isabelle: src/HOL/Library/Set_Algebras.thy@17ba2df56dee (annotated)

38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	1	(* Title: HOL/Library/Set_Algebras.thy
86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	2	Author: Jeremy Avigad and Kevin Donnelly; Florian Haftmann, TUM
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	3	*)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	4
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	5	section \<open>Algebraic operations on sets\<close>
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	6
38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	7	theory Set_Algebras
30738 0842e906300c normalized imports haftmann parents: 29667 diff changeset	8	imports Main
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	9	begin
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	10
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	11	text \<open>
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	12	This library lifts operations like addition and multiplication to
38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	13	sets. It was designed to support asymptotic calculations. See the
86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	14	comments at the top of theory @{text BigO}.
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	15	\<close>
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	16
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	17	instantiation set :: (plus) plus
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	18	begin
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	19
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	20	definition plus_set :: "'a::plus set \<Rightarrow> 'a set \<Rightarrow> 'a set" where
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	21	set_plus_def: "A + B = {c. \<exists>a\<in>A. \<exists>b\<in>B. c = a + b}"
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	22
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	23	instance ..
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	24
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	25	end
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	26
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	27	instantiation set :: (times) times
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	28	begin
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	29
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	30	definition times_set :: "'a::times set \<Rightarrow> 'a set \<Rightarrow> 'a set" where
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	31	set_times_def: "A * B = {c. \<exists>a\<in>A. \<exists>b\<in>B. c = a * b}"
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	32
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	33	instance ..
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	34
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	35	end
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	36
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	37	instantiation set :: (zero) zero
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	38	begin
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	39
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	40	definition
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	41	set_zero[simp]: "(0::'a::zero set) = {0}"
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	42
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	43	instance ..
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	44
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	45	end
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	46
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	47	instantiation set :: (one) one
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	48	begin
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	49
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	50	definition
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	51	set_one[simp]: "(1::'a::one set) = {1}"
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	52
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	53	instance ..
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	54
aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	55	end
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	56
38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	57	definition elt_set_plus :: "'a::plus \<Rightarrow> 'a set \<Rightarrow> 'a set" (infixl "+o" 70) where
86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	58	"a +o B = {c. \<exists>b\<in>B. c = a + b}"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	59
38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	60	definition elt_set_times :: "'a::times \<Rightarrow> 'a set \<Rightarrow> 'a set" (infixl "*o" 80) where
86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	61	"a o B = {c. \<exists>b\<in>B. c = a b}"
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	62
38622 86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	63	abbreviation (input) elt_set_eq :: "'a \<Rightarrow> 'a set \<Rightarrow> bool" (infix "=o" 50) where
86fc906dcd86 split and enriched theory SetsAndFunctions haftmann parents: 35267 diff changeset	64	"x =o A \<equiv> x \<in> A"
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	65
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	66	instance set :: (semigroup_add) semigroup_add
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	67	by default (force simp add: set_plus_def add.assoc)
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	68
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	69	instance set :: (ab_semigroup_add) ab_semigroup_add
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	70	by default (force simp add: set_plus_def add.commute)
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	71
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	72	instance set :: (monoid_add) monoid_add
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	73	by default (simp_all add: set_plus_def)
25594 43c718438f9f switched import from Main to PreList haftmann parents: 23477 diff changeset	74
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	75	instance set :: (comm_monoid_add) comm_monoid_add
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	76	by default (simp_all add: set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	77
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	78	instance set :: (semigroup_mult) semigroup_mult
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	79	by default (force simp add: set_times_def mult.assoc)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	80
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	81	instance set :: (ab_semigroup_mult) ab_semigroup_mult
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	82	by default (force simp add: set_times_def mult.commute)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	83
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	84	instance set :: (monoid_mult) monoid_mult
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	85	by default (simp_all add: set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	86
47443 aeff49a3369b backported Set_Algebras to use type classes (basically reverting b3e8d5ec721d from 2008) krauss parents: 44890 diff changeset	87	instance set :: (comm_monoid_mult) comm_monoid_mult
