isabelle: src/HOL/Number_Theory/Eratosthenes.thy@31e9920a0dc1 (annotated)

51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	1	(* Title: HOL/Number_Theory/Eratosthenes.thy
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	2	Author: Florian Haftmann, TU Muenchen
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	3	*)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	4
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	5	section \<open>The sieve of Eratosthenes\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	6
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	7	theory Eratosthenes
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	8	imports Main Primes
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	9	begin
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	10
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	11
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	12	subsection \<open>Preliminary: strict divisibility\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	13
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	14	context dvd
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	15	begin
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	16
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	17	abbreviation dvd_strict :: "'a \<Rightarrow> 'a \<Rightarrow> bool" (infixl "dvd'_strict" 50)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	18	where
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	19	"b dvd_strict a \<equiv> b dvd a \<and> \<not> a dvd b"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	20
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	21	end
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	22
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	23
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	24	subsection \<open>Main corpus\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	25
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	26	text \<open>The sieve is modelled as a list of booleans, where @{const False} means \emph{marked out}.\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	27
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	28	type_synonym marks = "bool list"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	29
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	30	definition numbers_of_marks :: "nat \<Rightarrow> marks \<Rightarrow> nat set"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	31	where
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	32	"numbers_of_marks n bs = fst ` {x \<in> set (enumerate n bs). snd x}"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	33
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	34	lemma numbers_of_marks_simps [simp, code]:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	35	"numbers_of_marks n [] = {}"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	36	"numbers_of_marks n (True # bs) = insert n (numbers_of_marks (Suc n) bs)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	37	"numbers_of_marks n (False # bs) = numbers_of_marks (Suc n) bs"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	38	by (auto simp add: numbers_of_marks_def intro!: image_eqI)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	39
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	40	lemma numbers_of_marks_Suc:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	41	"numbers_of_marks (Suc n) bs = Suc ` numbers_of_marks n bs"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	42	by (auto simp add: numbers_of_marks_def enumerate_Suc_eq image_iff Bex_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	43
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	44	lemma numbers_of_marks_replicate_False [simp]:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	45	"numbers_of_marks n (replicate m False) = {}"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	46	by (auto simp add: numbers_of_marks_def enumerate_replicate_eq)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	47
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	48	lemma numbers_of_marks_replicate_True [simp]:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	49	"numbers_of_marks n (replicate m True) = {n..<n+m}"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	50	by (auto simp add: numbers_of_marks_def enumerate_replicate_eq image_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	51
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	52	lemma in_numbers_of_marks_eq:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	53	"m \<in> numbers_of_marks n bs \<longleftrightarrow> m \<in> {n..<n + length bs} \<and> bs ! (m - n)"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 55337 diff changeset	54	by (simp add: numbers_of_marks_def in_set_enumerate_eq image_iff add.commute)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	55
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	56	lemma sorted_list_of_set_numbers_of_marks:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	57	"sorted_list_of_set (numbers_of_marks n bs) = map fst (filter snd (enumerate n bs))"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	58	by (auto simp add: numbers_of_marks_def distinct_map
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	59	intro!: sorted_filter distinct_filter inj_onI sorted_distinct_set_unique)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	60
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	61
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	62	text \<open>Marking out multiples in a sieve\<close>
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	63
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	64	definition mark_out :: "nat \<Rightarrow> marks \<Rightarrow> marks"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	65	where
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	66	"mark_out n bs = map (\<lambda>(q, b). b \<and> \<not> Suc n dvd Suc (Suc q)) (enumerate n bs)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	67
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	68	lemma mark_out_Nil [simp]: "mark_out n [] = []"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	69	by (simp add: mark_out_def)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	70
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	71	lemma length_mark_out [simp]: "length (mark_out n bs) = length bs"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	72	by (simp add: mark_out_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	73
