isabelle: src/HOL/Euclidean_Division.thy@6ba663ff2b1c (annotated)

64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	1	(* Title: HOL/Euclidean_Division.thy
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	2	Author: Manuel Eberl, TU Muenchen
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	3	Author: Florian Haftmann, TU Muenchen
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	4	*)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	5
66817 0b12755ccbb2 euclidean rings need no normalization haftmann parents: 66816 diff changeset	6	section \<open>Division in euclidean (semi)rings\<close>
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	7
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	8	theory Euclidean_Division
66817 0b12755ccbb2 euclidean rings need no normalization haftmann parents: 66816 diff changeset	9	imports Int Lattices_Big
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	10	begin
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	11
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	12	subsection \<open>Euclidean (semi)rings with explicit division and remainder\<close>
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	13
66817 0b12755ccbb2 euclidean rings need no normalization haftmann parents: 66816 diff changeset	14	class euclidean_semiring = semidom_modulo +
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	15	fixes euclidean_size :: "'a \<Rightarrow> nat"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	16	assumes size_0 [simp]: "euclidean_size 0 = 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	17	assumes mod_size_less:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	18	"b \<noteq> 0 \<Longrightarrow> euclidean_size (a mod b) < euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	19	assumes size_mult_mono:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	20	"b \<noteq> 0 \<Longrightarrow> euclidean_size a \<le> euclidean_size (a * b)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	21	begin
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	22
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	23	lemma size_mult_mono': "b \<noteq> 0 \<Longrightarrow> euclidean_size a \<le> euclidean_size (b * a)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	24	by (subst mult.commute) (rule size_mult_mono)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	25
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	26	lemma dvd_euclidean_size_eq_imp_dvd:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	27	assumes "a \<noteq> 0" and "euclidean_size a = euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	28	and "b dvd a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	29	shows "a dvd b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	30	proof (rule ccontr)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	31	assume "\<not> a dvd b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	32	hence "b mod a \<noteq> 0" using mod_0_imp_dvd [of b a] by blast
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	33	then have "b mod a \<noteq> 0" by (simp add: mod_eq_0_iff_dvd)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	34	from \<open>b dvd a\<close> have "b dvd b mod a" by (simp add: dvd_mod_iff)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	35	then obtain c where "b mod a = b * c" unfolding dvd_def by blast
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	36	with \<open>b mod a \<noteq> 0\<close> have "c \<noteq> 0" by auto
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	37	with \<open>b mod a = b * c\<close> have "euclidean_size (b mod a) \<ge> euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	38	using size_mult_mono by force
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	39	moreover from \<open>\<not> a dvd b\<close> and \<open>a \<noteq> 0\<close>
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	40	have "euclidean_size (b mod a) < euclidean_size a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	41	using mod_size_less by blast
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	42	ultimately show False using \<open>euclidean_size a = euclidean_size b\<close>
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	43	by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	44	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	45
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	46	lemma euclidean_size_times_unit:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	47	assumes "is_unit a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	48	shows "euclidean_size (a * b) = euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	49	proof (rule antisym)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	50	from assms have [simp]: "a \<noteq> 0" by auto
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	51	thus "euclidean_size (a * b) \<ge> euclidean_size b" by (rule size_mult_mono')
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	52	from assms have "is_unit (1 div a)" by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	53	hence "1 div a \<noteq> 0" by (intro notI) simp_all
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	54	hence "euclidean_size (a * b) \<le> euclidean_size ((1 div a) * (a * b))"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	55	by (rule size_mult_mono')
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	56	also from assms have "(1 div a) * (a * b) = b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	57	by (simp add: algebra_simps unit_div_mult_swap)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	58	finally show "euclidean_size (a * b) \<le> euclidean_size b" .
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	59	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	60
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	61	lemma euclidean_size_unit:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	62	"is_unit a \<Longrightarrow> euclidean_size a = euclidean_size 1"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	63	using euclidean_size_times_unit [of a 1] by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	64
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	65	lemma unit_iff_euclidean_size:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	66	"is_unit a \<longleftrightarrow> euclidean_size a = euclidean_size 1 \<and> a \<noteq> 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	67	proof safe
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	68	assume A: "a \<noteq> 0" and B: "euclidean_size a = euclidean_size 1"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	69	show "is_unit a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	70	by (rule dvd_euclidean_size_eq_imp_dvd [OF A B]) simp_all
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	71	qed (auto intro: euclidean_size_unit)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	72
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	73	lemma euclidean_size_times_nonunit:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	74	assumes "a \<noteq> 0" "b \<noteq> 0" "\<not> is_unit a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	75	shows "euclidean_size b < euclidean_size (a * b)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	76	proof (rule ccontr)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	77	assume "\<not>euclidean_size b < euclidean_size (a * b)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	78	with size_mult_mono'[OF assms(1), of b]
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	79	have eq: "euclidean_size (a * b) = euclidean_size b" by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	80	have "a * b dvd b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	81	by (rule dvd_euclidean_size_eq_imp_dvd [OF _ eq]) (insert assms, simp_all)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	82	hence "a * b dvd 1 * b" by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	83	with \<open>b \<noteq> 0\<close> have "is_unit a" by (subst (asm) dvd_times_right_cancel_iff)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	84	with assms(3) show False by contradiction
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	85	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	86
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	87	lemma dvd_imp_size_le:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	88	assumes "a dvd b" "b \<noteq> 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	89	shows "euclidean_size a \<le> euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	90	using assms by (auto elim!: dvdE simp: size_mult_mono)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	91
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	92	lemma dvd_proper_imp_size_less:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	93	assumes "a dvd b" "\<not> b dvd a" "b \<noteq> 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	94	shows "euclidean_size a < euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	95	proof -
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	96	from assms(1) obtain c where "b = a * c" by (erule dvdE)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	97	hence z: "b = c * a" by (simp add: mult.commute)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	98	from z assms have "\<not>is_unit c" by (auto simp: mult.commute mult_unit_dvd_iff)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	99	with z assms show ?thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	100	by (auto intro!: euclidean_size_times_nonunit)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	101	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	102
66798 39bb2462e681 fundamental property of division by units haftmann parents: 64785 diff changeset	103	lemma unit_imp_mod_eq_0:
39bb2462e681 fundamental property of division by units haftmann parents: 64785 diff changeset	104	"a mod b = 0" if "is_unit b"
39bb2462e681 fundamental property of division by units haftmann parents: 64785 diff changeset	105	using that by (simp add: mod_eq_0_iff_dvd unit_imp_dvd)
39bb2462e681 fundamental property of division by units haftmann parents: 64785 diff changeset	106
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	107	end
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	108
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	109	class euclidean_ring = idom_modulo + euclidean_semiring
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	110
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	111
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	112	subsection \<open>Euclidean (semi)rings with cancel rules\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	113
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	114	class euclidean_semiring_cancel = euclidean_semiring +
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	115	assumes div_mult_self1 [simp]: "b \<noteq> 0 \<Longrightarrow> (a + c * b) div b = c + a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	116	and div_mult_mult1 [simp]: "c \<noteq> 0 \<Longrightarrow> (c * a) div (c * b) = a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	117	begin
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	118
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	119	lemma div_mult_self2 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	120	assumes "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	121	shows "(a + b * c) div b = c + a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	122	using assms div_mult_self1 [of b a c] by (simp add: mult.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	123
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	124	lemma div_mult_self3 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	125	assumes "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	126	shows "(c * b + a) div b = c + a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	127	using assms by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	128
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	129	lemma div_mult_self4 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	130	assumes "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	131	shows "(b * c + a) div b = c + a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	132	using assms by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	133
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	134	lemma mod_mult_self1 [simp]: "(a + c * b) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	135	proof (cases "b = 0")
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	136	case True then show ?thesis by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	137	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	138	case False
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	139	have "a + c * b = (a + c * b) div b * b + (a + c * b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	140	by (simp add: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	141	also from False div_mult_self1 [of b a c] have
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	142	"\<dots> = (c + a div b) * b + (a + c * b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	143	by (simp add: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	144	finally have "a = a div b * b + (a + c * b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	145	by (simp add: add.commute [of a] add.assoc distrib_right)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	146	then have "a div b * b + (a + c * b) mod b = a div b * b + a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	147	by (simp add: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	148	then show ?thesis by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	149	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	150
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	151	lemma mod_mult_self2 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	152	"(a + b * c) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	153	by (simp add: mult.commute [of b])
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	154
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	155	lemma mod_mult_self3 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	156	"(c * b + a) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	157	by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	158
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	159	lemma mod_mult_self4 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	160	"(b * c + a) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	161	by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	162
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	163	lemma mod_mult_self1_is_0 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	164	"b * a mod b = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	165	using mod_mult_self2 [of 0 b a] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	166
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	167	lemma mod_mult_self2_is_0 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	168	"a * b mod b = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	169	using mod_mult_self1 [of 0 a b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	170
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	171	lemma div_add_self1:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	172	assumes "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	173	shows "(b + a) div b = a div b + 1"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	174	using assms div_mult_self1 [of b a 1] by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	175
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	176	lemma div_add_self2:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	177	assumes "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	178	shows "(a + b) div b = a div b + 1"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	179	using assms div_add_self1 [of b a] by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	180
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	181	lemma mod_add_self1 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	182	"(b + a) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	183	using mod_mult_self1 [of a 1 b] by (simp add: add.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	184
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	185	lemma mod_add_self2 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	186	"(a + b) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	187	using mod_mult_self1 [of a 1 b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	188
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	189	lemma mod_div_trivial [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	190	"a mod b div b = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	191	proof (cases "b = 0")
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	192	assume "b = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	193	thus ?thesis by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	194	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	195	assume "b \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	196	hence "a div b + a mod b div b = (a mod b + a div b * b) div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	197	by (rule div_mult_self1 [symmetric])
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	198	also have "\<dots> = a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	199	by (simp only: mod_div_mult_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	200	also have "\<dots> = a div b + 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	201	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	202	finally show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	203	by (rule add_left_imp_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	204	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	205
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	206	lemma mod_mod_trivial [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	207	"a mod b mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	208	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	209	have "a mod b mod b = (a mod b + a div b * b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	210	by (simp only: mod_mult_self1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	211	also have "\<dots> = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	212	by (simp only: mod_div_mult_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	213	finally show ?thesis .
