diff options
Diffstat (limited to 'theories/Numbers/Integer/SpecViaZ')
| -rw-r--r-- | theories/Numbers/Integer/SpecViaZ/ZSig.v | 2 | ||||
| -rw-r--r-- | theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v | 17 |
2 files changed, 18 insertions, 1 deletions
diff --git a/theories/Numbers/Integer/SpecViaZ/ZSig.v b/theories/Numbers/Integer/SpecViaZ/ZSig.v index 37f5b294e1..b5c761a6f2 100644 --- a/theories/Numbers/Integer/SpecViaZ/ZSig.v +++ b/theories/Numbers/Integer/SpecViaZ/ZSig.v @@ -51,6 +51,7 @@ Module Type ZType. Parameter pow_N : t -> N -> t. Parameter pow : t -> t -> t. Parameter sqrt : t -> t. + Parameter log2 : t -> t. Parameter div_eucl : t -> t -> t * t. Parameter div : t -> t -> t. Parameter modulo : t -> t -> t. @@ -79,6 +80,7 @@ Module Type ZType. Parameter spec_pow_N: forall x n, [pow_N x n] = [x] ^ Z_of_N n. Parameter spec_pow: forall x n, [pow x n] = [x] ^ [n]. Parameter spec_sqrt: forall x, [sqrt x] = Zsqrt [x]. + Parameter spec_log2: forall x, [log2 x] = Zlog2 [x]. Parameter spec_div_eucl: forall x y, let (q,r) := div_eucl x y in ([q], [r]) = Zdiv_eucl [x] [y]. Parameter spec_div: forall x y, [div x y] = [x] / [y]. diff --git a/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v b/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v index c2965016ad..96f243fa62 100644 --- a/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v +++ b/theories/Numbers/Integer/SpecViaZ/ZSigZAxioms.v @@ -20,7 +20,7 @@ Hint Rewrite spec_0 spec_1 spec_2 spec_add spec_sub spec_pred spec_succ spec_mul spec_opp spec_of_Z spec_div spec_modulo spec_sqrt spec_compare spec_eq_bool spec_max spec_min spec_abs spec_sgn - spec_pow spec_even spec_odd + spec_pow spec_log2 spec_even spec_odd : zsimpl. Ltac zsimpl := autorewrite with zsimpl. @@ -293,6 +293,21 @@ Proof. intros n. zify. apply Zsqrt_neg. Qed. +(** Log2 *) + +Program Instance log2_wd : Proper (eq==>eq) log2. + +Lemma log2_spec : forall n, 0<n -> + 2^(log2 n) <= n /\ n < 2^(succ (log2 n)). +Proof. + intros n. zify. apply Zlog2_spec. +Qed. + +Lemma log2_nonpos : forall n, n<=0 -> log2 n == 0. +Proof. + intros n. zify. apply Zlog2_nonpos. +Qed. + (** Even / Odd *) Definition Even n := exists m, n == 2*m. |