isabelle: src/HOL/Library/Log_Nat.thy@943f99825f39 (annotated)

63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	1	(* Title: HOL/Library/Log_Nat.thy
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	2	Author: Johannes Hölzl, Fabian Immler
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	3	Copyright 2012 TU München
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	4	*)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	5
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	6	section \<open>Logarithm of Natural Numbers\<close>
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	7
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	8	theory Log_Nat
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	9	imports Complex_Main
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	10	begin
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	11
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	12	subsection \<open>Preliminaries\<close>
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	13
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	14	lemma divide_nat_diff_div_nat_less_one:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	15	"real x / real b - real (x div b) < 1" for x b :: nat
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	16	proof (cases "b = 0")
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	17	case True
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	18	then show ?thesis
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	19	by simp
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	20	next
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	21	case False
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	22	then have "real (x div b) + real (x mod b) / real b - real (x div b) < 1"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	23	by (simp add: field_simps)
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	24	then show ?thesis
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	25	by (simp add: real_of_nat_div_aux [symmetric])
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	26	qed
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	27
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	28
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	29	subsection \<open>Floorlog\<close>
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	30
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	31	definition floorlog :: "nat \<Rightarrow> nat \<Rightarrow> nat"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	32	where "floorlog b a = (if a > 0 \<and> b > 1 then nat \<lfloor>log b a\<rfloor> + 1 else 0)"
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	33
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	34	lemma floorlog_mono: "x \<le> y \<Longrightarrow> floorlog b x \<le> floorlog b y"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	35	by (auto simp: floorlog_def floor_mono nat_mono)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	36
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	37	lemma floorlog_bounds:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	38	"b ^ (floorlog b x - 1) \<le> x \<and> x < b ^ (floorlog b x)" if "x > 0" "b > 1"
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	39	proof
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	40	show "b ^ (floorlog b x - 1) \<le> x"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	41	proof -
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	42	have "b ^ nat \<lfloor>log b x\<rfloor> = b powr \<lfloor>log b x\<rfloor>"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	43	using powr_realpow[symmetric, of b "nat \<lfloor>log b x\<rfloor>"] \<open>x > 0\<close> \<open>b > 1\<close>
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	44	by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	45	also have "\<dots> \<le> b powr log b x" using \<open>b > 1\<close> by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	46	also have "\<dots> = real_of_int x" using \<open>0 < x\<close> \<open>b > 1\<close> by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	47	finally have "b ^ nat \<lfloor>log b x\<rfloor> \<le> real_of_int x" by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	48	then show ?thesis
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	49	using \<open>0 < x\<close> \<open>b > 1\<close> of_nat_le_iff
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	50	by (fastforce simp add: floorlog_def)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	51	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	52	show "x < b ^ (floorlog b x)"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	53	proof -
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	54	have "x \<le> b powr (log b x)" using \<open>x > 0\<close> \<open>b > 1\<close> by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	55	also have "\<dots> < b powr (\<lfloor>log b x\<rfloor> + 1)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	56	using that by (intro powr_less_mono) auto
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	57	also have "\<dots> = b ^ nat (\<lfloor>log b (real_of_int x)\<rfloor> + 1)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	58	using that by (simp flip: powr_realpow)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	59	finally
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	60	have "x < b ^ nat (\<lfloor>log b (int x)\<rfloor> + 1)"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	61	by (rule of_nat_less_imp_less)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	62	then show ?thesis
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	63	using \<open>x > 0\<close> \<open>b > 1\<close> by (simp add: floorlog_def nat_add_distrib)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	64	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	65	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	66
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	67	lemma floorlog_power [simp]:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	68	"floorlog b (a * b ^ c) = floorlog b a + c" if "a > 0" "b > 1"
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	69	proof -
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	70	have "\<lfloor>log b a + real c\<rfloor> = \<lfloor>log b a\<rfloor> + c" by arith
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	71	then show ?thesis using that
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	72	by (auto simp: floorlog_def log_mult powr_realpow[symmetric] nat_add_distrib)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	73	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	74
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	75	lemma floor_log_add_eqI:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	76	"\<lfloor>log b (a + r)\<rfloor> = \<lfloor>log b a\<rfloor>" if "b > 1" "a \<ge> 1" "0 \<le> r" "r < 1"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	77	for a b :: nat and r :: real
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	78	proof (rule floor_eq2)
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	79	have "log b a \<le> log b (a + r)" using that by force
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	80	then show "\<lfloor>log b a\<rfloor> \<le> log b (a + r)" by arith
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	81	next
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	82	define l::int where "l = int b ^ (nat \<lfloor>log b a\<rfloor> + 1)"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	83	have l_def_real: "l = b powr (\<lfloor>log b a\<rfloor> + 1)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	84	using that by (simp add: l_def powr_add powr_real_of_int)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	85	have "a < l"
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	86	proof -
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	87	have "a = b powr (log b a)" using that by simp
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	88	also have "\<dots> < b powr floor ((log b a) + 1)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	89	using that(1) by auto
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	90	also have "\<dots> = l"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	91	using that by (simp add: l_def powr_real_of_int powr_add)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	92	finally show ?thesis by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	93	qed
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	94	then have "a + r < l" using that by simp
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	95	then have "log b (a + r) < log b l" using that by simp
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	96	also have "\<dots> = real_of_int \<lfloor>log b a\<rfloor> + 1"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	97	using that by (simp add: l_def_real)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	98	finally show "log b (a + r) < real_of_int \<lfloor>log b a\<rfloor> + 1" .