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	88	by default (simp_all add: set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	89
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	90	lemma set_plus_intro [intro]: "a \<in> C \<Longrightarrow> b \<in> D \<Longrightarrow> a + b \<in> C + D"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	91	by (auto simp add: set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	92
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	93	lemma set_plus_elim:
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	94	assumes "x \<in> A + B"
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	95	obtains a b where "x = a + b" and "a \<in> A" and "b \<in> B"
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	96	using assms unfolding set_plus_def by fast
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	97
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	98	lemma set_plus_intro2 [intro]: "b \<in> C \<Longrightarrow> a + b \<in> a +o C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	99	by (auto simp add: elt_set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	100
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	101	lemma set_plus_rearrange:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	102	"((a::'a::comm_monoid_add) +o C) + (b +o D) = (a + b) +o (C + D)"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	103	apply (auto simp add: elt_set_plus_def set_plus_def ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	104	apply (rule_tac x = "ba + bb" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	105	apply (auto simp add: ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	106	apply (rule_tac x = "aa + a" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	107	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	108	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	109
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	110	lemma set_plus_rearrange2: "(a::'a::semigroup_add) +o (b +o C) = (a + b) +o C"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 56899 diff changeset	111	by (auto simp add: elt_set_plus_def add.assoc)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	112
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	113	lemma set_plus_rearrange3: "((a::'a::semigroup_add) +o B) + C = a +o (B + C)"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	114	apply (auto simp add: elt_set_plus_def set_plus_def)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	115	apply (blast intro: ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	116	apply (rule_tac x = "a + aa" in exI)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	117	apply (rule conjI)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	118	apply (rule_tac x = "aa" in bexI)
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	119	apply auto
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	120	apply (rule_tac x = "ba" in bexI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	121	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	122	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	123
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	124	theorem set_plus_rearrange4: "C + ((a::'a::comm_monoid_add) +o D) = a +o (C + D)"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	125	apply (auto simp add: elt_set_plus_def set_plus_def ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	126	apply (rule_tac x = "aa + ba" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	127	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	128	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	129
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	130	theorems set_plus_rearranges = set_plus_rearrange set_plus_rearrange2
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	131	set_plus_rearrange3 set_plus_rearrange4
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	132
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	133	lemma set_plus_mono [intro!]: "C \<subseteq> D \<Longrightarrow> a +o C \<subseteq> a +o D"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	134	by (auto simp add: elt_set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	135
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	136	lemma set_plus_mono2 [intro]: "(C::'a::plus set) \<subseteq> D \<Longrightarrow> E \<subseteq> F \<Longrightarrow> C + E \<subseteq> D + F"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	137	by (auto simp add: set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	138
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	139	lemma set_plus_mono3 [intro]: "a \<in> C \<Longrightarrow> a +o D \<subseteq> C + D"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	140	by (auto simp add: elt_set_plus_def set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	141
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	142	lemma set_plus_mono4 [intro]: "(a::'a::comm_monoid_add) \<in> C \<Longrightarrow> a +o D \<subseteq> D + C"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	143	by (auto simp add: elt_set_plus_def set_plus_def ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	144
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	145	lemma set_plus_mono5: "a \<in> C \<Longrightarrow> B \<subseteq> D \<Longrightarrow> a +o B \<subseteq> C + D"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	146	apply (subgoal_tac "a +o B \<subseteq> a +o D")
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	147	apply (erule order_trans)
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	148	apply (erule set_plus_mono3)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	149	apply (erule set_plus_mono)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	150	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	151
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	152	lemma set_plus_mono_b: "C \<subseteq> D \<Longrightarrow> x \<in> a +o C \<Longrightarrow> x \<in> a +o D"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	153	apply (frule set_plus_mono)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	154	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	155	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	156
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	157	lemma set_plus_mono2_b: "C \<subseteq> D \<Longrightarrow> E \<subseteq> F \<Longrightarrow> x \<in> C + E \<Longrightarrow> x \<in> D + F"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	158	apply (frule set_plus_mono2)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	159	prefer 2
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	160	apply force
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	161	apply assumption
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	162	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	163
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	164	lemma set_plus_mono3_b: "a \<in> C \<Longrightarrow> x \<in> a +o D \<Longrightarrow> x \<in> C + D"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	165	apply (frule set_plus_mono3)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	166	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	167	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	168