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	74	lemma numbers_of_marks_mark_out:
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	75	"numbers_of_marks n (mark_out m bs) = {q \<in> numbers_of_marks n bs. \<not> Suc m dvd Suc q - n}"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	76	by (auto simp add: numbers_of_marks_def mark_out_def in_set_enumerate_eq image_iff
54222 24874b4024d1 generalised lemma haftmann parents: 52379 diff changeset	77	nth_enumerate_eq less_eq_dvd_minus)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	78
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	79
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	80	text \<open>Auxiliary operation for efficient implementation\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	81
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	82	definition mark_out_aux :: "nat \<Rightarrow> nat \<Rightarrow> marks \<Rightarrow> marks"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	83	where
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	84	"mark_out_aux n m bs =
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	85	map (\<lambda>(q, b). b \<and> (q < m + n \<or> \<not> Suc n dvd Suc (Suc q) + (n - m mod Suc n))) (enumerate n bs)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	86
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	87	lemma mark_out_code [code]: "mark_out n bs = mark_out_aux n n bs"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	88	proof -
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	89	have aux: False
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	90	if A: "Suc n dvd Suc (Suc a)"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	91	and B: "a < n + n"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	92	and C: "n \<le> a"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	93	for a
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	94	proof (cases "n = 0")
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	95	case True
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	96	with A B C show ?thesis by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	97	next
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	98	case False
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62349 diff changeset	99	define m where "m = Suc n"
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	100	then have "m > 0" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	101	from False have "n > 0" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	102	from A obtain q where q: "Suc (Suc a) = Suc n * q" by (rule dvdE)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	103	have "q > 0"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	104	proof (rule ccontr)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	105	assume "\<not> q > 0"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	106	with q show False by simp
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	107	qed
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	108	with \<open>n > 0\<close> have "Suc n * q \<ge> 2" by (auto simp add: gr0_conv_Suc)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	109	with q have a: "a = Suc n * q - 2" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	110	with B have "q + n * q < n + n + 2" by auto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	111	then have "m * q < m * 2" by (simp add: m_def)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	112	with \<open>m > 0\<close> have "q < 2" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	113	with \<open>q > 0\<close> have "q = 1" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	114	with a have "a = n - 1" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	115	with \<open>n > 0\<close> C show False by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	116	qed
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	117	show ?thesis
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	118	by (auto simp add: mark_out_def mark_out_aux_def in_set_enumerate_eq intro: aux)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	119	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	120
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	121	lemma mark_out_aux_simps [simp, code]:
60583 a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	122	"mark_out_aux n m [] = []"
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	123	"mark_out_aux n 0 (b # bs) = False # mark_out_aux n n bs"
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	124	"mark_out_aux n (Suc m) (b # bs) = b # mark_out_aux n m bs"
61166 5976fe402824 renamed method "goals" to "goal_cases" to emphasize its meaning; wenzelm parents: 60583 diff changeset	125	proof goal_cases
60583 a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	126	case 1
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	127	show ?case
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	128	by (simp add: mark_out_aux_def)
60583 a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	129	next
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	130	case 2
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	131	show ?case
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	132	by (auto simp add: mark_out_code [symmetric] mark_out_aux_def mark_out_def
54222 24874b4024d1 generalised lemma haftmann parents: 52379 diff changeset	133	enumerate_Suc_eq in_set_enumerate_eq less_eq_dvd_minus)
60583 a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	134	next
a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	135	case 3
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62349 diff changeset	136	{ define v where "v = Suc m"
eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62349 diff changeset	137	define w where "w = Suc n"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	138	fix q
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	139	assume "m + n \<le> q"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	140	then obtain r where q: "q = m + n + r" by (auto simp add: le_iff_add)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	141	{ fix u
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	142	from w_def have "u mod w < w" by simp