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	214	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	215
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	216	lemma mod_mod_cancel:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	217	assumes "c dvd b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	218	shows "a mod b mod c = a mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	219	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	220	from \<open>c dvd b\<close> obtain k where "b = c * k"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	221	by (rule dvdE)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	222	have "a mod b mod c = a mod (c * k) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	223	by (simp only: \<open>b = c * k\<close>)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	224	also have "\<dots> = (a mod (c * k) + a div (c * k) * k * c) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	225	by (simp only: mod_mult_self1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	226	also have "\<dots> = (a div (c * k) * (c * k) + a mod (c * k)) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	227	by (simp only: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	228	also have "\<dots> = a mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	229	by (simp only: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	230	finally show ?thesis .
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	231	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	232
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	233	lemma div_mult_mult2 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	234	"c \<noteq> 0 \<Longrightarrow> (a * c) div (b * c) = a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	235	by (drule div_mult_mult1) (simp add: mult.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	236
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	237	lemma div_mult_mult1_if [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	238	"(c * a) div (c * b) = (if c = 0 then 0 else a div b)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	239	by simp_all
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	240
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	241	lemma mod_mult_mult1:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	242	"(c * a) mod (c * b) = c * (a mod b)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	243	proof (cases "c = 0")
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	244	case True then show ?thesis by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	245	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	246	case False
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	247	from div_mult_mod_eq
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	248	have "((c * a) div (c * b)) * (c * b) + (c * a) mod (c * b) = c * a" .
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	249	with False have "c * ((a div b) * b + a mod b) + (c * a) mod (c * b)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	250	= c * a + c * (a mod b)" by (simp add: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	251	with div_mult_mod_eq show ?thesis by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	252	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	253
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	254	lemma mod_mult_mult2:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	255	"(a * c) mod (b * c) = (a mod b) * c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	256	using mod_mult_mult1 [of c a b] by (simp add: mult.commute)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	257
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	258	lemma mult_mod_left: "(a mod b) * c = (a * c) mod (b * c)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	259	by (fact mod_mult_mult2 [symmetric])
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	260
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	261	lemma mult_mod_right: "c * (a mod b) = (c * a) mod (c * b)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	262	by (fact mod_mult_mult1 [symmetric])
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	263
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	264	lemma dvd_mod: "k dvd m \<Longrightarrow> k dvd n \<Longrightarrow> k dvd (m mod n)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	265	unfolding dvd_def by (auto simp add: mod_mult_mult1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	266
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	267	lemma div_plus_div_distrib_dvd_left:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	268	"c dvd a \<Longrightarrow> (a + b) div c = a div c + b div c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	269	by (cases "c = 0") (auto elim: dvdE)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	270
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	271	lemma div_plus_div_distrib_dvd_right:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	272	"c dvd b \<Longrightarrow> (a + b) div c = a div c + b div c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	273	using div_plus_div_distrib_dvd_left [of c b a]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	274	by (simp add: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	275
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	276	named_theorems mod_simps
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	277
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	278	text \<open>Addition respects modular equivalence.\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	279
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	280	lemma mod_add_left_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	281	"(a mod c + b) mod c = (a + b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	282	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	283	have "(a + b) mod c = (a div c * c + a mod c + b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	284	by (simp only: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	285	also have "\<dots> = (a mod c + b + a div c * c) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	286	by (simp only: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	287	also have "\<dots> = (a mod c + b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	288	by (rule mod_mult_self1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	289	finally show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	290	by (rule sym)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	291	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	292
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	293	lemma mod_add_right_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	294	"(a + b mod c) mod c = (a + b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	295	using mod_add_left_eq [of b c a] by (simp add: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	296
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	297	lemma mod_add_eq:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	298	"(a mod c + b mod c) mod c = (a + b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	299	by (simp add: mod_add_left_eq mod_add_right_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	300
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	301	lemma mod_sum_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	302	"(\<Sum>i\<in>A. f i mod a) mod a = sum f A mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	303	proof (induct A rule: infinite_finite_induct)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	304	case (insert i A)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	305	then have "(\<Sum>i\<in>insert i A. f i mod a) mod a
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	306	= (f i mod a + (\<Sum>i\<in>A. f i mod a)) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	307	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	308	also have "\<dots> = (f i + (\<Sum>i\<in>A. f i mod a) mod a) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	309	by (simp add: mod_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	310	also have "\<dots> = (f i + (\<Sum>i\<in>A. f i) mod a) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	311	by (simp add: insert.hyps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	312	finally show ?case
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	313	by (simp add: insert.hyps mod_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	314	qed simp_all
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	315
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	316	lemma mod_add_cong:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	317	assumes "a mod c = a' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	318	assumes "b mod c = b' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	319	shows "(a + b) mod c = (a' + b') mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	320	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	321	have "(a mod c + b mod c) mod c = (a' mod c + b' mod c) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	322	unfolding assms ..
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	323	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	324	by (simp add: mod_add_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	325	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	326
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	327	text \<open>Multiplication respects modular equivalence.\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	328
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	329	lemma mod_mult_left_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	330	"((a mod c) * b) mod c = (a * b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	331	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	332	have "(a * b) mod c = ((a div c * c + a mod c) * b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	333	by (simp only: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	334	also have "\<dots> = (a mod c * b + a div c * b * c) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	335	by (simp only: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	336	also have "\<dots> = (a mod c * b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	337	by (rule mod_mult_self1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	338	finally show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	339	by (rule sym)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	340	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	341
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	342	lemma mod_mult_right_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	343	"(a * (b mod c)) mod c = (a * b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	344	using mod_mult_left_eq [of b c a] by (simp add: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	345
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	346	lemma mod_mult_eq:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	347	"((a mod c) * (b mod c)) mod c = (a * b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	348	by (simp add: mod_mult_left_eq mod_mult_right_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	349
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	350	lemma mod_prod_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	351	"(\<Prod>i\<in>A. f i mod a) mod a = prod f A mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	352	proof (induct A rule: infinite_finite_induct)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	353	case (insert i A)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	354	then have "(\<Prod>i\<in>insert i A. f i mod a) mod a
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	355	= (f i mod a * (\<Prod>i\<in>A. f i mod a)) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	356	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	357	also have "\<dots> = (f i * ((\<Prod>i\<in>A. f i mod a) mod a)) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	358	by (simp add: mod_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	359	also have "\<dots> = (f i * ((\<Prod>i\<in>A. f i) mod a)) mod a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	360	by (simp add: insert.hyps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	361	finally show ?case
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	362	by (simp add: insert.hyps mod_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	363	qed simp_all
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	364
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	365	lemma mod_mult_cong:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	366	assumes "a mod c = a' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	367	assumes "b mod c = b' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	368	shows "(a * b) mod c = (a' * b') mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	369	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	370	have "(a mod c * (b mod c)) mod c = (a' mod c * (b' mod c)) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	371	unfolding assms ..