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	169	lemma set_plus_mono4_b: "(a::'a::comm_monoid_add) : C \<Longrightarrow> x \<in> a +o D \<Longrightarrow> x \<in> D + C"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	170	apply (frule set_plus_mono4)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	171	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	172	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	173
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	174	lemma set_zero_plus [simp]: "(0::'a::comm_monoid_add) +o C = C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	175	by (auto simp add: elt_set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	176
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	177	lemma set_zero_plus2: "(0::'a::comm_monoid_add) \<in> A \<Longrightarrow> B \<subseteq> A + B"
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 40887 diff changeset	178	apply (auto simp add: set_plus_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	179	apply (rule_tac x = 0 in bexI)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	180	apply (rule_tac x = x in bexI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	181	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	182	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	183
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	184	lemma set_plus_imp_minus: "(a::'a::ab_group_add) : b +o C \<Longrightarrow> (a - b) \<in> C"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	185	by (auto simp add: elt_set_plus_def ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	186
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	187	lemma set_minus_imp_plus: "(a::'a::ab_group_add) - b : C \<Longrightarrow> a \<in> b +o C"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	188	apply (auto simp add: elt_set_plus_def ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	189	apply (subgoal_tac "a = (a + - b) + b")
54230 b1d955791529 more simplification rules on unary and binary minus haftmann parents: 53596 diff changeset	190	apply (rule bexI, assumption)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	191	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	192	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	193
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	194	lemma set_minus_plus: "(a::'a::ab_group_add) - b \<in> C \<longleftrightarrow> a \<in> b +o C"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	195	by (rule iffI, rule set_minus_imp_plus, assumption, rule set_plus_imp_minus)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	196
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	197	lemma set_times_intro [intro]: "a \<in> C \<Longrightarrow> b \<in> D \<Longrightarrow> a * b \<in> C * D"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	198	by (auto simp add: set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	199
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	200	lemma set_times_elim:
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	201	assumes "x \<in> A * B"
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	202	obtains a b where "x = a * b" and "a \<in> A" and "b \<in> B"
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	203	using assms unfolding set_times_def by fast
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	204
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	205	lemma set_times_intro2 [intro!]: "b \<in> C \<Longrightarrow> a * b \<in> a *o C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	206	by (auto simp add: elt_set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	207
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	208	lemma set_times_rearrange:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	209	"((a::'a::comm_monoid_mult) o C) (b o D) = (a b) o (C D)"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	210	apply (auto simp add: elt_set_times_def set_times_def)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	211	apply (rule_tac x = "ba * bb" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	212	apply (auto simp add: ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	213	apply (rule_tac x = "aa * a" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	214	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	215	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	216
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	217	lemma set_times_rearrange2:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	218	"(a::'a::semigroup_mult) o (b o C) = (a * b) *o C"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 56899 diff changeset	219	by (auto simp add: elt_set_times_def mult.assoc)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	220
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	221	lemma set_times_rearrange3:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	222	"((a::'a::semigroup_mult) o B) C = a o (B C)"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	223	apply (auto simp add: elt_set_times_def set_times_def)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	224	apply (blast intro: ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	225	apply (rule_tac x = "a * aa" in exI)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	226	apply (rule conjI)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	227	apply (rule_tac x = "aa" in bexI)
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	228	apply auto
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	229	apply (rule_tac x = "ba" in bexI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	230	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	231	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	232
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	233	theorem set_times_rearrange4:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	234	"C * ((a::'a::comm_monoid_mult) o D) = a o (C * D)"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	235	apply (auto simp add: elt_set_times_def set_times_def ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	236	apply (rule_tac x = "aa * ba" in exI)
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	237	apply (auto simp add: ac_simps)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	238	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	239
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	240	theorems set_times_rearranges = set_times_rearrange set_times_rearrange2
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	241	set_times_rearrange3 set_times_rearrange4
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	242
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	243	lemma set_times_mono [intro]: "C \<subseteq> D \<Longrightarrow> a o C \<subseteq> a o D"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	244	by (auto simp add: elt_set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	245
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	246	lemma set_times_mono2 [intro]: "(C::'a::times set) \<subseteq> D \<Longrightarrow> E \<subseteq> F \<Longrightarrow> C * E \<subseteq> D * F"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	247	by (auto simp add: set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	248
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	249	lemma set_times_mono3 [intro]: "a \<in> C \<Longrightarrow> a o D \<subseteq> C D"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	250	by (auto simp add: elt_set_times_def set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	251