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	99	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	100
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	101	lemma floor_log_div:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	102	"\<lfloor>log b x\<rfloor> = \<lfloor>log b (x div b)\<rfloor> + 1" if "b > 1" "x > 0" "x div b > 0"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	103	for b x :: nat
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	104	proof-
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	105	have "\<lfloor>log b x\<rfloor> = \<lfloor>log b (x / b * b)\<rfloor>" using that by simp
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	106	also have "\<dots> = \<lfloor>log b (x / b) + log b b\<rfloor>"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	107	using that by (subst log_mult) auto
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	108	also have "\<dots> = \<lfloor>log b (x / b)\<rfloor> + 1" using that by simp
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	109	also have "\<lfloor>log b (x / b)\<rfloor> = \<lfloor>log b (x div b + (x / b - x div b))\<rfloor>" by simp
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	110	also have "\<dots> = \<lfloor>log b (x div b)\<rfloor>"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	111	using that real_of_nat_div4 divide_nat_diff_div_nat_less_one
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	112	by (intro floor_log_add_eqI) auto
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	113	finally show ?thesis .
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	114	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	115
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	116	lemma compute_floorlog [code]:
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	117	"floorlog b x = (if x > 0 \<and> b > 1 then floorlog b (x div b) + 1 else 0)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	118	by (auto simp: floorlog_def floor_log_div[of b x] div_eq_0_iff nat_add_distrib
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	119	intro!: floor_eq2)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	120
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	121	lemma floor_log_eq_if:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	122	"\<lfloor>log b x\<rfloor> = \<lfloor>log b y\<rfloor>" if "x div b = y div b" "b > 1" "x > 0" "x div b \<ge> 1"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	123	for b x y :: nat
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	124	proof -
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	125	have "y > 0" using that by (auto intro: ccontr)
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	126	thus ?thesis using that by (simp add: floor_log_div)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	127	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	128
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	129	lemma floorlog_eq_if:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	130	"floorlog b x = floorlog b y" if "x div b = y div b" "b > 1" "x > 0" "x div b \<ge> 1"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	131	for b x y :: nat
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	132	proof -
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	133	have "y > 0" using that by (auto intro: ccontr)
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	134	then show ?thesis using that
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	135	by (auto simp add: floorlog_def eq_nat_nat_iff intro: floor_log_eq_if)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	136	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	137
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	138	lemma floorlog_leD:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	139	"floorlog b x \<le> w \<Longrightarrow> b > 1 \<Longrightarrow> x < b ^ w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	140	by (metis floorlog_bounds leD linorder_neqE_nat order.strict_trans power_strict_increasing_iff
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	141	zero_less_one zero_less_power)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	142
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	143	lemma floorlog_leI:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	144	"x < b ^ w \<Longrightarrow> 0 \<le> w \<Longrightarrow> b > 1 \<Longrightarrow> floorlog b x \<le> w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	145	by (drule less_imp_of_nat_less[where 'a=real])
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	146	(auto simp: floorlog_def Suc_le_eq nat_less_iff floor_less_iff log_of_power_less)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	147
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	148	lemma floorlog_eq_zero_iff:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	149	"floorlog b x = 0 \<longleftrightarrow> b \<le> 1 \<or> x \<le> 0"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	150	by (auto simp: floorlog_def)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	151
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	152	lemma floorlog_le_iff:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	153	"floorlog b x \<le> w \<longleftrightarrow> b \<le> 1 \<or> b > 1 \<and> 0 \<le> w \<and> x < b ^ w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	154	using floorlog_leD[of b x w] floorlog_leI[of x b w]
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	155	by (auto simp: floorlog_eq_zero_iff[THEN iffD2])
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	156
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	157	lemma floorlog_ge_SucI:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	158	"Suc w \<le> floorlog b x" if "b ^ w \<le> x" "b > 1"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	159	using that le_log_of_power[of b w x] power_not_zero
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	160	by (force simp: floorlog_def Suc_le_eq powr_realpow not_less Suc_nat_eq_nat_zadd1
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	161	zless_nat_eq_int_zless int_add_floor less_floor_iff
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	162	simp del: floor_add2)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	163
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	164	lemma floorlog_geI:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	165	"w \<le> floorlog b x" if "b ^ (w - 1) \<le> x" "b > 1"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	166	using floorlog_ge_SucI[of b "w - 1" x] that
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	167	by auto
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	168
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	169	lemma floorlog_geD:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	170	"b ^ (w - 1) \<le> x" if "w \<le> floorlog b x" "w > 0"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	171	proof -
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	172	have "b > 1" "0 < x"
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	173	using that by (auto simp: floorlog_def split: if_splits)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	174	have "b ^ (w - 1) \<le> x" if "b ^ w \<le> x"
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	175	proof -
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	176	have "b ^ (w - 1) \<le> b ^ w"
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	177	using \<open>b > 1\<close>
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	178	by (auto intro!: power_increasing)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	179	also note that
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	180	finally show ?thesis .
