isabelle: src/HOL/Library/Multiset_Order.thy@b867eb037e7f (annotated)

59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	1	(* Title: HOL/Library/Multiset_Order.thy
6320064f22bb more multiset theorems blanchet parents: diff changeset	2	Author: Dmitriy Traytel, TU Muenchen
6320064f22bb more multiset theorems blanchet parents: diff changeset	3	Author: Jasmin Blanchette, Inria, LORIA, MPII
6320064f22bb more multiset theorems blanchet parents: diff changeset	4	*)
6320064f22bb more multiset theorems blanchet parents: diff changeset	5
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60397 diff changeset	6	section \<open>More Theorems about the Multiset Order\<close>
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	7
6320064f22bb more multiset theorems blanchet parents: diff changeset	8	theory Multiset_Order
6320064f22bb more multiset theorems blanchet parents: diff changeset	9	imports Multiset
6320064f22bb more multiset theorems blanchet parents: diff changeset	10	begin
6320064f22bb more multiset theorems blanchet parents: diff changeset	11
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	12	subsection \<open>Alternative Characterizations\<close>
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	13
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	14	subsubsection \<open>The Dershowitz--Manna Ordering\<close>
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	15
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	16	definition multp\<^sub>D\<^sub>M where
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	17	"multp\<^sub>D\<^sub>M r M N \<longleftrightarrow>
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	18	(\<exists>X Y. X \<noteq> {#} \<and> X \<subseteq># N \<and> M = (N - X) + Y \<and> (\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> r k a)))"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	19
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	20	lemma multp\<^sub>D\<^sub>M_imp_multp:
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	21	"multp\<^sub>D\<^sub>M r M N \<Longrightarrow> multp r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	22	proof -
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	23	assume "multp\<^sub>D\<^sub>M r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	24	then obtain X Y where
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	25	"X \<noteq> {#}" and "X \<subseteq># N" and "M = N - X + Y" and "\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> r k a)"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	26	unfolding multp\<^sub>D\<^sub>M_def by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	27	then have "multp r (N - X + Y) (N - X + X)"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	28	by (intro one_step_implies_multp) (auto simp: Bex_def trans_def)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	29	with \<open>M = N - X + Y\<close> \<open>X \<subseteq># N\<close> show "multp r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	30	by (metis subset_mset.diff_add)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	31	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	32
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	33	subsubsection \<open>The Huet--Oppen Ordering\<close>
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	34
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	35	definition multp\<^sub>H\<^sub>O where
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	36	"multp\<^sub>H\<^sub>O r M N \<longleftrightarrow> M \<noteq> N \<and> (\<forall>y. count N y < count M y \<longrightarrow> (\<exists>x. r y x \<and> count M x < count N x))"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	37
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	38	lemma multp_imp_multp\<^sub>H\<^sub>O:
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	39	assumes "asymp r" and "transp r"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	40	shows "multp r M N \<Longrightarrow> multp\<^sub>H\<^sub>O r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	41	unfolding multp_def mult_def
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	42	proof (induction rule: trancl_induct)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	43	case (base P)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	44	then show ?case
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	45	using \<open>asymp r\<close>
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	46	by (auto elim!: mult1_lessE simp: count_eq_zero_iff multp\<^sub>H\<^sub>O_def split: if_splits
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	47	dest!: Suc_lessD)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	48	next
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	49	case (step N P)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	50	from step(3) have "M \<noteq> N" and
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	51	**: "\<And>y. count N y < count M y \<Longrightarrow> (\<exists>x. r y x \<and> count M x < count N x)"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	52	by (simp_all add: multp\<^sub>H\<^sub>O_def)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	53	from step(2) obtain M0 a K where
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	54	*: "P = add_mset a M0" "N = M0 + K" "a \<notin># K" "\<And>b. b \<in># K \<Longrightarrow> r b a"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	55	using \<open>asymp r\<close> by (auto elim: mult1_lessE)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	56	from \<open>M \<noteq> N\<close> ** *(1,2,3) have "M \<noteq> P"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	57	using *(4) \<open>asymp r\<close>
76682 e260dabc88e6 added predicates asym_on and asymp_on and redefined asym and asymp to be abbreviations desharna parents: 74869 diff changeset	58	by (metis asympD add_cancel_right_right add_diff_cancel_left' add_mset_add_single count_inI
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	59	count_union diff_diff_add_mset diff_single_trivial in_diff_count multi_member_last)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	60	moreover
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	61	{ assume "count P a \<le> count M a"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	62	with \<open>a \<notin># K\<close> have "count N a < count M a" unfolding *(1,2)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	63	by (auto simp add: not_in_iff)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	64	with ** obtain z where z: "r a z" "count M z < count N z"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	65	by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	66	with * have "count N z \<le> count P z"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	67	using \<open>asymp r\<close>
76682 e260dabc88e6 added predicates asym_on and asymp_on and redefined asym and asymp to be abbreviations desharna parents: 74869 diff changeset	68	by (metis add_diff_cancel_left' add_mset_add_single asympD diff_diff_add_mset
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	69	diff_single_trivial in_diff_count not_le_imp_less)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	70	with z have "\<exists>z. r a z \<and> count M z < count P z" by auto
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	71	} note count_a = this
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	72	{ fix y
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	73	assume count_y: "count P y < count M y"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	74	have "\<exists>x. r y x \<and> count M x < count P x"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	75	proof (cases "y = a")
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	76	case True
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	77	with count_y count_a show ?thesis by auto
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	78	next
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	79	case False
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	80	show ?thesis
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	81	proof (cases "y \<in># K")
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	82	case True
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	83	with *(4) have "r y a" by simp
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	84	then show ?thesis
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	85	by (cases "count P a \<le> count M a") (auto dest: count_a intro: \<open>transp r\<close>[THEN transpD])
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	86	next