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	372	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	373	by (simp add: mod_mult_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	374	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	375
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	376	text \<open>Exponentiation respects modular equivalence.\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	377
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	378	lemma power_mod [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	379	"((a mod b) ^ n) mod b = (a ^ n) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	380	proof (induct n)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	381	case 0
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	382	then show ?case by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	383	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	384	case (Suc n)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	385	have "(a mod b) ^ Suc n mod b = (a mod b) * ((a mod b) ^ n mod b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	386	by (simp add: mod_mult_right_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	387	with Suc show ?case
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	388	by (simp add: mod_mult_left_eq mod_mult_right_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	389	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	390
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	391	end
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	392
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	393
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	394	class euclidean_ring_cancel = euclidean_ring + euclidean_semiring_cancel
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	395	begin
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	396
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	397	subclass idom_divide ..
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	398
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	399	lemma div_minus_minus [simp]: "(- a) div (- b) = a div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	400	using div_mult_mult1 [of "- 1" a b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	401
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	402	lemma mod_minus_minus [simp]: "(- a) mod (- b) = - (a mod b)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	403	using mod_mult_mult1 [of "- 1" a b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	404
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	405	lemma div_minus_right: "a div (- b) = (- a) div b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	406	using div_minus_minus [of "- a" b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	407
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	408	lemma mod_minus_right: "a mod (- b) = - ((- a) mod b)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	409	using mod_minus_minus [of "- a" b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	410
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	411	lemma div_minus1_right [simp]: "a div (- 1) = - a"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	412	using div_minus_right [of a 1] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	413
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	414	lemma mod_minus1_right [simp]: "a mod (- 1) = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	415	using mod_minus_right [of a 1] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	416
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	417	text \<open>Negation respects modular equivalence.\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	418
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	419	lemma mod_minus_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	420	"(- (a mod b)) mod b = (- a) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	421	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	422	have "(- a) mod b = (- (a div b * b + a mod b)) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	423	by (simp only: div_mult_mod_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	424	also have "\<dots> = (- (a mod b) + - (a div b) * b) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	425	by (simp add: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	426	also have "\<dots> = (- (a mod b)) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	427	by (rule mod_mult_self1)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	428	finally show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	429	by (rule sym)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	430	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	431
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	432	lemma mod_minus_cong:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	433	assumes "a mod b = a' mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	434	shows "(- a) mod b = (- a') mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	435	proof -
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	436	have "(- (a mod b)) mod b = (- (a' mod b)) mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	437	unfolding assms ..
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	438	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	439	by (simp add: mod_minus_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	440	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	441
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	442	text \<open>Subtraction respects modular equivalence.\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	443
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	444	lemma mod_diff_left_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	445	"(a mod c - b) mod c = (a - b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	446	using mod_add_cong [of a c "a mod c" "- b" "- b"]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	447	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	448
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	449	lemma mod_diff_right_eq [mod_simps]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	450	"(a - b mod c) mod c = (a - b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	451	using mod_add_cong [of a c a "- b" "- (b mod c)"] mod_minus_cong [of "b mod c" c b]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	452	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	453
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	454	lemma mod_diff_eq:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	455	"(a mod c - b mod c) mod c = (a - b) mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	456	using mod_add_cong [of a c "a mod c" "- b" "- (b mod c)"] mod_minus_cong [of "b mod c" c b]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	457	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	458
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	459	lemma mod_diff_cong:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	460	assumes "a mod c = a' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	461	assumes "b mod c = b' mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	462	shows "(a - b) mod c = (a' - b') mod c"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	463	using assms mod_add_cong [of a c a' "- b" "- b'"] mod_minus_cong [of b c "b'"]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	464	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	465
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	466	lemma minus_mod_self2 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	467	"(a - b) mod b = a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	468	using mod_diff_right_eq [of a b b]
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	469	by (simp add: mod_diff_right_eq)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	470
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	471	lemma minus_mod_self1 [simp]:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	472	"(b - a) mod b = - a mod b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	473	using mod_add_self2 [of "- a" b] by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	474
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	475	lemma mod_eq_dvd_iff:
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	476	"a mod c = b mod c \<longleftrightarrow> c dvd a - b" (is "?P \<longleftrightarrow> ?Q")
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	477	proof
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	478	assume ?P
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	479	then have "(a mod c - b mod c) mod c = 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	480	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	481	then show ?Q
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	482	by (simp add: dvd_eq_mod_eq_0 mod_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	483	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	484	assume ?Q
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	485	then obtain d where d: "a - b = c * d" ..
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	486	then have "a = c * d + b"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	487	by (simp add: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	488	then show ?P by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	489	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	490
66837 6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	491	lemma mod_eqE:
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	492	assumes "a mod c = b mod c"
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	493	obtains d where "b = a + c * d"
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	494	proof -
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	495	from assms have "c dvd a - b"
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	496	by (simp add: mod_eq_dvd_iff)
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	497	then obtain d where "a - b = c * d" ..
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	498	then have "b = a + c * - d"
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	499	by (simp add: algebra_simps)
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	500	with that show thesis .
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	501	qed
6ba663ff2b1c tuned proofs haftmann parents: 66817 diff changeset	502
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	503	end
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	504
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	505
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	506	subsection \<open>Uniquely determined division\<close>
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	507
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	508	class unique_euclidean_semiring = euclidean_semiring +
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	509	fixes uniqueness_constraint :: "'a \<Rightarrow> 'a \<Rightarrow> bool"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	510	assumes size_mono_mult:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	511	"b \<noteq> 0 \<Longrightarrow> euclidean_size a < euclidean_size c
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	512	\<Longrightarrow> euclidean_size (a * b) < euclidean_size (c * b)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	513	-- \<open>FIXME justify\<close>
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	514	assumes uniqueness_constraint_mono_mult:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	515	"uniqueness_constraint a b \<Longrightarrow> uniqueness_constraint (a * c) (b * c)"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	516	assumes uniqueness_constraint_mod:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	517	"b \<noteq> 0 \<Longrightarrow> \<not> b dvd a \<Longrightarrow> uniqueness_constraint (a mod b) b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	518	assumes div_bounded:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	519	"b \<noteq> 0 \<Longrightarrow> uniqueness_constraint r b
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	520	\<Longrightarrow> euclidean_size r < euclidean_size b
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	521	\<Longrightarrow> (q * b + r) div b = q"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	522	begin
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	523
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	524	lemma divmod_cases [case_names divides remainder by0]:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	525	obtains
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	526	(divides) q where "b \<noteq> 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	527	and "a div b = q"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	528	and "a mod b = 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	529	and "a = q * b"
66814 a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	530	\| (remainder) q r where "b \<noteq> 0"
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	531	and "uniqueness_constraint r b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	532	and "euclidean_size r < euclidean_size b"
66814 a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	533	and "r \<noteq> 0"
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	534	and "a div b = q"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	535	and "a mod b = r"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	536	and "a = q * b + r"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	537	\| (by0) "b = 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	538	proof (cases "b = 0")
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	539	case True
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	540	then show thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	541	by (rule by0)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	542	next
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	543	case False
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	544	show thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	545	proof (cases "b dvd a")
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	546	case True
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	547	then obtain q where "a = b * q" ..