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	181	qed
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	182	moreover have "b ^ nat \<lfloor>log (real b) (real x)\<rfloor> \<le> x" (is "?l \<le> _")
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	183	proof -
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	184	have "0 \<le> log (real b) (real x)"
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	185	using \<open>b > 1\<close> \<open>0 < x\<close>
75455 91c16c5ad3e9 tidied auto / simp with null arguments paulson <lp15@cam.ac.uk> parents: 70350 diff changeset	186	by auto
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	187	then have "?l \<le> b powr log (real b) (real x)"
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	188	using \<open>b > 1\<close>
68406 6beb45f6cf67 utilize 'flip' nipkow parents: 67573 diff changeset	189	by (auto simp flip: powr_realpow intro!: powr_mono of_nat_floor)
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	190	also have "\<dots> = x" using \<open>b > 1\<close> \<open>0 < x\<close>
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	191	by auto
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	192	finally show ?thesis
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	193	unfolding of_nat_le_iff .
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	194	qed
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	195	ultimately show ?thesis
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	196	using that
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	197	by (auto simp: floorlog_def le_nat_iff le_floor_iff le_log_iff powr_realpow
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	198	split: if_splits elim!: le_SucE)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	199	qed
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	200
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	201
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	202	subsection \<open>Bitlen\<close>
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	203
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	204	definition bitlen :: "int \<Rightarrow> int"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	205	where "bitlen a = floorlog 2 (nat a)"
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	206
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	207	lemma bitlen_alt_def:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	208	"bitlen a = (if a > 0 then \<lfloor>log 2 a\<rfloor> + 1 else 0)"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	209	by (simp add: bitlen_def floorlog_def)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	210
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	211	lemma bitlen_zero [simp]:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	212	"bitlen 0 = 0"
67573 ed0a7090167d added lemmas, avoid 'float_of 0' immler parents: 66912 diff changeset	213	by (auto simp: bitlen_def floorlog_def)
ed0a7090167d added lemmas, avoid 'float_of 0' immler parents: 66912 diff changeset	214
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	215	lemma bitlen_nonneg:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	216	"0 \<le> bitlen x"
67573 ed0a7090167d added lemmas, avoid 'float_of 0' immler parents: 66912 diff changeset	217	by (simp add: bitlen_def)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	218
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	219	lemma bitlen_bounds:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	220	"2 ^ nat (bitlen x - 1) \<le> x \<and> x < 2 ^ nat (bitlen x)" if "x > 0"
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	221	proof -
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	222	from that have "bitlen x \<ge> 1" by (auto simp: bitlen_alt_def)
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	223	with that floorlog_bounds[of "nat x" 2] show ?thesis
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	224	by (auto simp add: bitlen_def le_nat_iff nat_less_iff nat_diff_distrib)
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	225	qed
28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	226
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	227	lemma bitlen_pow2 [simp]:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	228	"bitlen (b * 2 ^ c) = bitlen b + c" if "b > 0"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	229	using that by (simp add: bitlen_def nat_mult_distrib nat_power_eq)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	230
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	231	lemma compute_bitlen [code]:
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	232	"bitlen x = (if x > 0 then bitlen (x div 2) + 1 else 0)"
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	233	by (simp add: bitlen_def nat_div_distrib compute_floorlog)
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	234
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	235	lemma bitlen_eq_zero_iff:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	236	"bitlen x = 0 \<longleftrightarrow> x \<le> 0"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	237	by (auto simp add: bitlen_alt_def)
63664 9ddc48a8635e tuned nipkow parents: 63663 diff changeset	238	(metis compute_bitlen add.commute bitlen_alt_def bitlen_nonneg less_add_same_cancel2
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	239	not_less zero_less_one)
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	240
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	241	lemma bitlen_div:
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	242	"1 \<le> real_of_int m / 2^nat (bitlen m - 1)"
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	243	and "real_of_int m / 2^nat (bitlen m - 1) < 2" if "0 < m"
63664 9ddc48a8635e tuned nipkow parents: 63663 diff changeset	244	proof -
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	245	let ?B = "2^nat (bitlen m - 1)"
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	246
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	247	have "?B \<le> m" using bitlen_bounds[OF \<open>0 <m\<close>] ..