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	87	case False
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	88	with \<open>y \<noteq> a\<close> have "count P y = count N y" unfolding *(1,2)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	89	by (simp add: not_in_iff)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	90	with count_y ** obtain z where z: "r y z" "count M z < count N z" by auto
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	91	show ?thesis
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	92	proof (cases "z \<in># K")
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	93	case True
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	94	with *(4) have "r z a" by simp
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	95	with z(1) show ?thesis
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	96	by (cases "count P a \<le> count M a") (auto dest!: count_a intro: \<open>transp r\<close>[THEN transpD])
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	97	next
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	98	case False
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	99	with \<open>a \<notin># K\<close> have "count N z \<le> count P z" unfolding *
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	100	by (auto simp add: not_in_iff)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	101	with z show ?thesis by auto
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	102	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	103	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	104	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	105	}
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	106	ultimately show ?case unfolding multp\<^sub>H\<^sub>O_def by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	107	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	108
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	109	lemma multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M: "multp\<^sub>H\<^sub>O r M N \<Longrightarrow> multp\<^sub>D\<^sub>M r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	110	unfolding multp\<^sub>D\<^sub>M_def
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	111	proof (intro iffI exI conjI)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	112	assume "multp\<^sub>H\<^sub>O r M N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	113	then obtain z where z: "count M z < count N z"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	114	unfolding multp\<^sub>H\<^sub>O_def by (auto simp: multiset_eq_iff nat_neq_iff)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	115	define X where "X = N - M"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	116	define Y where "Y = M - N"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	117	from z show "X \<noteq> {#}" unfolding X_def by (auto simp: multiset_eq_iff not_less_eq_eq Suc_le_eq)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	118	from z show "X \<subseteq># N" unfolding X_def by auto
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	119	show "M = (N - X) + Y" unfolding X_def Y_def multiset_eq_iff count_union count_diff by force
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	120	show "\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> r k a)"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	121	proof (intro allI impI)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	122	fix k
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	123	assume "k \<in># Y"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	124	then have "count N k < count M k" unfolding Y_def
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	125	by (auto simp add: in_diff_count)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	126	with \<open>multp\<^sub>H\<^sub>O r M N\<close> obtain a where "r k a" and "count M a < count N a"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	127	unfolding multp\<^sub>H\<^sub>O_def by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	128	then show "\<exists>a. a \<in># X \<and> r k a" unfolding X_def
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	129	by (auto simp add: in_diff_count)
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	130	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	131	qed
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	132
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	133	lemma multp_eq_multp\<^sub>D\<^sub>M: "asymp r \<Longrightarrow> transp r \<Longrightarrow> multp r = multp\<^sub>D\<^sub>M r"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	134	using multp\<^sub>D\<^sub>M_imp_multp multp_imp_multp\<^sub>H\<^sub>O[THEN multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	135	by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	136
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	137	lemma multp_eq_multp\<^sub>H\<^sub>O: "asymp r \<Longrightarrow> transp r \<Longrightarrow> multp r = multp\<^sub>H\<^sub>O r"
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	138	using multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M[THEN multp\<^sub>D\<^sub>M_imp_multp] multp_imp_multp\<^sub>H\<^sub>O
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	139	by blast
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	140
77354 347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	141	lemma multp\<^sub>D\<^sub>M_plus_plusI[simp]:
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	142	assumes "multp\<^sub>D\<^sub>M R M1 M2"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	143	shows "multp\<^sub>D\<^sub>M R (M + M1) (M + M2)"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	144	proof -
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	145	from assms obtain X Y where
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	146	"X \<noteq> {#}" and "X \<subseteq># M2" and "M1 = M2 - X + Y" and "\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> R k a)"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	147	unfolding multp\<^sub>D\<^sub>M_def by auto
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	148
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	149	show "multp\<^sub>D\<^sub>M R (M + M1) (M + M2)"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	150	unfolding multp\<^sub>D\<^sub>M_def
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	151	proof (intro exI conjI)
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	152	show "X \<noteq> {#}"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	153	using \<open>X \<noteq> {#}\<close> by simp
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	154	next
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	155	show "X \<subseteq># M + M2"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	156	using \<open>X \<subseteq># M2\<close>
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	157	by (simp add: subset_mset.add_increasing)
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	158	next
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	159	show "M + M1 = M + M2 - X + Y"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	160	using \<open>X \<subseteq># M2\<close> \<open>M1 = M2 - X + Y\<close>
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	161	by (metis multiset_diff_union_assoc union_assoc)
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	162	next
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	163	show "\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> R k a)"
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	164	using \<open>\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> R k a)\<close> by simp
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	165	qed
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	166	qed
347d7133c171 added lemma multpDM_plus_plusI[simp] desharna parents: 77353 diff changeset	167
77104 9678b533119e added lemma multpHO_plus_plus[simp] desharna parents: 77064 diff changeset	168	lemma multp\<^sub>H\<^sub>O_plus_plus[simp]: "multp\<^sub>H\<^sub>O R (M + M1) (M + M2) \<longleftrightarrow> multp\<^sub>H\<^sub>O R M1 M2"
9678b533119e added lemma multpHO_plus_plus[simp] desharna parents: 77064 diff changeset	169	unfolding multp\<^sub>H\<^sub>O_def by simp
9678b533119e added lemma multpHO_plus_plus[simp] desharna parents: 77064 diff changeset	170
77355 b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	171	lemma strict_subset_implies_multp\<^sub>D\<^sub>M: "A \<subset># B \<Longrightarrow> multp\<^sub>D\<^sub>M r A B"
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	172	unfolding multp\<^sub>D\<^sub>M_def