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	548	with \<open>b \<noteq> 0\<close> divides
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	549	show thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	550	by (simp add: ac_simps)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	551	next
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	552	case False
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	553	then have "a mod b \<noteq> 0"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	554	by (simp add: mod_eq_0_iff_dvd)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	555	moreover from \<open>b \<noteq> 0\<close> \<open>\<not> b dvd a\<close> have "uniqueness_constraint (a mod b) b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	556	by (rule uniqueness_constraint_mod)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	557	moreover have "euclidean_size (a mod b) < euclidean_size b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	558	using \<open>b \<noteq> 0\<close> by (rule mod_size_less)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	559	moreover have "a = a div b * b + a mod b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	560	by (simp add: div_mult_mod_eq)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	561	ultimately show thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	562	using \<open>b \<noteq> 0\<close> by (blast intro: remainder)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	563	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	564	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	565
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	566	lemma div_eqI:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	567	"a div b = q" if "b \<noteq> 0" "uniqueness_constraint r b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	568	"euclidean_size r < euclidean_size b" "q * b + r = a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	569	proof -
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	570	from that have "(q * b + r) div b = q"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	571	by (auto intro: div_bounded)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	572	with that show ?thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	573	by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	574	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	575
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	576	lemma mod_eqI:
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	577	"a mod b = r" if "b \<noteq> 0" "uniqueness_constraint r b"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	578	"euclidean_size r < euclidean_size b" "q * b + r = a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	579	proof -
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	580	from that have "a div b = q"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	581	by (rule div_eqI)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	582	moreover have "a div b * b + a mod b = a"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	583	by (fact div_mult_mod_eq)
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	584	ultimately have "a div b * b + a mod b = a div b * b + r"
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	585	using \<open>q * b + r = a\<close> by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	586	then show ?thesis
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	587	by simp
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	588	qed
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	589
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	590	subclass euclidean_semiring_cancel
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	591	proof
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	592	show "(a + c * b) div b = c + a div b" if "b \<noteq> 0" for a b c
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	593	proof (cases a b rule: divmod_cases)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	594	case by0
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	595	with \<open>b \<noteq> 0\<close> show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	596	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	597	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	598	case (divides q)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	599	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	600	by (simp add: ac_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	601	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	602	case (remainder q r)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	603	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	604	by (auto intro: div_eqI simp add: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	605	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	606	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	607	show"(c * a) div (c * b) = a div b" if "c \<noteq> 0" for a b c
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	608	proof (cases a b rule: divmod_cases)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	609	case by0
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	610	then show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	611	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	612	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	613	case (divides q)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	614	with \<open>c \<noteq> 0\<close> show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	615	by (simp add: mult.left_commute [of c])
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	616	next
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	617	case (remainder q r)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	618	from \<open>b \<noteq> 0\<close> \<open>c \<noteq> 0\<close> have "b * c \<noteq> 0"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	619	by simp
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	620	from remainder \<open>c \<noteq> 0\<close>
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	621	have "uniqueness_constraint (r * c) (b * c)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	622	and "euclidean_size (r * c) < euclidean_size (b * c)"
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	623	by (simp_all add: uniqueness_constraint_mono_mult uniqueness_constraint_mod size_mono_mult)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	624	with remainder show ?thesis
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	625	by (auto intro!: div_eqI [of _ "c * (a mod b)"] simp add: algebra_simps)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	626	(use \<open>b * c \<noteq> 0\<close> in simp)
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	627	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	628	qed
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	629
66814 a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	630	lemma div_mult1_eq:
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	631	"(a * b) div c = a * (b div c) + a * (b mod c) div c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	632	proof (cases "a * (b mod c)" c rule: divmod_cases)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	633	case (divides q)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	634	have "a * b = a * (b div c * c + b mod c)"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	635	by (simp add: div_mult_mod_eq)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	636	also have "\<dots> = (a * (b div c) + q) * c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	637	using divides by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	638	finally have "(a * b) div c = \<dots> div c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	639	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	640	with divides show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	641	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	642	next
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	643	case (remainder q r)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	644	from remainder(1-3) show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	645	proof (rule div_eqI)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	646	have "a * b = a * (b div c * c + b mod c)"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	647	by (simp add: div_mult_mod_eq)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	648	also have "\<dots> = a * c * (b div c) + q * c + r"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	649	using remainder by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	650	finally show "(a * (b div c) + a * (b mod c) div c) * c + r = a * b"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	651	using remainder(5-7) by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	652	qed
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	653	next
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	654	case by0
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	655	then show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	656	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	657	qed
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	658
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	659	lemma div_add1_eq:
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	660	"(a + b) div c = a div c + b div c + (a mod c + b mod c) div c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	661	proof (cases "a mod c + b mod c" c rule: divmod_cases)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	662	case (divides q)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	663	have "a + b = (a div c * c + a mod c) + (b div c * c + b mod c)"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	664	using mod_mult_div_eq [of a c] mod_mult_div_eq [of b c] by (simp add: ac_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	665	also have "\<dots> = (a div c + b div c) * c + (a mod c + b mod c)"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	666	by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	667	also have "\<dots> = (a div c + b div c + q) * c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	668	using divides by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	669	finally have "(a + b) div c = (a div c + b div c + q) * c div c"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	670	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	671	with divides show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	672	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	673	next
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	674	case (remainder q r)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	675	from remainder(1-3) show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	676	proof (rule div_eqI)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	677	have "(a div c + b div c + q) * c + r + (a mod c + b mod c) =
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	678	(a div c * c + a mod c) + (b div c * c + b mod c) + q * c + r"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	679	by (simp add: algebra_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	680	also have "\<dots> = a + b + (a mod c + b mod c)"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	681	by (simp add: div_mult_mod_eq remainder) (simp add: ac_simps)
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	682	finally show "(a div c + b div c + (a mod c + b mod c) div c) * c + r = a + b"
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	683	using remainder by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	684	qed
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	685	next
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	686	case by0
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	687	then show ?thesis
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	688	by simp
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	689	qed
a24cde9588bb generalized some rules haftmann parents: 66813 diff changeset	690
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	691	end
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	692
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	693	class unique_euclidean_ring = euclidean_ring + unique_euclidean_semiring
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	694	begin
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	695
a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	696	subclass euclidean_ring_cancel ..
