Library Coq.ZArith.Zorder
Binary Integers : results about order predicates Initial author : Pierre Crégut (CNET, Lannion, France)
THIS FILE IS DEPRECATED.
It is now almost entirely made of compatibility formulations
for results already present in BinInt.Z.
Require Import BinPos BinInt Decidable Zcompare.
Require Import Arith_base.
Local Open Scope Z_scope.
Theorem Ztrichotomy_inf n m : {n < m} + {n = m} + {n > m}.
Theorem Ztrichotomy n m : n < m \/ n = m \/ n > m.
Notation dec_eq := Z.eq_decidable (only parsing).
Notation dec_Zle := Z.le_decidable (only parsing).
Notation dec_Zlt := Z.lt_decidable (only parsing).
Theorem dec_Zne n m : decidable (Zne n m).
Theorem dec_Zgt n m : decidable (n > m).
Theorem dec_Zge n m : decidable (n >= m).
Theorem not_Zeq n m : n <> m -> n < m \/ m < n.
Notation Zgt_lt := Z.gt_lt (compat "8.7").
Notation Zlt_gt := Z.lt_gt (compat "8.7").
Notation Zge_le := Z.ge_le (compat "8.7").
Notation Zle_ge := Z.le_ge (compat "8.7").
Notation Zgt_iff_lt := Z.gt_lt_iff (only parsing).
Notation Zge_iff_le := Z.ge_le_iff (only parsing).
Lemma Zle_not_lt n m : n <= m -> ~ m < n.
Lemma Zlt_not_le n m : n < m -> ~ m <= n.
Lemma Zle_not_gt n m : n <= m -> ~ n > m.
Lemma Zgt_not_le n m : n > m -> ~ n <= m.
Lemma Znot_ge_lt n m : ~ n >= m -> n < m.
Lemma Znot_lt_ge n m : ~ n < m -> n >= m.
Lemma Znot_gt_le n m: ~ n > m -> n <= m.
Lemma Znot_le_gt n m : ~ n <= m -> n > m.
Lemma not_Zne n m : ~ Zne n m -> n = m.
Notation Zle_refl := Z.le_refl (compat "8.7").
Notation Zeq_le := Z.eq_le_incl (only parsing).
Hint Resolve Z.le_refl: zarith.
Antisymmetry
Asymmetry
Irreflexivity
Notation Zlt_irrefl := Z.lt_irrefl (compat "8.7").
Notation Zlt_not_eq := Z.lt_neq (only parsing).
Lemma Zgt_irrefl n : ~ n > n.
Large = strict or equal
Notation Zlt_le_weak := Z.lt_le_incl (only parsing).
Notation Zle_lt_or_eq_iff := Z.lt_eq_cases (only parsing).
Lemma Zle_lt_or_eq n m : n <= m -> n < m \/ n = m.
Dichotomy
Transitivity of strict orders
Mixed transitivity
Notation Zlt_le_trans := Z.lt_le_trans (compat "8.7").
Notation Zle_lt_trans := Z.le_lt_trans (compat "8.7").
Lemma Zle_gt_trans n m p : m <= n -> m > p -> n > p.
Lemma Zgt_le_trans n m p : n > m -> p <= m -> n > p.
Transitivity of large orders
Notation Zle_trans := Z.le_trans (compat "8.7").
Lemma Zge_trans n m p : n >= m -> m >= p -> n >= p.
Hint Resolve Z.le_trans: zarith.
Lemma Zsucc_le_compat n m : m <= n -> Z.succ m <= Z.succ n.
Lemma Zsucc_lt_compat n m : n < m -> Z.succ n < Z.succ m.
Lemma Zsucc_gt_compat n m : m > n -> Z.succ m > Z.succ n.
Hint Resolve Zsucc_le_compat: zarith.
Simplification of successor wrt to order
Lemma Zsucc_gt_reg n m : Z.succ m > Z.succ n -> m > n.
Lemma Zsucc_le_reg n m : Z.succ m <= Z.succ n -> m <= n.
Lemma Zsucc_lt_reg n m : Z.succ n < Z.succ m -> n < m.
Special base instances of order
Notation Zlt_succ := Z.lt_succ_diag_r (only parsing).