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	173	by (metis add.right_neutral add_diff_cancel_right' empty_iff mset_subset_eq_add_right
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	174	set_mset_empty subset_mset.lessE)
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	175
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	176	lemma strict_subset_implies_multp\<^sub>H\<^sub>O: "A \<subset># B \<Longrightarrow> multp\<^sub>H\<^sub>O r A B"
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	177	unfolding multp\<^sub>H\<^sub>O_def
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	178	by (simp add: leD mset_subset_eq_count)
b23367be6051 added lemmas strict_subset_implies_multpDM and strict_subset_implies_multpHO desharna parents: 77354 diff changeset	179
77986 0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	180	lemma multp\<^sub>H\<^sub>O_implies_one_step_strong:
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	181	assumes "multp\<^sub>H\<^sub>O R A B"
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	182	defines "J \<equiv> B - A" and "K \<equiv> A - B"
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	183	shows "J \<noteq> {#}" and "\<forall>k \<in># K. \<exists>x \<in># J. R k x"
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	184	proof -
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	185	show "J \<noteq> {#}"
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	186	using \<open>multp\<^sub>H\<^sub>O R A B\<close>
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	187	by (metis Diff_eq_empty_iff_mset J_def add.right_neutral multp\<^sub>D\<^sub>M_def multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	188	multp\<^sub>H\<^sub>O_plus_plus subset_mset.add_diff_inverse subset_mset.le_zero_eq)
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	189
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	190	show "\<forall>k\<in>#K. \<exists>x\<in>#J. R k x"
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	191	using \<open>multp\<^sub>H\<^sub>O R A B\<close>
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	192	by (metis J_def K_def in_diff_count multp\<^sub>H\<^sub>O_def)
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	193	qed
0f92caebc19a added lemma multpHO_implies_one_step_strong desharna parents: 77834 diff changeset	194
77988 3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	195	lemma multp\<^sub>H\<^sub>O_minus_inter_minus_inter_iff:
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	196	fixes M1 M2 :: "_ multiset"
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	197	shows "multp\<^sub>H\<^sub>O R (M1 - M2) (M2 - M1) \<longleftrightarrow> multp\<^sub>H\<^sub>O R M1 M2"
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	198	by (metis diff_intersect_left_idem multiset_inter_commute multp\<^sub>H\<^sub>O_plus_plus
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	199	subset_mset.add_diff_inverse subset_mset.inf.cobounded1)
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	200
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	201	lemma multp\<^sub>H\<^sub>O_iff_set_mset_less\<^sub>H\<^sub>O_set_mset:
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	202	"multp\<^sub>H\<^sub>O R M1 M2 \<longleftrightarrow> (set_mset (M1 - M2) \<noteq> set_mset (M2 - M1) \<and>
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	203	(\<forall>y \<in># M1 - M2. (\<exists>x \<in># M2 - M1. R y x)))"
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	204	unfolding multp\<^sub>H\<^sub>O_minus_inter_minus_inter_iff[of R M1 M2, symmetric]
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	205	unfolding multp\<^sub>H\<^sub>O_def
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	206	unfolding count_minus_inter_lt_count_minus_inter_iff
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	207	unfolding minus_inter_eq_minus_inter_iff
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	208	by auto
3e5f6e31c4fd added lemmas multpHO_iff_set_mset_lessHO_set_mset and multpHO_minus_inter_minus_inter_iff desharna parents: 77986 diff changeset	209
77063 4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	210
77353 42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	211	subsubsection \<open>Monotonicity\<close>
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	212
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	213	lemma multp\<^sub>D\<^sub>M_mono_strong:
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	214	"multp\<^sub>D\<^sub>M R M1 M2 \<Longrightarrow> (\<And>x y. x \<in># M1 \<Longrightarrow> y \<in># M2 \<Longrightarrow> R x y \<Longrightarrow> S x y) \<Longrightarrow> multp\<^sub>D\<^sub>M S M1 M2"
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	215	unfolding multp\<^sub>D\<^sub>M_def
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	216	by (metis add_diff_cancel_left' in_diffD subset_mset.diff_add)
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	217
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	218	lemma multp\<^sub>H\<^sub>O_mono_strong:
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	219	"multp\<^sub>H\<^sub>O R M1 M2 \<Longrightarrow> (\<And>x y. x \<in># M1 \<Longrightarrow> y \<in># M2 \<Longrightarrow> R x y \<Longrightarrow> S x y) \<Longrightarrow> multp\<^sub>H\<^sub>O S M1 M2"
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	220	unfolding multp\<^sub>H\<^sub>O_def
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	221	by (metis count_inI less_zeroE)
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	222
42accfbf4d85 added lemmas multpDM_mono_strong and multpHO_mono_strong desharna parents: 77281 diff changeset	223
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	224	subsubsection \<open>Properties of Preorders\<close>
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	225
77064 e06463478a3f added lemma irreflp_on_multpHO[simp] desharna parents: 77063 diff changeset	226	lemma irreflp_on_multp\<^sub>H\<^sub>O[simp]: "irreflp_on B (multp\<^sub>H\<^sub>O R)"
e06463478a3f added lemma irreflp_on_multpHO[simp] desharna parents: 77063 diff changeset	227	by (simp add: irreflp_onI multp\<^sub>H\<^sub>O_def)
e06463478a3f added lemma irreflp_on_multpHO[simp] desharna parents: 77063 diff changeset	228
77281 3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	229	text \<open>The following lemma is a negative result stating that asymmetry of an arbitrary binary
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	230	relation cannot be simply lifted to @{const multp\<^sub>H\<^sub>O}. It suffices to have four distinct values to
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	231	build a counterexample.\<close>
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	232
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	233	lemma asymp_not_liftable_to_multp\<^sub>H\<^sub>O:
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	234	fixes a b c d :: 'a
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	235	assumes "distinct [a, b, c, d]"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	236	shows "\<not> (\<forall>(R :: 'a \<Rightarrow> 'a \<Rightarrow> bool). asymp R \<longrightarrow> asymp (multp\<^sub>H\<^sub>O R))"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	237	proof -
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	238	define R :: "'a \<Rightarrow> 'a \<Rightarrow> bool" where
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	239	"R = (\<lambda>x y. x = a \<and> y = c \<or> x = b \<and> y = d \<or> x = c \<and> y = b \<or> x = d \<and> y = a)"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	240
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	241	from assms(1) have "{#a, b#} \<noteq> {#c, d#}"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	242	by (metis add_mset_add_single distinct.simps(2) list.set(1) list.simps(15) multi_member_this
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	243	set_mset_add_mset_insert set_mset_single)
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	244
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	245	from assms(1) have "asymp R"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	246	by (auto simp: R_def intro: asymp_onI)
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	247	moreover have "\<not> asymp (multp\<^sub>H\<^sub>O R)"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	248	unfolding asymp_on_def Set.ball_simps not_all not_imp not_not
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	249	proof (intro exI conjI)