64785 ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	697
ae0bbc8e45ad moved euclidean ring to HOL haftmann parents: diff changeset	698	end
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	699
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	700
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	701	subsection \<open>Euclidean division on @{typ nat}\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	702
66816 212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	703	instantiation nat :: normalization_semidom
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	704	begin
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	705
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	706	definition normalize_nat :: "nat \<Rightarrow> nat"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	707	where [simp]: "normalize = (id :: nat \<Rightarrow> nat)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	708
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	709	definition unit_factor_nat :: "nat \<Rightarrow> nat"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	710	where "unit_factor n = (if n = 0 then 0 else 1 :: nat)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	711
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	712	lemma unit_factor_simps [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	713	"unit_factor 0 = (0::nat)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	714	"unit_factor (Suc n) = 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	715	by (simp_all add: unit_factor_nat_def)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	716
66816 212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	717	definition divide_nat :: "nat \<Rightarrow> nat \<Rightarrow> nat"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	718	where "m div n = (if n = 0 then 0 else Max {k::nat. k * n \<le> m})"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	719
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	720	instance
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	721	by standard (auto simp add: divide_nat_def ac_simps unit_factor_nat_def intro: Max_eqI)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	722
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	723	end
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	724
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	725	instantiation nat :: unique_euclidean_semiring
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	726	begin
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	727
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	728	definition euclidean_size_nat :: "nat \<Rightarrow> nat"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	729	where [simp]: "euclidean_size_nat = id"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	730
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	731	definition uniqueness_constraint_nat :: "nat \<Rightarrow> nat \<Rightarrow> bool"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	732	where [simp]: "uniqueness_constraint_nat = \<top>"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	733
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	734	definition modulo_nat :: "nat \<Rightarrow> nat \<Rightarrow> nat"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	735	where "m mod n = m - (m div n * (n::nat))"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	736
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	737	instance proof
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	738	fix m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	739	have ex: "\<exists>k. k * n \<le> l" for l :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	740	by (rule exI [of _ 0]) simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	741	have fin: "finite {k. k * n \<le> l}" if "n > 0" for l
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	742	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	743	from that have "{k. k * n \<le> l} \<subseteq> {k. k \<le> l}"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	744	by (cases n) auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	745	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	746	by (rule finite_subset) simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	747	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	748	have mult_div_unfold: "n * (m div n) = Max {l. l \<le> m \<and> n dvd l}"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	749	proof (cases "n = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	750	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	751	moreover have "{l. l = 0 \<and> l \<le> m} = {0::nat}"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	752	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	753	ultimately show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	754	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	755	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	756	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	757	with ex [of m] fin have "n * Max {k. k * n \<le> m} = Max (times n ` {k. k * n \<le> m})"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	758	by (auto simp add: nat_mult_max_right intro: hom_Max_commute)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	759	also have "times n ` {k. k * n \<le> m} = {l. l \<le> m \<and> n dvd l}"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	760	by (auto simp add: ac_simps elim!: dvdE)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	761	finally show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	762	using False by (simp add: divide_nat_def ac_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	763	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	764	have less_eq: "m div n * n \<le> m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	765	by (auto simp add: mult_div_unfold ac_simps intro: Max.boundedI)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	766	then show "m div n * n + m mod n = m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	767	by (simp add: modulo_nat_def)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	768	assume "n \<noteq> 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	769	show "euclidean_size (m mod n) < euclidean_size n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	770	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	771	have "m < Suc (m div n) * n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	772	proof (rule ccontr)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	773	assume "\<not> m < Suc (m div n) * n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	774	then have "Suc (m div n) * n \<le> m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	775	by (simp add: not_less)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	776	moreover from \<open>n \<noteq> 0\<close> have "Max {k. k * n \<le> m} < Suc (m div n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	777	by (simp add: divide_nat_def)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	778	with \<open>n \<noteq> 0\<close> ex fin have "\<And>k. k * n \<le> m \<Longrightarrow> k < Suc (m div n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	779	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	780	ultimately have "Suc (m div n) < Suc (m div n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	781	by blast
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	782	then show False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	783	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	784	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	785	with \<open>n \<noteq> 0\<close> show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	786	by (simp add: modulo_nat_def)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	787	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	788	show "euclidean_size m \<le> euclidean_size (m * n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	789	using \<open>n \<noteq> 0\<close> by (cases n) simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	790	fix q r :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	791	show "(q * n + r) div n = q" if "euclidean_size r < euclidean_size n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	792	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	793	from that have "r < n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	794	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	795	have "k \<le> q" if "k * n \<le> q * n + r" for k
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	796	proof (rule ccontr)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	797	assume "\<not> k \<le> q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	798	then have "q < k"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	799	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	800	then obtain l where "k = Suc (q + l)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	801	by (auto simp add: less_iff_Suc_add)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	802	with \<open>r < n\<close> that show False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	803	by (simp add: algebra_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	804	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	805	with \<open>n \<noteq> 0\<close> ex fin show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	806	by (auto simp add: divide_nat_def Max_eq_iff)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	807	qed
66816 212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	808	qed simp_all
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	809
66806 a4e82b58d833 abolished (semi)ring_div in favour of euclidean_(semi)ring_cancel haftmann parents: 66798 diff changeset	810	end
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	811
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	812	text \<open>Tool support\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	813
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	814	ML \<open>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	815	structure Cancel_Div_Mod_Nat = Cancel_Div_Mod
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	816	(
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	817	val div_name = @{const_name divide};
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	818	val mod_name = @{const_name modulo};
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	819	val mk_binop = HOLogic.mk_binop;
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	820	val dest_plus = HOLogic.dest_bin @{const_name Groups.plus} HOLogic.natT;
66813 351142796345 avoid variant of mk_sum haftmann parents: 66810 diff changeset	821	val mk_sum = Arith_Data.mk_sum;
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	822	fun dest_sum tm =
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	823	if HOLogic.is_zero tm then []
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	824	else
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	825	(case try HOLogic.dest_Suc tm of
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	826	SOME t => HOLogic.Suc_zero :: dest_sum t
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	827	\| NONE =>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	828	(case try dest_plus tm of
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	829	SOME (t, u) => dest_sum t @ dest_sum u
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	830	\| NONE => [tm]));
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	831
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	832	val div_mod_eqs = map mk_meta_eq @{thms cancel_div_mod_rules};
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	833
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	834	val prove_eq_sums = Arith_Data.prove_conv2 all_tac
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	835	(Arith_Data.simp_all_tac @{thms add_0_left add_0_right ac_simps})
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	836	)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	837	\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	838
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	839	simproc_setup cancel_div_mod_nat ("(m::nat) + n") =
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	840	\<open>K Cancel_Div_Mod_Nat.proc\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	841
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	842	lemma div_nat_eqI:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	843	"m div n = q" if "n * q \<le> m" and "m < n * Suc q" for m n q :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	844	by (rule div_eqI [of _ "m - n * q"]) (use that in \<open>simp_all add: algebra_simps\<close>)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	845
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	846	lemma mod_nat_eqI:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	847	"m mod n = r" if "r < n" and "r \<le> m" and "n dvd m - r" for m n r :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	848	by (rule mod_eqI [of _ _ "(m - r) div n"]) (use that in \<open>simp_all add: algebra_simps\<close>)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	849
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	850	lemma div_mult_self_is_m [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	851	"m * n div n = m" if "n > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	852	using that by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	853
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	854	lemma div_mult_self1_is_m [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	855	"n * m div n = m" if "n > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	856	using that by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	857
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	858	lemma mod_less_divisor [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	859	"m mod n < n" if "n > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	860	using mod_size_less [of n m] that by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	861
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	862	lemma mod_le_divisor [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	863	"m mod n \<le> n" if "n > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	864	using that by (auto simp add: le_less)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	865
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	866	lemma div_times_less_eq_dividend [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	867	"m div n * n \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	868	by (simp add: minus_mod_eq_div_mult [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	869
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	870	lemma times_div_less_eq_dividend [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	871	"n * (m div n) \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	872	using div_times_less_eq_dividend [of m n]
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	873	by (simp add: ac_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	874
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	875	lemma dividend_less_div_times:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	876	"m < n + (m div n) * n" if "0 < n" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	877	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	878	from that have "m mod n < n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	879	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	880	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	881	by (simp add: minus_mod_eq_div_mult [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	882	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	883
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	884	lemma dividend_less_times_div:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	885	"m < n + n * (m div n)" if "0 < n" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	886	using dividend_less_div_times [of n m] that
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	887	by (simp add: ac_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	888
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	889	lemma mod_Suc_le_divisor [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	890	"m mod Suc n \<le> n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	891	using mod_less_divisor [of "Suc n" m] by arith
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	892
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	893	lemma mod_less_eq_dividend [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	894	"m mod n \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	895	proof (rule add_leD2)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	896	from div_mult_mod_eq have "m div n * n + m mod n = m" .
