Library Coq.Arith.Lt
Strict order on natural numbers.
This file is mostly OBSOLETE now, see module PeanoNat.Nat instead.
lt is defined in library Init/Peano.v as:
Definition lt (n m:nat) := S n <= m. Infix "<" := lt : nat_scope.
Theorem lt_le_S n m : n < m -> S n <= m.
Theorem lt_n_Sm_le n m : n < S m -> n <= m.
Theorem le_lt_n_Sm n m : n <= m -> n < S m.
Hint Immediate lt_le_S: arith.
Hint Immediate lt_n_Sm_le: arith.
Hint Immediate le_lt_n_Sm: arith.
Theorem le_not_lt n m : n <= m -> ~ m < n.
Theorem lt_not_le n m : n < m -> ~ m <= n.
Hint Immediate le_not_lt lt_not_le: arith.
Notation lt_0_Sn := Nat.lt_0_succ (only parsing). Notation lt_n_0 := Nat.nlt_0_r (only parsing).
Theorem neq_0_lt n : 0 <> n -> 0 < n.
Theorem lt_0_neq n : 0 < n -> 0 <> n.
Hint Resolve lt_0_Sn lt_n_0 : arith.
Hint Immediate neq_0_lt lt_0_neq: arith.
Notation lt_n_Sn := Nat.lt_succ_diag_r (only parsing). Notation lt_S := Nat.lt_lt_succ_r (only parsing).
Theorem lt_n_S n m : n < m -> S n < S m.
Theorem lt_S_n n m : S n < S m -> n < m.
Hint Resolve lt_n_Sn lt_S lt_n_S : arith.
Hint Immediate lt_S_n : arith.
Lemma S_pred n m : m < n -> n = S (pred n).
Lemma S_pred_pos n: O < n -> n = S (pred n).
Lemma lt_pred n m : S n < m -> n < pred m.
Lemma lt_pred_n_n n : 0 < n -> pred n < n.
Hint Immediate lt_pred: arith.
Hint Resolve lt_pred_n_n: arith.
Notation lt_trans := Nat.lt_trans (only parsing).
Notation lt_le_trans := Nat.lt_le_trans (only parsing).
Notation le_lt_trans := Nat.le_lt_trans (only parsing).
Hint Resolve lt_trans lt_le_trans le_lt_trans: arith.
Notation le_lt_or_eq_iff := Nat.lt_eq_cases (only parsing).
Theorem le_lt_or_eq n m : n <= m -> n < m \/ n = m.
Notation lt_le_weak := Nat.lt_le_incl (only parsing).
Hint Immediate lt_le_weak: arith.
Notation le_or_lt := Nat.le_gt_cases (only parsing).
Theorem nat_total_order n m : n <> m -> n < m \/ m < n.
For compatibility, we "Require" the same files as before