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	250	show "multp\<^sub>H\<^sub>O R {#a, b#} {#c, d#}"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	251	unfolding multp\<^sub>H\<^sub>O_def
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	252	using \<open>{#a, b#} \<noteq> {#c, d#}\<close> R_def assms by auto
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	253	next
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	254	show "multp\<^sub>H\<^sub>O R {#c, d#} {#a, b#}"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	255	unfolding multp\<^sub>H\<^sub>O_def
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	256	using \<open>{#a, b#} \<noteq> {#c, d#}\<close> R_def assms by auto
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	257	qed
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	258	ultimately show ?thesis
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	259	unfolding not_all not_imp by auto
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	260	qed
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	261
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	262	text \<open>However, if the binary relation is both asymmetric and transitive, then @{const multp\<^sub>H\<^sub>O} is
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	263	also asymmetric.\<close>
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	264
77989 b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	265	lemma asymp_on_multp\<^sub>H\<^sub>O:
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	266	assumes "asymp_on A R" and "transp_on A R" and
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	267	B_sub_A: "\<And>M. M \<in> B \<Longrightarrow> set_mset M \<subseteq> A"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	268	shows "asymp_on B (multp\<^sub>H\<^sub>O R)"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	269	proof (rule asymp_onI)
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	270	fix M1 M2 :: "'a multiset"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	271	assume "M1 \<in> B" "M2 \<in> B" "multp\<^sub>H\<^sub>O R M1 M2"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	272
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	273	from \<open>transp_on A R\<close> B_sub_A have tran: "transp_on (set_mset (M1 - M2)) R"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	274	using \<open>M1 \<in> B\<close>
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	275	by (meson in_diffD subset_eq transp_on_subset)
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	276
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	277	from \<open>asymp_on A R\<close> B_sub_A have asym: "asymp_on (set_mset (M1 - M2)) R"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	278	using \<open>M1 \<in> B\<close>
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	279	by (meson in_diffD subset_eq asymp_on_subset)
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	280
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	281	show "\<not> multp\<^sub>H\<^sub>O R M2 M1"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	282	proof (cases "M1 - M2 = {#}")
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	283	case True
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	284	then show ?thesis
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	285	using multp\<^sub>H\<^sub>O_implies_one_step_strong(1) by metis
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	286	next
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	287	case False
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	288	hence "\<exists>m\<in>#M1 - M2. \<forall>x\<in>#M1 - M2. x \<noteq> m \<longrightarrow> \<not> R m x"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	289	using Finite_Set.bex_max_element[of "set_mset (M1 - M2)" R, OF finite_set_mset _ tran asym]
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	290	by simp
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	291	with \<open>transp_on A R\<close> B_sub_A have "\<exists>y\<in>#M2 - M1. \<forall>x\<in>#M1 - M2. \<not> R y x"
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	292	using \<open>multp\<^sub>H\<^sub>O R M1 M2\<close>[THEN multp\<^sub>H\<^sub>O_implies_one_step_strong(2)]
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	293	using asym[THEN irreflp_on_if_asymp_on, THEN irreflp_onD]
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	294	by (metis \<open>M1 \<in> B\<close> \<open>M2 \<in> B\<close> in_diffD subsetD transp_onD)
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	295	thus ?thesis
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	296	unfolding multp\<^sub>H\<^sub>O_iff_set_mset_less\<^sub>H\<^sub>O_set_mset by simp
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	297	qed
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	298	qed
b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	299
77281 3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	300	lemma asymp_multp\<^sub>H\<^sub>O:
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	301	assumes "asymp R" and "transp R"
3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	302	shows "asymp (multp\<^sub>H\<^sub>O R)"
77989 b867eb037e7f added lemma asymp_on_multpHO desharna parents: 77988 diff changeset	303	using assms asymp_on_multp\<^sub>H\<^sub>O[of UNIV, simplified] by metis
77281 3a2670c37e5c added lemmas asymp_not_liftable_to_multpHO and asymp_multpHO desharna parents: 77104 diff changeset	304
77063 4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	305	lemma totalp_on_multp\<^sub>D\<^sub>M:
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	306	"totalp_on A R \<Longrightarrow> (\<And>M. M \<in> B \<Longrightarrow> set_mset M \<subseteq> A) \<Longrightarrow> totalp_on B (multp\<^sub>D\<^sub>M R)"
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	307	by (smt (verit, ccfv_SIG) count_inI in_mono multp\<^sub>H\<^sub>O_def multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M not_less_iff_gr_or_eq
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	308	totalp_onD totalp_onI)
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	309
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	310	lemma totalp_multp\<^sub>D\<^sub>M: "totalp R \<Longrightarrow> totalp (multp\<^sub>D\<^sub>M R)"
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	311	by (rule totalp_on_multp\<^sub>D\<^sub>M[of UNIV R UNIV, simplified])
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	312
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	313	lemma totalp_on_multp\<^sub>H\<^sub>O:
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	314	"totalp_on A R \<Longrightarrow> (\<And>M. M \<in> B \<Longrightarrow> set_mset M \<subseteq> A) \<Longrightarrow> totalp_on B (multp\<^sub>H\<^sub>O R)"
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	315	by (smt (verit, ccfv_SIG) count_inI in_mono multp\<^sub>H\<^sub>O_def not_less_iff_gr_or_eq totalp_onD
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	316	totalp_onI)
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	317
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	318	lemma totalp_multp\<^sub>H\<^sub>O: "totalp R \<Longrightarrow> totalp (multp\<^sub>H\<^sub>O R)"
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	319	by (rule totalp_on_multp\<^sub>H\<^sub>O[of UNIV R UNIV, simplified])
4b37cc497d7e added lemmas totalp_on_multpDM, totalp_multpDM, totalp_on_multpHO, and totalp_multpHO desharna parents: 76682 diff changeset	320
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	321	context preorder
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	322	begin
6320064f22bb more multiset theorems blanchet parents: diff changeset	323
6320064f22bb more multiset theorems blanchet parents: diff changeset	324	lemma order_mult: "class.order
6320064f22bb more multiset theorems blanchet parents: diff changeset	325	(\<lambda>M N. (M, N) \<in> mult {(x, y). x < y} \<or> M = N)
6320064f22bb more multiset theorems blanchet parents: diff changeset	326	(\<lambda>M N. (M, N) \<in> mult {(x, y). x < y})"
6320064f22bb more multiset theorems blanchet parents: diff changeset	327	(is "class.order ?le ?less")
6320064f22bb more multiset theorems blanchet parents: diff changeset	328	proof -
6320064f22bb more multiset theorems blanchet parents: diff changeset	329	have irrefl: "\<And>M :: 'a multiset. \<not> ?less M M"
6320064f22bb more multiset theorems blanchet parents: diff changeset	330	proof
6320064f22bb more multiset theorems blanchet parents: diff changeset	331	fix M :: "'a multiset"
