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(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * INRIA - CNRS - LIX - LRI - PPS - Copyright 1999-2010 *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
Require Import Wf_nat ZArith_base Omega Zcomplements.
Require Export Zpow_def.
Local Open Scope Z_scope.
(** * Power functions over [Z] *)
(** Nota : this file is mostly deprecated. The definition of [Z.pow]
and its usual properties are now provided by module [BinInt.Z].
Powers of 2 are also available there (see [Z.shiftl] and [Z.shiftr]).
Only remain here:
- [Zpower_nat] : a power function with a [nat] exponent
- old-style powers of two, such as [two_p]
- [Zdiv_rest] : a division + modulo when the divisor is a power of 2
*)
(** [Zpower_nat z n] is the n-th power of [z] when [n] is an unary
integer (type [nat]) and [z] a signed integer (type [Z]) *)
Definition Zpower_nat (z:Z) (n:nat) := nat_iter n (Z.mul z) 1.
Lemma Zpower_nat_0_r z : Zpower_nat z 0 = 1.
Proof. reflexivity. Qed.
Lemma Zpower_nat_succ_r n z : Zpower_nat z (S n) = z * (Zpower_nat z n).
Proof. reflexivity. Qed.
(** [Zpower_nat_is_exp] says [Zpower_nat] is a morphism for
[plus : nat->nat->nat] and [Z.mul : Z->Z->Z] *)
Lemma Zpower_nat_is_exp :
forall (n m:nat) (z:Z),
Zpower_nat z (n + m) = Zpower_nat z n * Zpower_nat z m.
Proof.
induction n.
- intros. now rewrite Zpower_nat_0_r, Z.mul_1_l.
- intros. simpl. now rewrite 2 Zpower_nat_succ_r, IHn, Z.mul_assoc.
Qed.
(** Conversions between powers of unary and binary integers *)
Lemma Zpower_pos_nat (z : Z) (p : positive) :
Z.pow_pos z p = Zpower_nat z (Pos.to_nat p).
Proof.
apply Pos2Nat.inj_iter.
Qed.
Lemma Zpower_nat_Z (z : Z) (n : nat) :
Zpower_nat z n = z ^ (Z.of_nat n).
Proof.
induction n. trivial.
rewrite Zpower_nat_succ_r, Nat2Z.inj_succ, Z.pow_succ_r.
now f_equal.
apply Nat2Z.is_nonneg.
Qed.
Theorem Zpower_nat_Zpower z n : 0 <= n ->
z^n = Zpower_nat z (Z.abs_nat n).
Proof.
intros. now rewrite Zpower_nat_Z, Zabs2Nat.id_abs, Z.abs_eq.
Qed.
(** The function [(Z.pow_pos z)] is a morphism
for [Pos.add : positive->positive->positive] and [Z.mul : Z->Z->Z] *)
Lemma Zpower_pos_is_exp (n m : positive)(z:Z) :
Z.pow_pos z (n + m) = Z.pow_pos z n * Z.pow_pos z m.
Proof.
now apply (Z.pow_add_r z (Zpos n) (Zpos m)).
Qed.
Hint Immediate Zpower_nat_is_exp Zpower_pos_is_exp : zarith.
Hint Unfold Zpower_pos Zpower_nat: zarith.
Theorem Zpower_exp x n m :
n >= 0 -> m >= 0 -> x ^ (n + m) = x ^ n * x ^ m.
Proof.
Z.swap_greater. apply Z.pow_add_r.
Qed.
Section Powers_of_2.
(** * Powers of 2 *)
(** For the powers of two, that will be widely used, a more direct
calculus is possible. [shift n m] computes [2^n * m], i.e.
[m] shifted by [n] positions *)
Definition shift_nat (n:nat) (z:positive) := nat_iter n xO z.
Definition shift_pos (n z:positive) := Pos.iter n xO z.
Definition shift (n:Z) (z:positive) :=
match n with
| Z0 => z
| Zpos p => Pos.iter p xO z
| Zneg p => z
end.
Definition two_power_nat (n:nat) := Zpos (shift_nat n 1).
Definition two_power_pos (x:positive) := Zpos (shift_pos x 1).
Definition two_p (x:Z) :=
match x with
| Z0 => 1
| Zpos y => two_power_pos y
| Zneg y => 0
end.