Notation Zlt_pred := Z.lt_pred_l (only parsing).
Lemma Zgt_succ n : Z.succ n > n.
Lemma Znot_le_succ n : ~ Z.succ n <= n.
Relating strict and large order using successor or predecessor
Notation Zlt_succ_r := Z.lt_succ_r (compat "8.7").
Notation Zle_succ_l := Z.le_succ_l (compat "8.7").
Lemma Zgt_le_succ n m : m > n -> Z.succ n <= m.
Lemma Zle_gt_succ n m : n <= m -> Z.succ m > n.
Lemma Zle_lt_succ n m : n <= m -> n < Z.succ m.
Lemma Zlt_le_succ n m : n < m -> Z.succ n <= m.
Lemma Zgt_succ_le n m : Z.succ m > n -> n <= m.
Lemma Zlt_succ_le n m : n < Z.succ m -> n <= m.
Lemma Zle_succ_gt n m : Z.succ n <= m -> m > n.
Weakening order
Notation Zle_succ := Z.le_succ_diag_r (only parsing).
Notation Zle_pred := Z.le_pred_l (only parsing).
Notation Zlt_lt_succ := Z.lt_lt_succ_r (only parsing).
Notation Zle_le_succ := Z.le_le_succ_r (only parsing).
Lemma Zle_succ_le n m : Z.succ n <= m -> n <= m.
Hint Resolve Z.le_succ_diag_r: zarith.
Hint Resolve Z.le_le_succ_r: zarith.
Relating order wrt successor and order wrt predecessor
Lemma Zgt_succ_pred n m : m > Z.succ n -> Z.pred m > n.
Lemma Zlt_succ_pred n m : Z.succ n < m -> n < Z.pred m.
Relating strict order and large order on positive
Special cases of ordered integers
Notation Zlt_0_1 := Z.lt_0_1 (compat "8.7").
Notation Zle_0_1 := Z.le_0_1 (compat "8.7").
Lemma Zle_neg_pos : forall p q:positive, Zneg p <= Zpos q.
Lemma Zgt_pos_0 : forall p:positive, Zpos p > 0.
Lemma Zle_0_pos : forall p:positive, 0 <= Zpos p.
Lemma Zlt_neg_0 : forall p:positive, Zneg p < 0.
Lemma Zle_0_nat : forall n:nat, 0 <= Z.of_nat n.
Hint Immediate Z.eq_le_incl: zarith.
Derived lemma
Notation Zplus_lt_le_compat := Z.add_lt_le_mono (only parsing).
Notation Zplus_le_lt_compat := Z.add_le_lt_mono (only parsing).
Notation Zplus_le_compat := Z.add_le_mono (only parsing).
Notation Zplus_lt_compat := Z.add_lt_mono (only parsing).
Lemma Zplus_gt_compat_l n m p : n > m -> p + n > p + m.
Lemma Zplus_gt_compat_r n m p : n > m -> n + p > m + p.
Lemma Zplus_le_compat_l n m p : n <= m -> p + n <= p + m.
Lemma Zplus_le_compat_r n m p : n <= m -> n + p <= m + p.
Lemma Zplus_lt_compat_l n m p : n < m -> p + n < p + m.
Lemma Zplus_lt_compat_r n m p : n < m -> n + p < m + p.
Compatibility of addition wrt to being positive
Simplification of addition wrt to order
Lemma Zplus_le_reg_l n m p : p + n <= p + m -> n <= m.
Lemma Zplus_le_reg_r n m p : n + p <= m + p -> n <= m.
Lemma Zplus_lt_reg_l n m p : p + n < p + m -> n < m.
Lemma Zplus_lt_reg_r n m p : n + p < m + p -> n < m.
Lemma Zplus_gt_reg_l n m p : p + n > p + m -> n > m.
Lemma Zplus_gt_reg_r n m p : n + p > m + p -> n > m.
Lemma Zmult_le_compat_r n m p : n <= m -> 0 <= p -> n * p <= m * p.
Lemma Zmult_le_compat_l n m p : n <= m -> 0 <= p -> p * n <= p * m.