6320064f22bb more multiset theorems blanchet parents: diff changeset	332	have "trans {(x'::'a, x). x' < x}"
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	333	by (rule transI) (blast intro: less_trans)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	334	moreover
6320064f22bb more multiset theorems blanchet parents: diff changeset	335	assume "(M, M) \<in> mult {(x, y). x < y}"
6320064f22bb more multiset theorems blanchet parents: diff changeset	336	ultimately have "\<exists>I J K. M = I + J \<and> M = I + K
60495 d7ff0a1df90a renamed Multiset.set_of to the canonical set_mset nipkow parents: 60397 diff changeset	337	\<and> J \<noteq> {#} \<and> (\<forall>k\<in>set_mset K. \<exists>j\<in>set_mset J. (k, j) \<in> {(x, y). x < y})"
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	338	by (rule mult_implies_one_step)
6320064f22bb more multiset theorems blanchet parents: diff changeset	339	then obtain I J K where "M = I + J" and "M = I + K"
60495 d7ff0a1df90a renamed Multiset.set_of to the canonical set_mset nipkow parents: 60397 diff changeset	340	and "J \<noteq> {#}" and "(\<forall>k\<in>set_mset K. \<exists>j\<in>set_mset J. (k, j) \<in> {(x, y). x < y})" by blast
d7ff0a1df90a renamed Multiset.set_of to the canonical set_mset nipkow parents: 60397 diff changeset	341	then have aux1: "K \<noteq> {#}" and aux2: "\<forall>k\<in>set_mset K. \<exists>j\<in>set_mset K. k < j" by auto
d7ff0a1df90a renamed Multiset.set_of to the canonical set_mset nipkow parents: 60397 diff changeset	342	have "finite (set_mset K)" by simp
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	343	moreover note aux2
60495 d7ff0a1df90a renamed Multiset.set_of to the canonical set_mset nipkow parents: 60397 diff changeset	344	ultimately have "set_mset K = {}"
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	345	by (induct rule: finite_induct)
6320064f22bb more multiset theorems blanchet parents: diff changeset	346	(simp, metis (mono_tags) insert_absorb insert_iff insert_not_empty less_irrefl less_trans)
6320064f22bb more multiset theorems blanchet parents: diff changeset	347	with aux1 show False by simp
6320064f22bb more multiset theorems blanchet parents: diff changeset	348	qed
6320064f22bb more multiset theorems blanchet parents: diff changeset	349	have trans: "\<And>K M N :: 'a multiset. ?less K M \<Longrightarrow> ?less M N \<Longrightarrow> ?less K N"
6320064f22bb more multiset theorems blanchet parents: diff changeset	350	unfolding mult_def by (blast intro: trancl_trans)
6320064f22bb more multiset theorems blanchet parents: diff changeset	351	show "class.order ?le ?less"
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	352	by standard (auto simp add: less_eq_multiset_def irrefl dest: trans)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	353	qed
6320064f22bb more multiset theorems blanchet parents: diff changeset	354
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60397 diff changeset	355	text \<open>The Dershowitz--Manna ordering:\<close>
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	356
6320064f22bb more multiset theorems blanchet parents: diff changeset	357	definition less_multiset\<^sub>D\<^sub>M where
6320064f22bb more multiset theorems blanchet parents: diff changeset	358	"less_multiset\<^sub>D\<^sub>M M N \<longleftrightarrow>
64587 8355a6e2df79 standardized notation haftmann parents: 64418 diff changeset	359	(\<exists>X Y. X \<noteq> {#} \<and> X \<subseteq># N \<and> M = (N - X) + Y \<and> (\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> k < a)))"
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	360
6320064f22bb more multiset theorems blanchet parents: diff changeset	361
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 60397 diff changeset	362	text \<open>The Huet--Oppen ordering:\<close>
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	363
6320064f22bb more multiset theorems blanchet parents: diff changeset	364	definition less_multiset\<^sub>H\<^sub>O where
6320064f22bb more multiset theorems blanchet parents: diff changeset	365	"less_multiset\<^sub>H\<^sub>O M N \<longleftrightarrow> M \<noteq> N \<and> (\<forall>y. count N y < count M y \<longrightarrow> (\<exists>x. y < x \<and> count M x < count N x))"
6320064f22bb more multiset theorems blanchet parents: diff changeset	366
62430 9527ff088c15 more succint formulation of membership for multisets, similar to lists; haftmann parents: 61424 diff changeset	367	lemma mult_imp_less_multiset\<^sub>H\<^sub>O:
9527ff088c15 more succint formulation of membership for multisets, similar to lists; haftmann parents: 61424 diff changeset	368	"(M, N) \<in> mult {(x, y). x < y} \<Longrightarrow> less_multiset\<^sub>H\<^sub>O M N"
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	369	unfolding multp_def[of "(<)", symmetric]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	370	using multp_imp_multp\<^sub>H\<^sub>O[of "(<)"]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	371	by (simp add: less_multiset\<^sub>H\<^sub>O_def multp\<^sub>H\<^sub>O_def)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	372
6320064f22bb more multiset theorems blanchet parents: diff changeset	373	lemma less_multiset\<^sub>D\<^sub>M_imp_mult:
6320064f22bb more multiset theorems blanchet parents: diff changeset	374	"less_multiset\<^sub>D\<^sub>M M N \<Longrightarrow> (M, N) \<in> mult {(x, y). x < y}"
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	375	unfolding multp_def[of "(<)", symmetric]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	376	by (rule multp\<^sub>D\<^sub>M_imp_multp[of "(<)" M N]) (simp add: less_multiset\<^sub>D\<^sub>M_def multp\<^sub>D\<^sub>M_def)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	377
6320064f22bb more multiset theorems blanchet parents: diff changeset	378	lemma less_multiset\<^sub>H\<^sub>O_imp_less_multiset\<^sub>D\<^sub>M: "less_multiset\<^sub>H\<^sub>O M N \<Longrightarrow> less_multiset\<^sub>D\<^sub>M M N"
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	379	unfolding less_multiset\<^sub>D\<^sub>M_def less_multiset\<^sub>H\<^sub>O_def
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	380	unfolding multp\<^sub>D\<^sub>M_def[symmetric] multp\<^sub>H\<^sub>O_def[symmetric]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	381	by (rule multp\<^sub>H\<^sub>O_imp_multp\<^sub>D\<^sub>M)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	382
6320064f22bb more multiset theorems blanchet parents: diff changeset	383	lemma mult_less_multiset\<^sub>D\<^sub>M: "(M, N) \<in> mult {(x, y). x < y} \<longleftrightarrow> less_multiset\<^sub>D\<^sub>M M N"
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	384	unfolding multp_def[of "(<)", symmetric]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	385	using multp_eq_multp\<^sub>D\<^sub>M[of "(<)", simplified]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	386	by (simp add: multp\<^sub>D\<^sub>M_def less_multiset\<^sub>D\<^sub>M_def)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	387
6320064f22bb more multiset theorems blanchet parents: diff changeset	388	lemma mult_less_multiset\<^sub>H\<^sub>O: "(M, N) \<in> mult {(x, y). x < y} \<longleftrightarrow> less_multiset\<^sub>H\<^sub>O M N"
74869 7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	389	unfolding multp_def[of "(<)", symmetric]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	390	using multp_eq_multp\<^sub>H\<^sub>O[of "(<)", simplified]
7b0a241732c1 added definitions multp{DM,HO} and corresponding lemmas desharna parents: 74867 diff changeset	391	by (simp add: multp\<^sub>H\<^sub>O_def less_multiset\<^sub>H\<^sub>O_def)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	392
6320064f22bb more multiset theorems blanchet parents: diff changeset	393	lemmas mult\<^sub>D\<^sub>M = mult_less_multiset\<^sub>D\<^sub>M[unfolded less_multiset\<^sub>D\<^sub>M_def]
6320064f22bb more multiset theorems blanchet parents: diff changeset	394	lemmas mult\<^sub>H\<^sub>O = mult_less_multiset\<^sub>H\<^sub>O[unfolded less_multiset\<^sub>H\<^sub>O_def]
6320064f22bb more multiset theorems blanchet parents: diff changeset	395
6320064f22bb more multiset theorems blanchet parents: diff changeset	396	end
6320064f22bb more multiset theorems blanchet parents: diff changeset	397
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	398	lemma less_multiset_less_multiset\<^sub>H\<^sub>O: "M < N \<longleftrightarrow> less_multiset\<^sub>H\<^sub>O M N"
74864 c256bba593f3 redefined less_multiset to be based on multp desharna parents: 74806 diff changeset	399	unfolding less_multiset_def multp_def mult\<^sub>H\<^sub>O less_multiset\<^sub>H\<^sub>O_def ..