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	143	then have "u + (w - u mod w) = w + (u - u mod w)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	144	by simp
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	145	then have "u + (w - u mod w) = w + u div w * w"
64243 aee949f6642d eliminated irregular aliasses haftmann parents: 63633 diff changeset	146	by (simp add: minus_mod_eq_div_mult)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	147	}
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	148	then have "w dvd v + w + r + (w - v mod w) \<longleftrightarrow> w dvd m + w + r + (w - m mod w)"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 55337 diff changeset	149	by (simp add: add.assoc add.left_commute [of m] add.left_commute [of v]
58649 a62065b5e1e2 generalized and consolidated some theorems concerning divisibility haftmann parents: 57512 diff changeset	150	dvd_add_left_iff dvd_add_right_iff)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	151	moreover from q have "Suc q = m + w + r" by (simp add: w_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	152	moreover from q have "Suc (Suc q) = v + w + r" by (simp add: v_def w_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	153	ultimately have "w dvd Suc (Suc (q + (w - v mod w))) \<longleftrightarrow> w dvd Suc (q + (w - m mod w))"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	154	by (simp only: add_Suc [symmetric])
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	155	then have "Suc n dvd Suc (Suc (Suc (q + n) - Suc m mod Suc n)) \<longleftrightarrow>
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	156	Suc n dvd Suc (Suc (q + n - m mod Suc n))"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	157	by (simp add: v_def w_def Suc_diff_le trans_le_add2)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	158	}
60583 a645a0e6d790 tuned proofs; wenzelm parents: 60527 diff changeset	159	then show ?case
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	160	by (auto simp add: mark_out_aux_def
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	161	enumerate_Suc_eq in_set_enumerate_eq not_less)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	162	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	163
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	164
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	165	text \<open>Main entry point to sieve\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	166
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	167	fun sieve :: "nat \<Rightarrow> marks \<Rightarrow> marks"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	168	where
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	169	"sieve n [] = []"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	170	\| "sieve n (False # bs) = False # sieve (Suc n) bs"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	171	\| "sieve n (True # bs) = True # sieve (Suc n) (mark_out n bs)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	172
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	173	text \<open>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	174	There are the following possible optimisations here:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	175
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	176	\begin{itemize}
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	177
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	178	\item @{const sieve} can abort as soon as @{term n} is too big to let
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	179	@{const mark_out} have any effect.
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	180
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	181	\item Search for further primes can be given up as soon as the search
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	182	position exceeds the square root of the maximum candidate.
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	183
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	184	\end{itemize}
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	185
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	186	This is left as an constructive exercise to the reader.
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	187	\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	188
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	189	lemma numbers_of_marks_sieve:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	190	"numbers_of_marks (Suc n) (sieve n bs) =
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	191	{q \<in> numbers_of_marks (Suc n) bs. \<forall>m \<in> numbers_of_marks (Suc n) bs. \<not> m dvd_strict q}"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	192	proof (induct n bs rule: sieve.induct)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	193	case 1
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	194	show ?case by simp
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	195	next
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	196	case 2
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	197	then show ?case by simp
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	198	next
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	199	case (3 n bs)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	200	have aux: "n \<in> Suc ` M \<longleftrightarrow> n > 0 \<and> n - 1 \<in> M" (is "?lhs \<longleftrightarrow> ?rhs") for M n
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	201	proof
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	202	show ?rhs if ?lhs using that by auto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	203	show ?lhs if ?rhs
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	204	proof -
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	205	from that have "n > 0" and "n - 1 \<in> M" by auto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	206	then have "Suc (n - 1) \<in> Suc ` M" by blast
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	207	with \<open>n > 0\<close> show "n \<in> Suc ` M" by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	208	qed
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	209	qed
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	210	have aux1: False if "Suc (Suc n) \<le> m" and "m dvd Suc n" for m :: nat
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	211	proof -
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	212	from \<open>m dvd Suc n\<close> obtain q where "Suc n = m * q" ..
fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	213	with \<open>Suc (Suc n) \<le> m\<close> have "Suc (m * q) \<le> m" by simp
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	214	then have "m * q < m" by arith
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	215	then have "q = 0" by simp
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	216	with \<open>Suc n = m * q\<close> show ?thesis by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	217	qed
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	218	have aux2: "m dvd q"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	219	if 1: "\<forall>q>0. 1 < q \<longrightarrow> Suc n < q \<longrightarrow> q \<le> Suc (n + length bs) \<longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	220	bs ! (q - Suc (Suc n)) \<longrightarrow> \<not> Suc n dvd q \<longrightarrow> q dvd m \<longrightarrow> m dvd q"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	221	and 2: "\<not> Suc n dvd m" "q dvd m"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	222	and 3: "Suc n < q" "q \<le> Suc (n + length bs)" "bs ! (q - Suc (Suc n))"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	223	for m q :: nat
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	224	proof -
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	225	from 1 have *: "\<And>q. Suc n < q \<Longrightarrow> q \<le> Suc (n + length bs) \<Longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	226	bs ! (q - Suc (Suc n)) \<Longrightarrow> \<not> Suc n dvd q \<Longrightarrow> q dvd m \<Longrightarrow> m dvd q"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	227	by auto
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	228	from 2 have "\<not> Suc n dvd q" by (auto elim: dvdE)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	229	moreover note 3
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	230	moreover note \<open>q dvd m\<close>
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	231	ultimately show ?thesis by (auto intro: *)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	232	qed
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	233	from 3 show ?case
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	234	apply (simp_all add: numbers_of_marks_mark_out numbers_of_marks_Suc Compr_image_eq
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	235	inj_image_eq_iff in_numbers_of_marks_eq Ball_def imp_conjL aux)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	236	apply safe
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	237	apply (simp_all add: less_diff_conv2 le_diff_conv2 dvd_minus_self not_less)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	238	apply (clarsimp dest!: aux1)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	239	apply (simp add: Suc_le_eq less_Suc_eq_le)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	240	apply (rule aux2)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	241	apply (clarsimp dest!: aux1)+
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	242	done
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	243	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	244
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	245
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	246	text \<open>Relation of the sieve algorithm to actual primes\<close>
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	247
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	248	definition primes_upto :: "nat \<Rightarrow> nat list"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	249	where
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	250	"primes_upto n = sorted_list_of_set {m. m \<le> n \<and> prime m}"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	251
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	252	lemma set_primes_upto: "set (primes_upto n) = {m. m \<le> n \<and> prime m}"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	253	by (simp add: primes_upto_def)
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	254
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	255	lemma sorted_primes_upto [iff]: "sorted (primes_upto n)"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	256	by (simp add: primes_upto_def)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	257
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	258	lemma distinct_primes_upto [iff]: "distinct (primes_upto n)"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	259	by (simp add: primes_upto_def)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	260
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	261	lemma set_primes_upto_sieve:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	262	"set (primes_upto n) = numbers_of_marks 2 (sieve 1 (replicate (n - 1) True))"
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	263	proof -
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	264	consider "n = 0 \<or> n = 1" \| "n > 1" by arith
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	265	then show ?thesis
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	266	proof cases
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	267	case 1
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	268	then show ?thesis
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	269	by (auto simp add: numbers_of_marks_sieve numeral_2_eq_2 set_primes_upto
55337 5d45fb978d5a Number_Theory no longer introduces One_nat_def as a simprule. Tidied some proofs. paulson <lp15@cam.ac.uk> parents: 55130 diff changeset	270	dest: prime_gt_Suc_0_nat)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	271	next
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	272	case 2
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	273	{
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	274	fix m q
