Library Coq.Init.Peano
The type nat of Peano natural numbers (built from O and S)
is defined in Datatypes.v
This module defines the following operations on natural numbers :
It states various lemmas and theorems about natural numbers, including Peano's axioms of arithmetic (in Coq, these are provable). Case analysis on nat and induction on nat * nat are provided too
- predecessor pred
- addition plus
- multiplication mult
- less or equal order le
- less lt
- greater or equal ge
- greater gt
It states various lemmas and theorems about natural numbers, including Peano's axioms of arithmetic (in Coq, these are provable). Case analysis on nat and induction on nat * nat are provided too
Require Import Notations.
Require Import Datatypes.
Require Import Logic.
Open Scope nat_scope.
Definition eq_S := f_equal S.
Hint Resolve (f_equal S): v62.
Hint Resolve (f_equal (A:=nat)): core.
The predecessor function
Definition pred (n:nat) : nat := match n with
| O => n
| S u => u
end.
Hint Resolve (f_equal pred): v62.
Theorem pred_Sn : forall n:nat, n = pred (S n).
Injectivity of successor
Theorem eq_add_S : forall n m:nat, S n = S m -> n = m.
Hint Immediate eq_add_S: core.
Theorem not_eq_S : forall n m:nat, n <> m -> S n <> S m.
Hint Resolve not_eq_S: core.
Definition IsSucc (n:nat) : Prop :=
match n with
| O => False
| S p => True
end.
Zero is not the successor of a number
Theorem O_S : forall n:nat, 0 <> S n.
Hint Resolve O_S: core.
Theorem n_Sn : forall n:nat, n <> S n.
Hint Resolve n_Sn: core.
Addition
Fixpoint plus (n m:nat) {struct n} : nat :=
match n with
| O => m
| S p => S (p + m)
end
where "n + m" := (plus n m) : nat_scope.
Hint Resolve (f_equal2 plus): v62.
Hint Resolve (f_equal2 (A1:=nat) (A2:=nat)): core.
Lemma plus_n_O : forall n:nat, n = n + 0.
Hint Resolve plus_n_O: core.
Lemma plus_O_n : forall n:nat, 0 + n = n.
Lemma plus_n_Sm : forall n m:nat, S (n + m) = n + S m.
Hint Resolve plus_n_Sm: core.
Lemma plus_Sn_m : forall n m:nat, S n + m = S (n + m).
Standard associated names
Notation plus_0_r_reverse := plus_n_O (only parsing).
Notation plus_succ_r_reverse := plus_n_Sm (only parsing).
Multiplication
Fixpoint mult (n m:nat) {struct n} : nat :=
match n with
| O => 0
| S p => m + p * m
end
where "n * m" := (mult n m) : nat_scope.
Hint Resolve (f_equal2 mult): core.
Lemma mult_n_O : forall n:nat, 0 = n * 0.
Hint Resolve mult_n_O: core.
Lemma mult_n_Sm : forall n m:nat, n * m + n = n * S m.
Hint Resolve mult_n_Sm: core.
Standard associated names
Notation mult_0_r_reverse := mult_n_O (only parsing).
Notation mult_succ_r_reverse := mult_n_Sm (only parsing).
Truncated subtraction: m-n is 0 if n>=m
Fixpoint minus (n m:nat) {struct n} : nat :=
match n, m with
| O, _ => n
| S k, O => n
| S k, S l => k - l
end
where "n - m" := (minus n m) : nat_scope.
Definition of the usual orders, the basic properties of le and lt
can be found in files Le and Lt
Inductive le (n:nat) : nat -> Prop :=
| le_n : n <= n
| le_S : forall m:nat, n <= m -> n <= S m
where "n <= m" := (le n m) : nat_scope.
Hint Constructors le: core.
Definition lt (n m:nat) := S n <= m.
Hint Unfold lt: core.
Infix "<" := lt : nat_scope.
Definition ge (n m:nat) := m <= n.
Hint Unfold ge: core.
Infix ">=" := ge : nat_scope.
Definition gt (n m:nat) := m < n.
Hint Unfold gt: core.
Infix ">" := gt : nat_scope.
Notation "x <= y <= z" := (x <= y /\ y <= z) : nat_scope.
Notation "x <= y < z" := (x <= y /\ y < z) : nat_scope.
Notation "x < y < z" := (x < y /\ y < z) : nat_scope.
Notation "x < y <= z" := (x < y /\ y <= z) : nat_scope.
Case analysis
Principle of double induction
Theorem nat_double_ind :
forall R:nat -> nat -> Prop,
(forall n:nat, R 0 n) ->
(forall n:nat, R (S n) 0) ->
(forall n m:nat, R n m -> R (S n) (S m)) -> forall n m:nat, R n m.