(** Equivalence with notions defined in BinInt *)
Lemma shift_nat_equiv n p : shift_nat n p = Pos.shiftl_nat p n.
Proof. reflexivity. Qed.
Lemma shift_pos_equiv n p : shift_pos n p = Pos.shiftl p (Npos n).
Proof. reflexivity. Qed.
Lemma shift_equiv n p : 0<=n -> Zpos (shift n p) = Z.shiftl (Zpos p) n.
Proof.
destruct n.
- trivial.
- simpl; intros. now apply Pos.iter_swap_gen.
- now destruct 1.
Qed.
Lemma two_power_nat_equiv n : two_power_nat n = 2 ^ (Z.of_nat n).
Proof.
induction n.
- trivial.
- now rewrite Nat2Z.inj_succ, Z.pow_succ_r, <- IHn by apply Nat2Z.is_nonneg.
Qed.
Lemma two_power_pos_equiv p : two_power_pos p = 2 ^ Zpos p.
Proof.
now apply Pos.iter_swap_gen.
Qed.
Lemma two_p_equiv x : two_p x = 2 ^ x.
Proof.
destruct x; trivial. apply two_power_pos_equiv.
Qed.
(** Properties of these old versions of powers of two *)
Lemma two_power_nat_S n : two_power_nat (S n) = 2 * two_power_nat n.
Proof. reflexivity. Qed.
Lemma shift_nat_plus n m x :
shift_nat (n + m) x = shift_nat n (shift_nat m x).
Proof.
apply iter_nat_plus.
Qed.
Theorem shift_nat_correct n x :
Zpos (shift_nat n x) = Zpower_nat 2 n * Zpos x.
Proof.
induction n.
- trivial.
- now rewrite Zpower_nat_succ_r, <- Z.mul_assoc, <- IHn.
Qed.
Theorem two_power_nat_correct n : two_power_nat n = Zpower_nat 2 n.
Proof.
now rewrite two_power_nat_equiv, Zpower_nat_Z.
Qed.
Lemma shift_pos_nat p x : shift_pos p x = shift_nat (Pos.to_nat p) x.
Proof.
apply Pos2Nat.inj_iter.
Qed.
Lemma two_power_pos_nat p : two_power_pos p = two_power_nat (Pos.to_nat p).
Proof.
unfold two_power_pos. now rewrite shift_pos_nat.
Qed.
Theorem shift_pos_correct p x :
Zpos (shift_pos p x) = Zpower_pos 2 p * Zpos x.
Proof.
now rewrite shift_pos_nat, Zpower_pos_nat, shift_nat_correct.
Qed.
Theorem two_power_pos_correct x : two_power_pos x = Z.pow_pos 2 x.
Proof.
apply two_power_pos_equiv.
Qed.
Theorem two_power_pos_is_exp x y :
two_power_pos (x + y) = two_power_pos x * two_power_pos y.
Proof.
rewrite 3 two_power_pos_equiv. now apply (Z.pow_add_r 2 (Zpos x) (Zpos y)).
Qed.
Lemma two_p_correct x : two_p x = 2^x.
Proof (two_p_equiv x).
Theorem two_p_is_exp x y :
0 <= x -> 0 <= y -> two_p (x + y) = two_p x * two_p y.
Proof.
rewrite !two_p_equiv. apply Z.pow_add_r.
Qed.
Lemma two_p_gt_ZERO x : 0 <= x -> two_p x > 0.
Proof.
Z.swap_greater. rewrite two_p_equiv. now apply Z.pow_pos_nonneg.
Qed.
Lemma two_p_S x : 0 <= x -> two_p (Z.succ x) = 2 * two_p x.
Proof.
rewrite !two_p_equiv. now apply Z.pow_succ_r.
Qed.
Lemma two_p_pred x : 0 <= x -> two_p (Z.pred x) < two_p x.
Proof.
rewrite !two_p_equiv. intros. apply Z.pow_lt_mono_r; auto with zarith.
Qed.
End Powers_of_2.
Hint Resolve two_p_gt_ZERO: zarith.
Hint Immediate two_p_pred two_p_S: zarith.
Section power_div_with_rest.