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	248	then have "1 * ?B \<le> real_of_int m"
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	249	unfolding of_int_le_iff[symmetric] by auto
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	250	then show "1 \<le> real_of_int m / ?B" by auto
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	251
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	252	from that have "0 \<le> bitlen m - 1" by (auto simp: bitlen_alt_def)
63664 9ddc48a8635e tuned nipkow parents: 63663 diff changeset	253
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	254	have "m < 2^nat(bitlen m)" using bitlen_bounds[OF that] ..
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	255	also from that have "\<dots> = 2^nat(bitlen m - 1 + 1)"
63664 9ddc48a8635e tuned nipkow parents: 63663 diff changeset	256	by (auto simp: bitlen_def)
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	257	also have "\<dots> = ?B * 2"
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	258	unfolding nat_add_distrib[OF \<open>0 \<le> bitlen m - 1\<close> zero_le_one] by auto
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	259	finally have "real_of_int m < 2 * ?B"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	260	by (metis (full_types) mult.commute power.simps(2) of_int_less_numeral_power_cancel_iff)
63664 9ddc48a8635e tuned nipkow parents: 63663 diff changeset	261	then have "real_of_int m / ?B < 2 * ?B / ?B"
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	262	by (rule divide_strict_right_mono) auto
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	263	then show "real_of_int m / ?B < 2" by auto
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	264	qed
9ddc48a8635e tuned nipkow parents: 63663 diff changeset	265
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	266	lemma bitlen_le_iff_floorlog:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	267	"bitlen x \<le> w \<longleftrightarrow> w \<ge> 0 \<and> floorlog 2 (nat x) \<le> nat w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	268	by (auto simp: bitlen_def)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	269
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	270	lemma bitlen_le_iff_power:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	271	"bitlen x \<le> w \<longleftrightarrow> w \<ge> 0 \<and> x < 2 ^ nat w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	272	by (auto simp: bitlen_le_iff_floorlog floorlog_le_iff)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	273
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	274	lemma less_power_nat_iff_bitlen:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	275	"x < 2 ^ w \<longleftrightarrow> bitlen (int x) \<le> w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	276	using bitlen_le_iff_power[of x w]
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	277	by auto
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	278
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	279	lemma bitlen_ge_iff_power:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	280	"w \<le> bitlen x \<longleftrightarrow> w \<le> 0 \<or> 2 ^ (nat w - 1) \<le> x"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	281	unfolding bitlen_def
68406 6beb45f6cf67 utilize 'flip' nipkow parents: 67573 diff changeset	282	by (auto simp flip: nat_le_iff intro: floorlog_geI dest: floorlog_geD)
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	283
70349 697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	284	lemma bitlen_twopow_add_eq:
697450fd25c1 misc tuning and modernization haftmann parents: 68406 diff changeset	285	"bitlen (2 ^ w + b) = w + 1" if "0 \<le> b" "b < 2 ^ w"
66912 a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	286	by (auto simp: that nat_add_distrib bitlen_le_iff_power bitlen_ge_iff_power intro!: antisym)
a99a7cbf0fb5 generalized lemmas cancelling real_of_int/real in (in)equalities with power; completed set of related simp rules; lemmas about floorlog/bitlen immler parents: 63664 diff changeset	287
63663 28d1deca302e Extracted floorlog and bitlen to separate theory Log_Nat nipkow parents: diff changeset	288	end

author	paulson <lp15@cam.ac.uk>
	Mon, 24 Oct 2022 15:58:06 +0100
changeset 76368	943f99825f39
parent 75455	91c16c5ad3e9
child 80732	3eda814762fc
permissions	-rw-r--r--