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	400
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	401	lemma less_multiset\<^sub>D\<^sub>M:
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	402	"M < N \<longleftrightarrow> (\<exists>X Y. X \<noteq> {#} \<and> X \<subseteq># N \<and> M = N - X + Y \<and> (\<forall>k. k \<in># Y \<longrightarrow> (\<exists>a. a \<in># X \<and> k < a)))"
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	403	by (rule mult\<^sub>D\<^sub>M[folded multp_def less_multiset_def])
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	404
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	405	lemma less_multiset\<^sub>H\<^sub>O:
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	406	"M < N \<longleftrightarrow> M \<noteq> N \<and> (\<forall>y. count N y < count M y \<longrightarrow> (\<exists>x>y. count M x < count N x))"
4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	407	by (rule mult\<^sub>H\<^sub>O[folded multp_def less_multiset_def])
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	408
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	409	lemma subset_eq_imp_le_multiset:
64587 8355a6e2df79 standardized notation haftmann parents: 64418 diff changeset	410	shows "M \<subseteq># N \<Longrightarrow> M \<le> N"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	411	unfolding less_eq_multiset_def less_multiset\<^sub>H\<^sub>O
60397 f8a513fedb31 Renaming multiset operators < ~> <#,... Mathias Fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 59958 diff changeset	412	by (simp add: less_le_not_le subseteq_mset_def)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	413
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	414	(* FIXME: "le" should be "less" in this and other names *)
c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	415	lemma le_multiset_right_total: "M < add_mset x M"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	416	unfolding less_eq_multiset_def less_multiset\<^sub>H\<^sub>O by simp
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	417
a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	418	lemma less_eq_multiset_empty_left[simp]:
a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	419	shows "{#} \<le> M"
a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	420	by (simp add: subset_eq_imp_le_multiset)
a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	421
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	422	lemma ex_gt_imp_less_multiset: "(\<exists>y. y \<in># N \<and> (\<forall>x. x \<in># M \<longrightarrow> x < y)) \<Longrightarrow> M < N"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	423	unfolding less_multiset\<^sub>H\<^sub>O
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	424	by (metis count_eq_zero_iff count_greater_zero_iff less_le_not_le)
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	425
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	426	lemma less_eq_multiset_empty_right[simp]: "M \<noteq> {#} \<Longrightarrow> \<not> M \<le> {#}"
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	427	by (metis less_eq_multiset_empty_left antisym)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	428
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	429	(* FIXME: "le" should be "less" in this and other names *)
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	430	lemma le_multiset_empty_left[simp]: "M \<noteq> {#} \<Longrightarrow> {#} < M"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	431	by (simp add: less_multiset\<^sub>H\<^sub>O)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	432
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	433	(* FIXME: "le" should be "less" in this and other names *)
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	434	lemma le_multiset_empty_right[simp]: "\<not> M < {#}"
74864 c256bba593f3 redefined less_multiset to be based on multp desharna parents: 74806 diff changeset	435	using subset_mset.le_zero_eq less_multiset_def multp_def less_multiset\<^sub>D\<^sub>M by blast
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	436
67020 c32254ab1901 added FIXMEs blanchet parents: 65546 diff changeset	437	(* FIXME: "le" should be "less" in this and other names *)
64587 8355a6e2df79 standardized notation haftmann parents: 64418 diff changeset	438	lemma union_le_diff_plus: "P \<subseteq># M \<Longrightarrow> N < P \<Longrightarrow> M - P + N < M"
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	439	by (drule subset_mset.diff_add[symmetric]) (metis union_le_mono2)
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	440
63525 f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	441	instantiation multiset :: (preorder) ordered_ab_semigroup_monoid_add_imp_le
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	442	begin
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	443
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	444	lemma less_eq_multiset\<^sub>H\<^sub>O:
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	445	"M \<le> N \<longleftrightarrow> (\<forall>y. count N y < count M y \<longrightarrow> (\<exists>x. y < x \<and> count M x < count N x))"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	446	by (auto simp: less_eq_multiset_def less_multiset\<^sub>H\<^sub>O)
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	447
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	448	instance by standard (auto simp: less_eq_multiset\<^sub>H\<^sub>O)
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	449
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	450	lemma
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	451	fixes M N :: "'a multiset"
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	452	shows
63525 f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	453	less_eq_multiset_plus_left: "N \<le> (M + N)" and
f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	454	less_eq_multiset_plus_right: "M \<le> (M + N)"
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	455	by simp_all
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	456
6320064f22bb more multiset theorems blanchet parents: diff changeset	457	lemma
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	458	fixes M N :: "'a multiset"
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	459	shows
63525 f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	460	le_multiset_plus_left_nonempty: "M \<noteq> {#} \<Longrightarrow> N < M + N" and
f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	461	le_multiset_plus_right_nonempty: "N \<noteq> {#} \<Longrightarrow> M < M + N"
f01d1e393f3f more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63410 diff changeset	462	by simp_all
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	463
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	464	end
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	465
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	466	lemma all_lt_Max_imp_lt_mset: "N \<noteq> {#} \<Longrightarrow> (\<forall>a \<in># M. a < Max (set_mset N)) \<Longrightarrow> M < N"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	467	by (meson Max_in[OF finite_set_mset] ex_gt_imp_less_multiset set_mset_eq_empty_iff)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	468
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	469	lemma lt_imp_ex_count_lt: "M < N \<Longrightarrow> \<exists>y. count M y < count N y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	470	by (meson less_eq_multiset\<^sub>H\<^sub>O less_le_not_le)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	471
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	472	lemma subset_imp_less_mset: "A \<subset># B \<Longrightarrow> A < B"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	473	by (simp add: order.not_eq_order_implies_strict subset_eq_imp_le_multiset)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	474
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	475	lemma image_mset_strict_mono:
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	476	assumes
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	477	mono_f: "\<forall>x \<in> set_mset M. \<forall>y \<in> set_mset N. x < y \<longrightarrow> f x < f y" and
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	478	less: "M < N"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	479	shows "image_mset f M < image_mset f N"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	480	proof -
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	481	obtain Y X where
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	482	y_nemp: "Y \<noteq> {#}" and y_sub_N: "Y \<subseteq># N" and M_eq: "M = N - Y + X" and
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	483	ex_y: "\<forall>x. x \<in># X \<longrightarrow> (\<exists>y. y \<in># Y \<and> x < y)"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	484	using less[unfolded less_multiset\<^sub>D\<^sub>M] by blast
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	485
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	486	have x_sub_M: "X \<subseteq># M"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	487	using M_eq by simp
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	488
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	489	let ?fY = "image_mset f Y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	490	let ?fX = "image_mset f X"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	491
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	492	show ?thesis
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	493	unfolding less_multiset\<^sub>D\<^sub>M
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	494	proof (intro exI conjI)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	495	show "image_mset f M = image_mset f N - ?fY + ?fX"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	496	using M_eq[THEN arg_cong, of "image_mset f"] y_sub_N
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	497	by (metis image_mset_Diff image_mset_union)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	498	next