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	897	then show "m div n * n + m mod n \<le> m" by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	898	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	899
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	900	lemma
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	901	div_less [simp]: "m div n = 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	902	and mod_less [simp]: "m mod n = m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	903	if "m < n" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	904	using that by (auto intro: div_eqI mod_eqI)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	905
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	906	lemma le_div_geq:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	907	"m div n = Suc ((m - n) div n)" if "0 < n" and "n \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	908	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	909	from \<open>n \<le> m\<close> obtain q where "m = n + q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	910	by (auto simp add: le_iff_add)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	911	with \<open>0 < n\<close> show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	912	by (simp add: div_add_self1)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	913	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	914
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	915	lemma le_mod_geq:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	916	"m mod n = (m - n) mod n" if "n \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	917	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	918	from \<open>n \<le> m\<close> obtain q where "m = n + q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	919	by (auto simp add: le_iff_add)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	920	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	921	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	922	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	923
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	924	lemma div_if:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	925	"m div n = (if m < n \<or> n = 0 then 0 else Suc ((m - n) div n))"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	926	by (simp add: le_div_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	927
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	928	lemma mod_if:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	929	"m mod n = (if m < n then m else (m - n) mod n)" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	930	by (simp add: le_mod_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	931
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	932	lemma div_eq_0_iff:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	933	"m div n = 0 \<longleftrightarrow> m < n \<or> n = 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	934	by (simp add: div_if)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	935
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	936	lemma div_greater_zero_iff:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	937	"m div n > 0 \<longleftrightarrow> n \<le> m \<and> n > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	938	using div_eq_0_iff [of m n] by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	939
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	940	lemma mod_greater_zero_iff_not_dvd:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	941	"m mod n > 0 \<longleftrightarrow> \<not> n dvd m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	942	by (simp add: dvd_eq_mod_eq_0)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	943
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	944	lemma div_by_Suc_0 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	945	"m div Suc 0 = m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	946	using div_by_1 [of m] by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	947
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	948	lemma mod_by_Suc_0 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	949	"m mod Suc 0 = 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	950	using mod_by_1 [of m] by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	951
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	952	lemma div2_Suc_Suc [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	953	"Suc (Suc m) div 2 = Suc (m div 2)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	954	by (simp add: numeral_2_eq_2 le_div_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	955
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	956	lemma Suc_n_div_2_gt_zero [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	957	"0 < Suc n div 2" if "n > 0" for n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	958	using that by (cases n) simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	959
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	960	lemma div_2_gt_zero [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	961	"0 < n div 2" if "Suc 0 < n" for n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	962	using that Suc_n_div_2_gt_zero [of "n - 1"] by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	963
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	964	lemma mod2_Suc_Suc [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	965	"Suc (Suc m) mod 2 = m mod 2"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	966	by (simp add: numeral_2_eq_2 le_mod_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	967
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	968	lemma add_self_div_2 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	969	"(m + m) div 2 = m" for m :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	970	by (simp add: mult_2 [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	971
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	972	lemma add_self_mod_2 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	973	"(m + m) mod 2 = 0" for m :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	974	by (simp add: mult_2 [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	975
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	976	lemma mod2_gr_0 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	977	"0 < m mod 2 \<longleftrightarrow> m mod 2 = 1" for m :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	978	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	979	have "m mod 2 < 2"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	980	by (rule mod_less_divisor) simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	981	then have "m mod 2 = 0 \<or> m mod 2 = 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	982	by arith
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	983	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	984	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	985	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	986
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	987	lemma mod_Suc_eq [mod_simps]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	988	"Suc (m mod n) mod n = Suc m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	989	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	990	have "(m mod n + 1) mod n = (m + 1) mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	991	by (simp only: mod_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	992	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	993	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	994	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	995
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	996	lemma mod_Suc_Suc_eq [mod_simps]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	997	"Suc (Suc (m mod n)) mod n = Suc (Suc m) mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	998	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	999	have "(m mod n + 2) mod n = (m + 2) mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1000	by (simp only: mod_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1001	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1002	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1003	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1004
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1005	lemma
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1006	Suc_mod_mult_self1 [simp]: "Suc (m + k * n) mod n = Suc m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1007	and Suc_mod_mult_self2 [simp]: "Suc (m + n * k) mod n = Suc m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1008	and Suc_mod_mult_self3 [simp]: "Suc (k * n + m) mod n = Suc m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1009	and Suc_mod_mult_self4 [simp]: "Suc (n * k + m) mod n = Suc m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1010	by (subst mod_Suc_eq [symmetric], simp add: mod_simps)+
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1011
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1012	context
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1013	fixes m n q :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1014	begin
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1015
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1016	private lemma eucl_rel_mult2:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1017	"m mod n + n * (m div n mod q) < n * q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1018	if "n > 0" and "q > 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1019	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1020	from \<open>n > 0\<close> have "m mod n < n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1021	by (rule mod_less_divisor)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1022	from \<open>q > 0\<close> have "m div n mod q < q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1023	by (rule mod_less_divisor)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1024	then obtain s where "q = Suc (m div n mod q + s)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1025	by (blast dest: less_imp_Suc_add)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1026	moreover have "m mod n + n * (m div n mod q) < n * Suc (m div n mod q + s)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1027	using \<open>m mod n < n\<close> by (simp add: add_mult_distrib2)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1028	ultimately show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1029	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1030	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1031
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1032	lemma div_mult2_eq:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1033	"m div (n * q) = (m div n) div q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1034	proof (cases "n = 0 \<or> q = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1035	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1036	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1037	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1038	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1039	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1040	with eucl_rel_mult2 show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1041	by (auto intro: div_eqI [of _ "n * (m div n mod q) + m mod n"]
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1042	simp add: algebra_simps add_mult_distrib2 [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1043	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1044
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1045	lemma mod_mult2_eq:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1046	"m mod (n * q) = n * (m div n mod q) + m mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1047	proof (cases "n = 0 \<or> q = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1048	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1049	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1050	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1051	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1052	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1053	with eucl_rel_mult2 show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1054	by (auto intro: mod_eqI [of _ _ "(m div n) div q"]
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1055	simp add: algebra_simps add_mult_distrib2 [symmetric])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1056	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1057
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1058	end
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1059
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1060	lemma div_le_mono:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1061	"m div k \<le> n div k" if "m \<le> n" for m n k :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1062	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1063	from that obtain q where "n = m + q"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1064	by (auto simp add: le_iff_add)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1065	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1066	by (simp add: div_add1_eq [of m q k])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1067	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1068
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1069	text \<open>Antimonotonicity of @{const divide} in second argument\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1070
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1071	lemma div_le_mono2:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1072	"k div n \<le> k div m" if "0 < m" and "m \<le> n" for m n k :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1073	using that proof (induct k arbitrary: m rule: less_induct)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1074	case (less k)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1075	show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1076	proof (cases "n \<le> k")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1077	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1078	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1079	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1080	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1081	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1082	have "(k - n) div n \<le> (k - m) div n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1083	using less.prems
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1084	by (blast intro: div_le_mono diff_le_mono2)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1085	also have "\<dots> \<le> (k - m) div m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1086	using \<open>n \<le> k\<close> less.prems less.hyps [of "k - m" m]
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1087	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1088	finally show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1089	using \<open>n \<le> k\<close> less.prems
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1090	by (simp add: le_div_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1091	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1092	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1093
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1094	lemma div_le_dividend [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1095	"m div n \<le> m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1096	using div_le_mono2 [of 1 n m] by (cases "n = 0") simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1097
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1098	lemma div_less_dividend [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1099	"m div n < m" if "1 < n" and "0 < m" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1100	using that proof (induct m rule: less_induct)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1101	case (less m)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1102	show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1103	proof (cases "n < m")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1104	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1105	with less show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1106	by (cases "n = m") simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1107	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1108	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1109	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1110	using less.hyps [of "m - n"] less.prems
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1111	by (simp add: le_div_geq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1112	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1113	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1114
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1115	lemma div_eq_dividend_iff:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1116	"m div n = m \<longleftrightarrow> n = 1" if "m > 0" for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1117	proof
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1118	assume "n = 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1119	then show "m div n = m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1120	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1121	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1122	assume P: "m div n = m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1123	show "n = 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1124	proof (rule ccontr)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1125	have "n \<noteq> 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1126	by (rule ccontr) (use that P in auto)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1127	moreover assume "n \<noteq> 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1128	ultimately have "n > 1"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1129	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1130	with that have "m div n < m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1131	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1132	with P show False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1133	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1134	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1135	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1136
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1137	lemma less_mult_imp_div_less:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1138	"m div n < i" if "m < i * n" for m n i :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1139	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1140	from that have "i * n > 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1141	by (cases "i * n = 0") simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1142	then have "i > 0" and "n > 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1143	by simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1144	have "m div n * n \<le> m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1145	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1146	then have "m div n * n < i * n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1147	using that by (rule le_less_trans)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1148	with \<open>n > 0\<close> show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1149	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1150	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1151
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1152	text \<open>A fact for the mutilated chess board\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1153
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1154	lemma mod_Suc:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1155	"Suc m mod n = (if Suc (m mod n) = n then 0 else Suc (m mod n))" (is "_ = ?rhs")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1156	proof (cases "n = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1157	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1158	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1159	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1160	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1161	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1162	have "Suc m mod n = Suc (m mod n) mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1163	by (simp add: mod_simps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1164	also have "\<dots> = ?rhs"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1165	using False by (auto intro!: mod_nat_eqI intro: neq_le_trans simp add: Suc_le_eq)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1166	finally show ?thesis .