(** * Division by a power of two. *)
(** To [x:Z] and [p:positive], [q],[r] are associated such that
[x = 2^p.q + r] and [0 <= r < 2^p] *)
(** Invariant: [d*q + r = d'*q + r /\ d' = 2*d /\ 0<=r<d /\ 0<=r'<d'] *)
Definition Zdiv_rest_aux (qrd:Z * Z * Z) :=
let '(q,r,d) := qrd in
(match q with
| Z0 => (0, r)
| Zpos xH => (0, d + r)
| Zpos (xI n) => (Zpos n, d + r)
| Zpos (xO n) => (Zpos n, r)
| Zneg xH => (-1, d + r)
| Zneg (xI n) => (Zneg n - 1, d + r)
| Zneg (xO n) => (Zneg n, r)
end, 2 * d).
Definition Zdiv_rest (x:Z) (p:positive) :=
let (qr, d) := Pos.iter p Zdiv_rest_aux (x, 0, 1) in qr.
Lemma Zdiv_rest_correct1 (x:Z) (p:positive) :
let (_, d) := Pos.iter p Zdiv_rest_aux (x, 0, 1) in
d = two_power_pos p.
Proof.
rewrite Pos2Nat.inj_iter, two_power_pos_nat.
induction (Pos.to_nat p); simpl; trivial.
destruct (nat_iter n Zdiv_rest_aux (x,0,1)) as ((q,r),d).
unfold Zdiv_rest_aux. rewrite two_power_nat_S; now f_equal.
Qed.
Lemma Zdiv_rest_correct2 (x:Z) (p:positive) :
let '(q,r,d) := Pos.iter p Zdiv_rest_aux (x, 0, 1) in
x = q * d + r /\ 0 <= r < d.
Proof.
apply Pos.iter_invariant; [|omega].
intros ((q,r),d) (H,H'). unfold Zdiv_rest_aux.
destruct q as [ |[q|q| ]|[q|q| ]]; try omega.
- rewrite Z.pos_xI, Z.mul_add_distr_r in H.
rewrite Z.mul_shuffle3, Z.mul_assoc. omega.
- rewrite Z.pos_xO in H.
rewrite Z.mul_shuffle3, Z.mul_assoc. omega.
- rewrite Z.neg_xI, Z.mul_sub_distr_r in H.
rewrite Z.mul_sub_distr_r, Z.mul_shuffle3, Z.mul_assoc. omega.
- rewrite Z.neg_xO in H.
rewrite Z.mul_shuffle3, Z.mul_assoc. omega.
Qed.
(** Old-style rich specification by proof of existence *)
Inductive Zdiv_rest_proofs (x:Z) (p:positive) : Set :=
Zdiv_rest_proof :
forall q r:Z,
x = q * two_power_pos p + r ->
0 <= r -> r < two_power_pos p -> Zdiv_rest_proofs x p.
Lemma Zdiv_rest_correct (x:Z) (p:positive) : Zdiv_rest_proofs x p.
Proof.
generalize (Zdiv_rest_correct1 x p); generalize (Zdiv_rest_correct2 x p).
destruct (Pos.iter p Zdiv_rest_aux (x, 0, 1)) as ((q,r),d).
intros (H1,(H2,H3)) ->. now exists q r.
Qed.
(** Direct correctness of [Zdiv_rest] *)
Lemma Zdiv_rest_ok x p :
let (q,r) := Zdiv_rest x p in
x = q * 2^(Zpos p) + r /\ 0 <= r < 2^(Zpos p).
Proof.
unfold Zdiv_rest.
generalize (Zdiv_rest_correct1 x p); generalize (Zdiv_rest_correct2 x p).
destruct (Pos.iter p Zdiv_rest_aux (x, 0, 1)) as ((q,r),d).
intros H ->. now rewrite two_power_pos_equiv in H.
Qed.
(** Equivalence with [Z.shiftr] *)
Lemma Zdiv_rest_shiftr x p :
fst (Zdiv_rest x p) = Z.shiftr x (Zpos p).
Proof.
generalize (Zdiv_rest_ok x p). destruct (Zdiv_rest x p) as (q,r).
intros (H,H'). simpl.
rewrite Z.shiftr_div_pow2 by easy.
apply Z.div_unique_pos with r; trivial. now rewrite Z.mul_comm.
Qed.
End power_div_with_rest.
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