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	499	obtain y where y: "\<forall>x. x \<in># X \<longrightarrow> y x \<in># Y \<and> x < y x"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	500	using ex_y by moura
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	501
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	502	show "\<forall>fx. fx \<in># ?fX \<longrightarrow> (\<exists>fy. fy \<in># ?fY \<and> fx < fy)"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	503	proof (intro allI impI)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	504	fix fx
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	505	assume "fx \<in># ?fX"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	506	then obtain x where fx: "fx = f x" and x_in: "x \<in># X"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	507	by auto
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	508	hence y_in: "y x \<in># Y" and y_gt: "x < y x"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	509	using y[rule_format, OF x_in] by blast+
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	510	hence "f (y x) \<in># ?fY \<and> f x < f (y x)"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	511	using mono_f y_sub_N x_sub_M x_in
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	512	by (metis image_eqI in_image_mset mset_subset_eqD)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	513	thus "\<exists>fy. fy \<in># ?fY \<and> fx < fy"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	514	unfolding fx by auto
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	515	qed
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	516	qed (auto simp: y_nemp y_sub_N image_mset_subseteq_mono)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	517	qed
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	518
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	519	lemma image_mset_mono:
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	520	assumes
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	521	mono_f: "\<forall>x \<in> set_mset M. \<forall>y \<in> set_mset N. x < y \<longrightarrow> f x < f y" and
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	522	less: "M \<le> N"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	523	shows "image_mset f M \<le> image_mset f N"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	524	by (metis eq_iff image_mset_strict_mono less less_imp_le mono_f order.not_eq_order_implies_strict)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	525
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	526	lemma mset_lt_single_right_iff[simp]: "M < {#y#} \<longleftrightarrow> (\<forall>x \<in># M. x < y)" for y :: "'a::linorder"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	527	proof (rule iffI)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	528	assume M_lt_y: "M < {#y#}"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	529	show "\<forall>x \<in># M. x < y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	530	proof
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	531	fix x
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	532	assume x_in: "x \<in># M"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	533	hence M: "M - {#x#} + {#x#} = M"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	534	by (meson insert_DiffM2)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	535	hence "\<not> {#x#} < {#y#} \<Longrightarrow> x < y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	536	using x_in M_lt_y
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	537	by (metis diff_single_eq_union le_multiset_empty_left less_add_same_cancel2 mset_le_trans)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	538	also have "\<not> {#y#} < M"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	539	using M_lt_y mset_le_not_sym by blast
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	540	ultimately show "x < y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	541	by (metis (no_types) Max_ge all_lt_Max_imp_lt_mset empty_iff finite_set_mset insertE
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	542	less_le_trans linorder_less_linear mset_le_not_sym set_mset_add_mset_insert
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	543	set_mset_eq_empty_iff x_in)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	544	qed
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	545	next
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	546	assume y_max: "\<forall>x \<in># M. x < y"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	547	show "M < {#y#}"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	548	by (rule all_lt_Max_imp_lt_mset) (auto intro!: y_max)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	549	qed
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	550
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	551	lemma mset_le_single_right_iff[simp]:
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	552	"M \<le> {#y#} \<longleftrightarrow> M = {#y#} \<or> (\<forall>x \<in># M. x < y)" for y :: "'a::linorder"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	553	by (meson less_eq_multiset_def mset_lt_single_right_iff)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	554
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	555
77834 52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	556	subsubsection \<open>Simplifications\<close>
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	557
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	558	lemma multp\<^sub>H\<^sub>O_repeat_mset_repeat_mset[simp]:
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	559	assumes "n \<noteq> 0"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	560	shows "multp\<^sub>H\<^sub>O R (repeat_mset n A) (repeat_mset n B) \<longleftrightarrow> multp\<^sub>H\<^sub>O R A B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	561	proof (rule iffI)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	562	assume hyp: "multp\<^sub>H\<^sub>O R (repeat_mset n A) (repeat_mset n B)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	563	hence
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	564	1: "repeat_mset n A \<noteq> repeat_mset n B" and
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	565	2: "\<forall>y. n * count B y < n * count A y \<longrightarrow> (\<exists>x. R y x \<and> n * count A x < n * count B x)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	566	by (simp_all add: multp\<^sub>H\<^sub>O_def)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	567
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	568	from 1 \<open>n \<noteq> 0\<close> have "A \<noteq> B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	569	by auto
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	570
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	571	moreover from 2 \<open>n \<noteq> 0\<close> have "\<forall>y. count B y < count A y \<longrightarrow> (\<exists>x. R y x \<and> count A x < count B x)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	572	by auto
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	573
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	574	ultimately show "multp\<^sub>H\<^sub>O R A B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	575	by (simp add: multp\<^sub>H\<^sub>O_def)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	576	next
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	577	assume "multp\<^sub>H\<^sub>O R A B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	578	hence 1: "A \<noteq> B" and 2: "\<forall>y. count B y < count A y \<longrightarrow> (\<exists>x. R y x \<and> count A x < count B x)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	579	by (simp_all add: multp\<^sub>H\<^sub>O_def)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	580
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	581	from 1 have "repeat_mset n A \<noteq> repeat_mset n B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	582	by (simp add: assms repeat_mset_cancel1)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	583
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	584	moreover from 2 have "\<forall>y. n * count B y < n * count A y \<longrightarrow>
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	585	(\<exists>x. R y x \<and> n * count A x < n * count B x)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	586	by auto
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	587
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	588	ultimately show "multp\<^sub>H\<^sub>O R (repeat_mset n A) (repeat_mset n B)"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	589	by (simp add: multp\<^sub>H\<^sub>O_def)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	590	qed
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	591
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	592	lemma multp\<^sub>H\<^sub>O_double_double[simp]: "multp\<^sub>H\<^sub>O R (A + A) (B + B) \<longleftrightarrow> multp\<^sub>H\<^sub>O R A B"
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	593	using multp\<^sub>H\<^sub>O_repeat_mset_repeat_mset[of 2]
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	594	by (simp add: numeral_Bit0)
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	595
52e753197496 added lemmas multpHO_repeat_mset_repeat_mset[simp] and multpHO_double_double[simp] desharna parents: 77355 diff changeset	596
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	597	subsection \<open>Simprocs\<close>
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	598
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	599	lemma mset_le_add_iff1:
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	600	"j \<le> (i::nat) \<Longrightarrow> (repeat_mset i u + m \<le> repeat_mset j u + n) = (repeat_mset (i-j) u + m \<le> n)"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	601	proof -
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	602	assume "j \<le> i"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	603	then have "j + (i - j) = i"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	604	using le_add_diff_inverse by blast