Lemma Zmult_lt_compat_r n m p : 0 < p -> n < m -> n * p < m * p.
Lemma Zmult_gt_compat_r n m p : p > 0 -> n > m -> n * p > m * p.
Lemma Zmult_gt_0_lt_compat_r n m p : p > 0 -> n < m -> n * p < m * p.
Lemma Zmult_gt_0_le_compat_r n m p : p > 0 -> n <= m -> n * p <= m * p.
Lemma Zmult_lt_0_le_compat_r n m p : 0 < p -> n <= m -> n * p <= m * p.
Lemma Zmult_gt_0_lt_compat_l n m p : p > 0 -> n < m -> p * n < p * m.
Lemma Zmult_lt_compat_l n m p : 0 < p -> n < m -> p * n < p * m.
Lemma Zmult_gt_compat_l n m p : p > 0 -> n > m -> p * n > p * m.
Lemma Zmult_ge_compat_r n m p : n >= m -> p >= 0 -> n * p >= m * p.
Lemma Zmult_ge_compat_l n m p : n >= m -> p >= 0 -> p * n >= p * m.
Lemma Zmult_ge_compat n m p q :
n >= p -> m >= q -> p >= 0 -> q >= 0 -> n * m >= p * q.
Lemma Zmult_le_compat n m p q :
n <= p -> m <= q -> 0 <= n -> 0 <= m -> n * m <= p * q.
Simplification of multiplication by a positive wrt to being positive
Lemma Zmult_gt_0_lt_reg_r n m p : p > 0 -> n * p < m * p -> n < m.
Lemma Zmult_lt_reg_r n m p : 0 < p -> n * p < m * p -> n < m.
Lemma Zmult_le_reg_r n m p : p > 0 -> n * p <= m * p -> n <= m.
Lemma Zmult_lt_0_le_reg_r n m p : 0 < p -> n * p <= m * p -> n <= m.
Lemma Zmult_ge_reg_r n m p : p > 0 -> n * p >= m * p -> n >= m.
Lemma Zmult_gt_reg_r n m p : p > 0 -> n * p > m * p -> n > m.
Lemma Zmult_lt_compat n m p q :
0 <= n < p -> 0 <= m < q -> n * m < p * q.
Lemma Zmult_lt_compat2 n m p q :
0 < n <= p -> 0 < m < q -> n * m < p * q.
Compatibility of multiplication by a positive wrt to being positive
Notation Zmult_le_0_compat := Z.mul_nonneg_nonneg (only parsing).
Notation Zmult_lt_0_compat := Z.mul_pos_pos (only parsing).
Notation Zmult_lt_O_compat := Z.mul_pos_pos (only parsing).
Lemma Zmult_gt_0_compat n m : n > 0 -> m > 0 -> n * m > 0.
Lemma Zmult_gt_0_le_0_compat n m : n > 0 -> 0 <= m -> 0 <= m * n.
Simplification of multiplication by a positive wrt to being positive
Lemma Zmult_le_0_reg_r n m : n > 0 -> 0 <= m * n -> 0 <= m.
Lemma Zmult_lt_0_reg_r n m : 0 < n -> 0 < m * n -> 0 < m.
Lemma Zmult_gt_0_lt_0_reg_r n m : n > 0 -> 0 < m * n -> 0 < m.
Lemma Zmult_gt_0_reg_l n m : n > 0 -> n * m > 0 -> m > 0.
Lemma Zlt_square_simpl n m : 0 <= n -> m * m < n * n -> m < n.
Lemma Zgt_square_simpl n m : n >= 0 -> n * n > m * m -> n > m.
Notation Zle_plus_swap := Z.le_add_le_sub_r (only parsing).
Notation Zlt_plus_swap := Z.lt_add_lt_sub_r (only parsing).
Notation Zlt_minus_simpl_swap := Z.lt_sub_pos (only parsing).
Lemma Zeq_plus_swap n m p : n + p = m <-> n = m - p.
Lemma Zlt_0_minus_lt n m : 0 < n - m -> m < n.
Lemma Zle_0_minus_le n m : 0 <= n - m -> m <= n.
Lemma Zle_minus_le_0 n m : m <= n -> 0 <= n - m.
For compatibility