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	275	assume "Suc (Suc 0) \<le> q"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	276	and "q < Suc n"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	277	and "m dvd q"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	278	then have "m < Suc n" by (auto dest: dvd_imp_le)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	279	assume *: "\<forall>m\<in>{Suc (Suc 0)..<Suc n}. m dvd q \<longrightarrow> q dvd m"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	280	and "m dvd q" and "m \<noteq> 1"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	281	have "m = q"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	282	proof (cases "m = 0")
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	283	case True with \<open>m dvd q\<close> show ?thesis by simp
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	284	next
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	285	case False with \<open>m \<noteq> 1\<close> have "Suc (Suc 0) \<le> m" by arith
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	286	with \<open>m < Suc n\<close> * \<open>m dvd q\<close> have "q dvd m" by simp
62349 7c23469b5118 cleansed junk-producing interpretations for gcd/lcm on nat altogether haftmann parents: 61762 diff changeset	287	with \<open>m dvd q\<close> show ?thesis by (simp add: dvd_antisym)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	288	qed
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	289	}
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	290	then have aux: "\<And>m q. Suc (Suc 0) \<le> q \<Longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	291	q < Suc n \<Longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	292	m dvd q \<Longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	293	\<forall>m\<in>{Suc (Suc 0)..<Suc n}. m dvd q \<longrightarrow> q dvd m \<Longrightarrow>
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	294	m dvd q \<Longrightarrow> m \<noteq> q \<Longrightarrow> m = 1" by auto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	295	from 2 show ?thesis
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	296	apply (auto simp add: numbers_of_marks_sieve numeral_2_eq_2 set_primes_upto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	297	dest: prime_gt_Suc_0_nat)
63633 2accfb71e33b is_prime -> prime eberlm <eberlm@in.tum.de> parents: 63534 diff changeset	298	apply (metis One_nat_def Suc_le_eq less_not_refl prime_nat_iff)
2accfb71e33b is_prime -> prime eberlm <eberlm@in.tum.de> parents: 63534 diff changeset	299	apply (metis One_nat_def Suc_le_eq aux prime_nat_iff)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	300	done
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	301	qed
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	302	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	303
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	304	lemma primes_upto_sieve [code]:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	305	"primes_upto n = map fst (filter snd (enumerate 2 (sieve 1 (replicate (n - 1) True))))"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	306	proof -
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	307	have "primes_upto n = sorted_list_of_set (numbers_of_marks 2 (sieve 1 (replicate (n - 1) True)))"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	308	apply (rule sorted_distinct_set_unique)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	309	apply (simp_all only: set_primes_upto_sieve numbers_of_marks_def)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	310	apply auto
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	311	done
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	312	then show ?thesis
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	313	by (simp add: sorted_list_of_set_numbers_of_marks)
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	314	qed
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	315
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	316	lemma prime_in_primes_upto: "prime n \<longleftrightarrow> n \<in> set (primes_upto n)"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	317	by (simp add: set_primes_upto)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	318
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	319
60526 fad653acf58f isabelle update_cartouches; wenzelm parents: 58889 diff changeset	320	subsection \<open>Application: smallest prime beyond a certain number\<close>
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	321
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	322	definition smallest_prime_beyond :: "nat \<Rightarrow> nat"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	323	where
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	324	"smallest_prime_beyond n = (LEAST p. prime p \<and> p \<ge> n)"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	325
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	326	lemma prime_smallest_prime_beyond [iff]: "prime (smallest_prime_beyond n)" (is ?P)
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	327	and smallest_prime_beyond_le [iff]: "smallest_prime_beyond n \<ge> n" (is ?Q)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	328	proof -
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	329	let ?least = "LEAST p. prime p \<and> p \<ge> n"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	330	from primes_infinite obtain q where "prime q \<and> q \<ge> n"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	331	by (metis finite_nat_set_iff_bounded_le mem_Collect_eq nat_le_linear)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	332	then have "prime ?least \<and> ?least \<ge> n"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	333	by (rule LeastI)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	334	then show ?P and ?Q
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	335	by (simp_all add: smallest_prime_beyond_def)
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	336	qed
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	337
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	338	lemma smallest_prime_beyond_smallest: "prime p \<Longrightarrow> p \<ge> n \<Longrightarrow> smallest_prime_beyond n \<le> p"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	339	by (simp only: smallest_prime_beyond_def) (auto intro: Least_le)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	340
