Id: Gt.v,v 1.8.2.1 2004/07/16 19:31:00 herbelin Exp $ i*) + +Require Import Le. +Require Import Lt. +Require Import Plus. +Open Local Scope nat_scope. + +Implicit Types m n p : nat. + +(** Order and successor *) + +Theorem gt_Sn_O : forall n, S n > 0. +Proof. + auto with arith. +Qed. +Hint Resolve gt_Sn_O: arith v62. + +Theorem gt_Sn_n : forall n, S n > n. +Proof. + auto with arith. +Qed. +Hint Resolve gt_Sn_n: arith v62. + +Theorem gt_n_S : forall n m, n > m -> S n > S m. +Proof. + auto with arith. +Qed. +Hint Resolve gt_n_S: arith v62. + +Lemma gt_S_n : forall n m, S m > S n -> m > n. +Proof. + auto with arith. +Qed. +Hint Immediate gt_S_n: arith v62. + +Theorem gt_S : forall n m, S n > m -> n > m \/ m = n. +Proof. + intros n m H; unfold gt in |- *; apply le_lt_or_eq; auto with arith. +Qed. + +Lemma gt_pred : forall n m, m > S n -> pred m > n. +Proof. + auto with arith. +Qed. +Hint Immediate gt_pred: arith v62. + +(** Irreflexivity *) + +Lemma gt_irrefl : forall n, ~ n > n. +Proof lt_irrefl. +Hint Resolve gt_irrefl: arith v62. + +(** Asymmetry *) + +Lemma gt_asym : forall n m, n > m -> ~ m > n. +Proof fun n m => lt_asym m n. + +Hint Resolve gt_asym: arith v62. + +(** Relating strict and large orders *) + +Lemma le_not_gt : forall n m, n <= m -> ~ n > m. +Proof le_not_lt. +Hint Resolve le_not_gt: arith v62. + +Lemma gt_not_le : forall n m, n > m -> ~ n <= m. +Proof. +auto with arith. +Qed. + +Hint Resolve gt_not_le: arith v62. + +Theorem le_S_gt : forall n m, S n <= m -> m > n. +Proof. + auto with arith. +Qed. +Hint Immediate le_S_gt: arith v62. + +Lemma gt_S_le : forall n m, S m > n -> n <= m. +Proof. + intros n p; exact (lt_n_Sm_le n p). +Qed. +Hint Immediate gt_S_le: arith v62. + +Lemma gt_le_S : forall n m, m > n -> S n <= m. +Proof. + auto with arith. +Qed. +Hint Resolve gt_le_S: arith v62. + +Lemma le_gt_S : forall n m, n <= m -> S m > n. +Proof. + auto with arith. +Qed. +Hint Resolve le_gt_S: arith v62. + +(** Transitivity *) + +Theorem le_gt_trans : forall n m p, m <= n -> m > p -> n > p. +Proof. + red in |- *; intros; apply lt_le_trans with m; auto with arith. +Qed. + +Theorem gt_le_trans : forall n m p, n > m -> p <= m -> n > p. +Proof. + red in |- *; intros; apply le_lt_trans with m; auto with arith. +Qed. + +Lemma gt_trans : forall n m p, n > m -> m > p -> n > p. +Proof. + red in |- *; intros n m p H1 H2. + apply lt_trans with m; auto with arith. +Qed. + +Theorem gt_trans_S : forall n m p, S n > m -> m > p -> n > p. +Proof. + red in |- *; intros; apply lt_le_trans with m; auto with arith. +Qed. + +Hint Resolve gt_trans_S le_gt_trans gt_le_trans: arith v62. + +(** Comparison to 0 *) + +Theorem gt_O_eq : forall n, n > 0 \/ 0 = n. +Proof. + intro n; apply gt_S; auto with arith. +Qed. + +(** Simplification and compatibility *) + +Lemma plus_gt_reg_l : forall n m p, p + n > p + m -> n > m. +Proof. + red in |- *; intros n m p H; apply plus_lt_reg_l with p; auto with arith. +Qed. + +Lemma plus_gt_compat_l : forall n m p, n > m -> p + n > p + m. +Proof. + auto with arith. +Qed. +Hint Resolve plus_gt_compat_l: arith v62.
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