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1167	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1168
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1169	lemma Suc_times_mod_eq:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1170	"Suc (m * n) mod m = 1" if "Suc 0 < m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1171	using that by (simp add: mod_Suc)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1172
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1173	lemma Suc_times_numeral_mod_eq [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1174	"Suc (numeral k * n) mod numeral k = 1" if "numeral k \<noteq> (1::nat)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1175	by (rule Suc_times_mod_eq) (use that in simp)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1176
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1177	lemma Suc_div_le_mono [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1178	"m div n \<le> Suc m div n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1179	by (simp add: div_le_mono)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1180
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1181	text \<open>These lemmas collapse some needless occurrences of Suc:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1182	at least three Sucs, since two and fewer are rewritten back to Suc again!
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1183	We already have some rules to simplify operands smaller than 3.\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1184
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1185	lemma div_Suc_eq_div_add3 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1186	"m div Suc (Suc (Suc n)) = m div (3 + n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1187	by (simp add: Suc3_eq_add_3)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1188
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1189	lemma mod_Suc_eq_mod_add3 [simp]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1190	"m mod Suc (Suc (Suc n)) = m mod (3 + n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1191	by (simp add: Suc3_eq_add_3)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1192
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1193	lemma Suc_div_eq_add3_div:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1194	"Suc (Suc (Suc m)) div n = (3 + m) div n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1195	by (simp add: Suc3_eq_add_3)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1196
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1197	lemma Suc_mod_eq_add3_mod:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1198	"Suc (Suc (Suc m)) mod n = (3 + m) mod n"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1199	by (simp add: Suc3_eq_add_3)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1200
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1201	lemmas Suc_div_eq_add3_div_numeral [simp] =
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1202	Suc_div_eq_add3_div [of _ "numeral v"] for v
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1203
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1204	lemmas Suc_mod_eq_add3_mod_numeral [simp] =
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1205	Suc_mod_eq_add3_mod [of _ "numeral v"] for v
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1206
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1207	lemma (in field_char_0) of_nat_div:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1208	"of_nat (m div n) = ((of_nat m - of_nat (m mod n)) / of_nat n)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1209	proof -
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1210	have "of_nat (m div n) = ((of_nat (m div n * n + m mod n) - of_nat (m mod n)) / of_nat n :: 'a)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1211	unfolding of_nat_add by (cases "n = 0") simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1212	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1213	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1214	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1215
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1216	text \<open>An ``induction'' law for modulus arithmetic.\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1217
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1218	lemma mod_induct [consumes 3, case_names step]:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1219	"P m" if "P n" and "n < p" and "m < p"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1220	and step: "\<And>n. n < p \<Longrightarrow> P n \<Longrightarrow> P (Suc n mod p)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1221	using \<open>m < p\<close> proof (induct m)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1222	case 0
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1223	show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1224	proof (rule ccontr)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1225	assume "\<not> P 0"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1226	from \<open>n < p\<close> have "0 < p"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1227	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1228	from \<open>n < p\<close> obtain m where "0 < m" and "p = n + m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1229	by (blast dest: less_imp_add_positive)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1230	with \<open>P n\<close> have "P (p - m)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1231	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1232	moreover have "\<not> P (p - m)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1233	using \<open>0 < m\<close> proof (induct m)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1234	case 0
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1235	then show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1236	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1237	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1238	case (Suc m)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1239	show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1240	proof
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1241	assume P: "P (p - Suc m)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1242	with \<open>\<not> P 0\<close> have "Suc m < p"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1243	by (auto intro: ccontr)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1244	then have "Suc (p - Suc m) = p - m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1245	by arith
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1246	moreover from \<open>0 < p\<close> have "p - Suc m < p"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1247	by arith
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1248	with P step have "P ((Suc (p - Suc m)) mod p)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1249	by blast
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1250	ultimately show False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1251	using \<open>\<not> P 0\<close> Suc.hyps by (cases "m = 0") simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1252	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1253	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1254	ultimately show False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1255	by blast
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1256	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1257	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1258	case (Suc m)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1259	then have "m < p" and mod: "Suc m mod p = Suc m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1260	by simp_all
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1261	from \<open>m < p\<close> have "P m"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1262	by (rule Suc.hyps)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1263	with \<open>m < p\<close> have "P (Suc m mod p)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1264	by (rule step)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1265	with mod show ?case
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1266	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1267	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1268
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1269	lemma split_div:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1270	"P (m div n) \<longleftrightarrow> (n = 0 \<longrightarrow> P 0) \<and> (n \<noteq> 0 \<longrightarrow>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1271	(\<forall>i j. j < n \<longrightarrow> m = n * i + j \<longrightarrow> P i))"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1272	(is "?P = ?Q") for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1273	proof (cases "n = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1274	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1275	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1276	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1277	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1278	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1279	show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1280	proof
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1281	assume ?P
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1282	with False show ?Q
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1283	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1284	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1285	assume ?Q
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1286	with False have : "\<And>i j. j < n \<Longrightarrow> m = n i + j \<Longrightarrow> P i"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1287	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1288	with False show ?P
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1289	by (auto intro: * [of "m mod n"])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1290	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1291	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1292
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1293	lemma split_div':
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1294	"P (m div n) \<longleftrightarrow> n = 0 \<and> P 0 \<or> (\<exists>q. (n * q \<le> m \<and> m < n * Suc q) \<and> P q)"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1295	proof (cases "n = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1296	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1297	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1298	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1299	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1300	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1301	then have "n * q \<le> m \<and> m < n * Suc q \<longleftrightarrow> m div n = q" for q
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1302	by (auto intro: div_nat_eqI dividend_less_times_div)
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1303	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1304	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1305	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1306
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1307	lemma split_mod:
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1308	"P (m mod n) \<longleftrightarrow> (n = 0 \<longrightarrow> P m) \<and> (n \<noteq> 0 \<longrightarrow>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1309	(\<forall>i j. j < n \<longrightarrow> m = n * i + j \<longrightarrow> P j))"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1310	(is "?P \<longleftrightarrow> ?Q") for m n :: nat
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1311	proof (cases "n = 0")
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1312	case True
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1313	then show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1314	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1315	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1316	case False
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1317	show ?thesis
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1318	proof
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1319	assume ?P
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1320	with False show ?Q
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1321	by auto
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1322	next
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1323	assume ?Q
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1324	with False have : "\<And>i j. j < n \<Longrightarrow> m = n i + j \<Longrightarrow> P j"
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1325	by simp
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1326	with False show ?P
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1327	by (auto intro: * [of _ "m div n"])
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1328	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1329	qed
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1330
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1331
66816 212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1332	subsection \<open>Euclidean division on @{typ int}\<close>
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1333
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1334	instantiation int :: normalization_semidom
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1335	begin
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1336
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1337	definition normalize_int :: "int \<Rightarrow> int"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1338	where [simp]: "normalize = (abs :: int \<Rightarrow> int)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1339
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1340	definition unit_factor_int :: "int \<Rightarrow> int"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1341	where [simp]: "unit_factor = (sgn :: int \<Rightarrow> int)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1342
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1343	definition divide_int :: "int \<Rightarrow> int \<Rightarrow> int"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1344	where "k div l = (if l = 0 then 0
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1345	else if sgn k = sgn l
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1346	then int (nat \<bar>k\<bar> div nat \<bar>l\<bar>)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1347	else - int (nat \<bar>k\<bar> div nat \<bar>l\<bar> + of_bool (\<not> l dvd k)))"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1348
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1349	lemma divide_int_unfold:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1350	"(sgn k * int m) div (sgn l * int n) =
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1351	(if sgn l = 0 \<or> sgn k = 0 \<or> n = 0 then 0