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	341	lemma smallest_prime_beyond_eq:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	342	"prime p \<Longrightarrow> p \<ge> n \<Longrightarrow> (\<And>q. prime q \<Longrightarrow> q \<ge> n \<Longrightarrow> q \<ge> p) \<Longrightarrow> smallest_prime_beyond n = p"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	343	by (simp only: smallest_prime_beyond_def) (auto intro: Least_equality)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	344
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	345	definition smallest_prime_between :: "nat \<Rightarrow> nat \<Rightarrow> nat option"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	346	where
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	347	"smallest_prime_between m n =
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	348	(if (\<exists>p. prime p \<and> m \<le> p \<and> p \<le> n) then Some (smallest_prime_beyond m) else None)"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	349
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	350	lemma smallest_prime_between_None:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	351	"smallest_prime_between m n = None \<longleftrightarrow> (\<forall>q. m \<le> q \<and> q \<le> n \<longrightarrow> \<not> prime q)"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	352	by (auto simp add: smallest_prime_between_def)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	353
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	354	lemma smallest_prime_betwen_Some:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	355	"smallest_prime_between m n = Some p \<longleftrightarrow> smallest_prime_beyond m = p \<and> p \<le> n"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	356	by (auto simp add: smallest_prime_between_def dest: smallest_prime_beyond_smallest [of _ m])
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	357
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	358	lemma [code]: "smallest_prime_between m n = List.find (\<lambda>p. p \<ge> m) (primes_upto n)"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	359	proof -
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	360	have "List.find (\<lambda>p. p \<ge> m) (primes_upto n) = Some (smallest_prime_beyond m)"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	361	if assms: "m \<le> p" "prime p" "p \<le> n" for p
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	362	proof -
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62349 diff changeset	363	define A where "A = {p. p \<le> n \<and> prime p \<and> m \<le> p}"
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	364	from assms have "smallest_prime_beyond m \<le> p"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	365	by (auto intro: smallest_prime_beyond_smallest)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	366	from this \<open>p \<le> n\<close> have *: "smallest_prime_beyond m \<le> n"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	367	by (rule order_trans)
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	368	from assms have ex: "\<exists>p\<le>n. prime p \<and> m \<le> p"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	369	by auto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	370	then have "finite A"
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	371	by (auto simp add: A_def)
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	372	with * have "Min A = smallest_prime_beyond m"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	373	by (auto simp add: A_def intro: Min_eqI smallest_prime_beyond_smallest)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	374	with ex sorted_primes_upto show ?thesis
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	375	by (auto simp add: set_primes_upto sorted_find_Min A_def)
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	376	qed
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	377	then show ?thesis
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	378	by (auto simp add: smallest_prime_between_def find_None_iff set_primes_upto
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	379	intro!: sym [of _ None])
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	380	qed
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	381
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	382	definition smallest_prime_beyond_aux :: "nat \<Rightarrow> nat \<Rightarrow> nat"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	383	where
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	384	"smallest_prime_beyond_aux k n = smallest_prime_beyond n"
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	385
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	386	lemma [code]:
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	387	"smallest_prime_beyond_aux k n =
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	388	(case smallest_prime_between n (k * n) of
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	389	Some p \<Rightarrow> p
eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	390	\| None \<Rightarrow> smallest_prime_beyond_aux (Suc k) n)"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	391	by (simp add: smallest_prime_beyond_aux_def smallest_prime_betwen_Some split: option.split)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	392
60527 eb431a5651fe tuned proofs; wenzelm parents: 60526 diff changeset	393	lemma [code]: "smallest_prime_beyond n = smallest_prime_beyond_aux 2 n"
52379 7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	394	by (simp add: smallest_prime_beyond_aux_def)
7f864f2219a9 selection operator smallest_prime_beyond haftmann parents: 51173 diff changeset	395
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: diff changeset	396	end

author	wenzelm
	Wed, 11 Jan 2017 20:01:55 +0100
changeset 64877	31e9920a0dc1
parent 64243	aee949f6642d
child 65417	fc41a5650fb1
permissions	-rw-r--r--