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	605	then show ?thesis
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	606	by (metis (no_types) add_le_cancel_left left_add_mult_distrib_mset)
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	607	qed
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	608
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	609	lemma mset_le_add_iff2:
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	610	"i \<le> (j::nat) \<Longrightarrow> (repeat_mset i u + m \<le> repeat_mset j u + n) = (m \<le> repeat_mset (j-i) u + n)"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	611	proof -
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	612	assume "i \<le> j"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	613	then have "i + (j - i) = j"
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	614	using le_add_diff_inverse by blast
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	615	then show ?thesis
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	616	by (metis (no_types) add_le_cancel_left left_add_mult_distrib_mset)
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	617	qed
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	618
65027 2b8583507891 renaming multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64978 diff changeset	619	simproc_setup msetless_cancel
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	620	("(l::'a::preorder multiset) + m < n" \| "(l::'a multiset) < m + n" \|
65028 87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	621	"add_mset a m < n" \| "m < add_mset a n" \|
87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	622	"replicate_mset p a < n" \| "m < replicate_mset p a" \|
87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	623	"repeat_mset p m < n" \| "m < repeat_mset p n") =
65031 52e2c99f3711 use the cancellation simprocs directly fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65028 diff changeset	624	\<open>fn phi => Cancel_Simprocs.less_cancel\<close>
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	625
65027 2b8583507891 renaming multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64978 diff changeset	626	simproc_setup msetle_cancel
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	627	("(l::'a::preorder multiset) + m \<le> n" \| "(l::'a multiset) \<le> m + n" \|
65028 87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	628	"add_mset a m \<le> n" \| "m \<le> add_mset a n" \|
87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	629	"replicate_mset p a \<le> n" \| "m \<le> replicate_mset p a" \|
87e003397834 adding simplification patterns to multiset simprocs fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65027 diff changeset	630	"repeat_mset p m \<le> n" \| "m \<le> repeat_mset p n") =
65031 52e2c99f3711 use the cancellation simprocs directly fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 65028 diff changeset	631	\<open>fn phi => Cancel_Simprocs.less_eq_cancel\<close>
63793 e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	632
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	633
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	634	subsection \<open>Additional facts and instantiations\<close>
e68a0b651eb5 add_mset constructor in multisets fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63525 diff changeset	635
63388 a095acd4cfbf instantiate multiset with multiset ordering fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63310 diff changeset	636	lemma ex_gt_count_imp_le_multiset:
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	637	"(\<forall>y :: 'a :: order. y \<in># M + N \<longrightarrow> y \<le> x) \<Longrightarrow> count M x < count N x \<Longrightarrow> M < N"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	638	unfolding less_multiset\<^sub>H\<^sub>O
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	639	by (metis count_greater_zero_iff le_imp_less_or_eq less_imp_not_less not_gr_zero union_iff)
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	640
64418 91eae3a1be51 more lemmas fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64076 diff changeset	641	lemma mset_lt_single_iff[iff]: "{#x#} < {#y#} \<longleftrightarrow> x < y"
74867 4220dcd6c22e restored lemmas less_multiset{DM,HO} inadvertently changed by c256bba593f3 desharna parents: 74864 diff changeset	642	unfolding less_multiset\<^sub>H\<^sub>O by simp
64418 91eae3a1be51 more lemmas fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64076 diff changeset	643
91eae3a1be51 more lemmas fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64076 diff changeset	644	lemma mset_le_single_iff[iff]: "{#x#} \<le> {#y#} \<longleftrightarrow> x \<le> y" for x y :: "'a::order"
91eae3a1be51 more lemmas fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64076 diff changeset	645	unfolding less_eq_multiset\<^sub>H\<^sub>O by force
91eae3a1be51 more lemmas fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 64076 diff changeset	646
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	647	instance multiset :: (linorder) linordered_cancel_ab_semigroup_add
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	648	by standard (metis less_eq_multiset\<^sub>H\<^sub>O not_less_iff_gr_or_eq)
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	649
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	650	lemma less_eq_multiset_total:
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	651	fixes M N :: "'a :: linorder multiset"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	652	shows "\<not> M \<le> N \<Longrightarrow> N \<le> M"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	653	by simp
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	654
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	655	instantiation multiset :: (wellorder) wellorder
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	656	begin
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	657
3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	658	lemma wf_less_multiset: "wf {(M :: 'a multiset, N). M < N}"
74864 c256bba593f3 redefined less_multiset to be based on multp desharna parents: 74806 diff changeset	659	unfolding less_multiset_def multp_def by (auto intro: wf_mult wf)
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	660
74864 c256bba593f3 redefined less_multiset to be based on multp desharna parents: 74806 diff changeset	661	instance by standard (metis less_multiset_def multp_def wf wf_def wf_mult)
59813 6320064f22bb more multiset theorems blanchet parents: diff changeset	662
6320064f22bb more multiset theorems blanchet parents: diff changeset	663	end
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	664
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	665	instantiation multiset :: (preorder) order_bot
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	666	begin
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	667
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	668	definition bot_multiset :: "'a multiset" where "bot_multiset = {#}"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	669
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	670	instance by standard (simp add: bot_multiset_def)
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	671
63409 3f3223b90239 moved lemmas and locales around (with minor incompatibilities) blanchet parents: 63407 diff changeset	672	end
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	673
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	674	instance multiset :: (preorder) no_top
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	675	proof standard
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	676	fix x :: "'a multiset"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	677	obtain a :: 'a where True by simp
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	678	have "x < x + (x + {#a#})"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	679	by simp
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	680	then show "\<exists>y. x < y"
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	681	by blast
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	682	qed
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	683
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	684	instance multiset :: (preorder) ordered_cancel_comm_monoid_add
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	685	by standard
9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	686
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	687	instantiation multiset :: (linorder) distrib_lattice
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	688	begin
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	689
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	690	definition inf_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" where
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	691	"inf_multiset A B = (if A < B then A else B)"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	692
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	693	definition sup_multiset :: "'a multiset \<Rightarrow> 'a multiset \<Rightarrow> 'a multiset" where
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	694	"sup_multiset A B = (if B > A then B else A)"
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	695
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	696	instance
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	697	by intro_classes (auto simp: inf_multiset_def sup_multiset_def)
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	698
63410 9789ccc2a477 more instantiations for multiset fleury <Mathias.Fleury@mpi-inf.mpg.de> parents: 63409 diff changeset	699	end
65546 7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	700
7c58f69451b0 moved lemmas from AFP to Isabelle blanchet parents: 65031 diff changeset	701	end

author	desharna
	Mon, 08 May 2023 11:27:03 +0200
changeset 77989	b867eb037e7f
parent 77988	3e5f6e31c4fd
child 77990	515a69e976c3
permissions	-rw-r--r--