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1352	else if sgn k = sgn l
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1353	then int (m div n)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1354	else - int (m div n + of_bool (\<not> n dvd m)))"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1355	by (auto simp add: divide_int_def sgn_0_0 sgn_1_pos sgn_mult abs_mult
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1356	nat_mult_distrib dvd_int_iff)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1357
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1358	instance proof
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1359	fix k :: int show "k div 0 = 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1360	by (simp add: divide_int_def)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1361	next
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1362	fix k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1363	assume "l \<noteq> 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1364	obtain n m and s t where k: "k = sgn s * int n" and l: "l = sgn t * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1365	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1366	then have "k * l = sgn (s * t) * int (n * m)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1367	by (simp add: ac_simps sgn_mult)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1368	with k l \<open>l \<noteq> 0\<close> show "k * l div l = k"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1369	by (simp only: divide_int_unfold)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1370	(auto simp add: algebra_simps sgn_mult sgn_1_pos sgn_0_0)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1371	qed (auto simp add: sgn_mult mult_sgn_abs abs_eq_iff')
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1372
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1373	end
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1374
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1375	instantiation int :: unique_euclidean_ring
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1376	begin
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1377
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1378	definition euclidean_size_int :: "int \<Rightarrow> nat"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1379	where [simp]: "euclidean_size_int = (nat \<circ> abs :: int \<Rightarrow> nat)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1380
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1381	definition uniqueness_constraint_int :: "int \<Rightarrow> int \<Rightarrow> bool"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1382	where [simp]: "uniqueness_constraint_int k l \<longleftrightarrow> unit_factor k = unit_factor l"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1383
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1384	definition modulo_int :: "int \<Rightarrow> int \<Rightarrow> int"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1385	where "k mod l = (if l = 0 then k
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1386	else if sgn k = sgn l
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1387	then sgn l * int (nat \<bar>k\<bar> mod nat \<bar>l\<bar>)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1388	else sgn l * (\<bar>l\<bar> * of_bool (\<not> l dvd k) - int (nat \<bar>k\<bar> mod nat \<bar>l\<bar>)))"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1389
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1390	lemma modulo_int_unfold:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1391	"(sgn k * int m) mod (sgn l * int n) =
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1392	(if sgn l = 0 \<or> sgn k = 0 \<or> n = 0 then sgn k * int m
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1393	else if sgn k = sgn l
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1394	then sgn l * int (m mod n)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1395	else sgn l * (int (n * of_bool (\<not> n dvd m)) - int (m mod n)))"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1396	by (auto simp add: modulo_int_def sgn_0_0 sgn_1_pos sgn_mult abs_mult
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1397	nat_mult_distrib dvd_int_iff)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1398
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1399	lemma abs_mod_less:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1400	"\<bar>k mod l\<bar> < \<bar>l\<bar>" if "l \<noteq> 0" for k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1401	proof -
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1402	obtain n m and s t where "k = sgn s * int n" and "l = sgn t * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1403	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1404	with that show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1405	by (simp add: modulo_int_unfold sgn_0_0 sgn_1_pos sgn_1_neg
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1406	abs_mult mod_greater_zero_iff_not_dvd)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1407	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1408
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1409	lemma sgn_mod:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1410	"sgn (k mod l) = sgn l" if "l \<noteq> 0" "\<not> l dvd k" for k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1411	proof -
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1412	obtain n m and s t where "k = sgn s * int n" and "l = sgn t * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1413	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1414	with that show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1415	by (simp add: modulo_int_unfold sgn_0_0 sgn_1_pos sgn_1_neg
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1416	sgn_mult mod_eq_0_iff_dvd int_dvd_iff)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1417	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1418
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1419	instance proof
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1420	fix k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1421	obtain n m and s t where "k = sgn s * int n" and "l = sgn t * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1422	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1423	then show "k div l * l + k mod l = k"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1424	by (auto simp add: divide_int_unfold modulo_int_unfold algebra_simps dest!: sgn_not_eq_imp)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1425	(simp_all add: of_nat_mult [symmetric] of_nat_add [symmetric]
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1426	distrib_left [symmetric] minus_mult_right
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1427	del: of_nat_mult minus_mult_right [symmetric])
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1428	next
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1429	fix l q r :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1430	obtain n m and s t
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1431	where l: "l = sgn s * int n" and q: "q = sgn t * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1432	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1433	assume \<open>l \<noteq> 0\<close>
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1434	with l have "s \<noteq> 0" and "n > 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1435	by (simp_all add: sgn_0_0)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1436	assume "uniqueness_constraint r l"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1437	moreover have "r = sgn r * \<bar>r\<bar>"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1438	by (simp add: sgn_mult_abs)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1439	moreover define u where "u = nat \<bar>r\<bar>"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1440	ultimately have "r = sgn l * int u"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1441	by simp
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1442	with l \<open>n > 0\<close> have r: "r = sgn s * int u"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1443	by (simp add: sgn_mult)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1444	assume "euclidean_size r < euclidean_size l"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1445	with l r \<open>s \<noteq> 0\<close> have "u < n"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1446	by (simp add: abs_mult)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1447	show "(q * l + r) div l = q"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1448	proof (cases "q = 0 \<or> r = 0")
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1449	case True
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1450	then show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1451	proof
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1452	assume "q = 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1453	then show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1454	using l r \<open>u < n\<close> by (simp add: divide_int_unfold)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1455	next
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1456	assume "r = 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1457	from \<open>r = 0\<close> have : "q l + r = sgn (t * s) * int (n * m)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1458	using q l by (simp add: ac_simps sgn_mult)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1459	from \<open>s \<noteq> 0\<close> \<open>n > 0\<close> show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1460	by (simp only: *, simp only: q l divide_int_unfold)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1461	(auto simp add: sgn_mult sgn_0_0 sgn_1_pos)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1462	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1463	next
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1464	case False
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1465	with q r have "t \<noteq> 0" and "m > 0" and "s \<noteq> 0" and "u > 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1466	by (simp_all add: sgn_0_0)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1467	moreover from \<open>0 < m\<close> \<open>u < n\<close> have "u \<le> m * n"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1468	using mult_le_less_imp_less [of 1 m u n] by simp
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1469	ultimately have : "q l + r = sgn (s * t)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1470	* int (if t < 0 then m * n - u else m * n + u)"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1471	using l q r
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1472	by (simp add: sgn_mult algebra_simps of_nat_diff)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1473	have "(m * n - u) div n = m - 1" if "u > 0"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1474	using \<open>0 < m\<close> \<open>u < n\<close> that
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1475	by (auto intro: div_nat_eqI simp add: algebra_simps)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1476	moreover have "n dvd m * n - u \<longleftrightarrow> n dvd u"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1477	using \<open>u \<le> m * n\<close> dvd_diffD1 [of n "m * n" u]
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1478	by auto
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1479	ultimately show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1480	using \<open>s \<noteq> 0\<close> \<open>m > 0\<close> \<open>u > 0\<close> \<open>u < n\<close> \<open>u \<le> m * n\<close>
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1481	by (simp only: *, simp only: l q divide_int_unfold)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1482	(auto simp add: sgn_mult sgn_0_0 sgn_1_pos algebra_simps dest: dvd_imp_le)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1483	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1484	qed (use mult_le_mono2 [of 1] in \<open>auto simp add: abs_mult sgn_mult abs_mod_less sgn_mod nat_mult_distrib\<close>)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1485
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1486	end
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1487
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1488	lemma pos_mod_bound [simp]:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1489	"k mod l < l" if "l > 0" for k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1490	proof -
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1491	obtain m and s where "k = sgn s * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1492	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1493	moreover from that obtain n where "l = sgn 1 * int n"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1494	by (cases l) auto
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1495	ultimately show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1496	using that by (simp only: modulo_int_unfold)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1497	(simp add: mod_greater_zero_iff_not_dvd)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1498	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1499
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1500	lemma pos_mod_sign [simp]:
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1501	"0 \<le> k mod l" if "l > 0" for k l :: int
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1502	proof -
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1503	obtain m and s where "k = sgn s * int m"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1504	by (blast intro: int_sgnE elim: that)
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1505	moreover from that obtain n where "l = sgn 1 * int n"
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1506	by (cases l) auto
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1507	ultimately show ?thesis
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1508	using that by (simp only: modulo_int_unfold) simp
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1509	qed
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1510
212a3334e7da more fundamental definition of div and mod on int haftmann parents: 66814 diff changeset	1511
66808 1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1512	subsection \<open>Code generation\<close>
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1513
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1514	code_identifier
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1515	code_module Euclidean_Division \<rightharpoonup> (SML) Arith and (OCaml) Arith and (Haskell) Arith
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1516
1907167b6038 elementary definition of division on natural numbers haftmann parents: 66807 diff changeset	1517	end

author	haftmann
	Mon, 09 Oct 2017 19:10:48 +0200
changeset 66837	6ba663ff2b1c
parent 66817	0b12755ccbb2
child 66838	17989f6bc7b2
permissions	-rw-r--r--