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	252	lemma set_times_mono4 [intro]: "(a::'a::comm_monoid_mult) : C \<Longrightarrow> a o D \<subseteq> D C"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	253	by (auto simp add: elt_set_times_def set_times_def ac_simps)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	254
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	255	lemma set_times_mono5: "a \<in> C \<Longrightarrow> B \<subseteq> D \<Longrightarrow> a o B \<subseteq> C D"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	256	apply (subgoal_tac "a o B \<subseteq> a o D")
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	257	apply (erule order_trans)
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	258	apply (erule set_times_mono3)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	259	apply (erule set_times_mono)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	260	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	261
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	262	lemma set_times_mono_b: "C \<subseteq> D \<Longrightarrow> x \<in> a o C \<Longrightarrow> x \<in> a o D"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	263	apply (frule set_times_mono)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	264	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	265	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	266
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	267	lemma set_times_mono2_b: "C \<subseteq> D \<Longrightarrow> E \<subseteq> F \<Longrightarrow> x \<in> C * E \<Longrightarrow> x \<in> D * F"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	268	apply (frule set_times_mono2)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	269	prefer 2
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	270	apply force
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	271	apply assumption
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	272	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	273
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	274	lemma set_times_mono3_b: "a \<in> C \<Longrightarrow> x \<in> a o D \<Longrightarrow> x \<in> C D"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	275	apply (frule set_times_mono3)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	276	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	277	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	278
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	279	lemma set_times_mono4_b: "(a::'a::comm_monoid_mult) \<in> C \<Longrightarrow> x \<in> a o D \<Longrightarrow> x \<in> D C"
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	280	apply (frule set_times_mono4)
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	281	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	282	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	283
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	284	lemma set_one_times [simp]: "(1::'a::comm_monoid_mult) *o C = C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	285	by (auto simp add: elt_set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	286
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	287	lemma set_times_plus_distrib:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	288	"(a::'a::semiring) o (b +o C) = (a b) +o (a *o C)"
23477 f4b83f03cac9 tuned and renamed group_eq_simps and ring_eq_simps nipkow parents: 21404 diff changeset	289	by (auto simp add: elt_set_plus_def elt_set_times_def ring_distribs)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	290
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	291	lemma set_times_plus_distrib2:
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	292	"(a::'a::semiring) o (B + C) = (a o B) + (a *o C)"
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	293	apply (auto simp add: set_plus_def elt_set_times_def ring_distribs)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	294	apply blast
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	295	apply (rule_tac x = "b + bb" in exI)
23477 f4b83f03cac9 tuned and renamed group_eq_simps and ring_eq_simps nipkow parents: 21404 diff changeset	296	apply (auto simp add: ring_distribs)
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	297	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	298
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	299	lemma set_times_plus_distrib3: "((a::'a::semiring) +o C) * D \<subseteq> a o D + C D"
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 40887 diff changeset	300	apply (auto simp add:
26814 b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	301	elt_set_plus_def elt_set_times_def set_times_def
b3e8d5ec721d Replaced + and * on sets by \<oplus> and \<otimes>, to avoid clash with berghofe parents: 25764 diff changeset	302	set_plus_def ring_distribs)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	303	apply auto
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	304	done
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	305
19380 b808efaa5828 tuned syntax/abbreviations; wenzelm parents: 17161 diff changeset	306	theorems set_times_plus_distribs =
b808efaa5828 tuned syntax/abbreviations; wenzelm parents: 17161 diff changeset	307	set_times_plus_distrib
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	308	set_times_plus_distrib2
d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	309
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	310	lemma set_neg_intro: "(a::'a::ring_1) \<in> (- 1) *o C \<Longrightarrow> - a \<in> C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	311	by (auto simp add: elt_set_times_def)
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	312
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	313	lemma set_neg_intro2: "(a::'a::ring_1) \<in> C \<Longrightarrow> - a \<in> (- 1) *o C"
19736 d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	314	by (auto simp add: elt_set_times_def)
d8d0f8f51d69 tuned; wenzelm parents: 19656 diff changeset	315
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	316	lemma set_plus_image: "S + T = (\<lambda>(x, y). x + y) ` (S \<times> T)"
44890 22f665a2e91c new fastforce replacing fastsimp - less confusing name nipkow parents: 44142 diff changeset	317	unfolding set_plus_def by (fastforce simp: image_iff)
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	318
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	319	lemma set_times_image: "S * T = (\<lambda>(x, y). x * y) ` (S \<times> T)"
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	320	unfolding set_times_def by (fastforce simp: image_iff)
d29d63460d84 new lemmas huffman parents: 47446 diff changeset	321
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	322	lemma finite_set_plus: "finite s \<Longrightarrow> finite t \<Longrightarrow> finite (s + t)"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	323	unfolding set_plus_image by simp
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	324
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	325	lemma finite_set_times: "finite s \<Longrightarrow> finite t \<Longrightarrow> finite (s * t)"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	326	unfolding set_times_image by simp
53596 d29d63460d84 new lemmas huffman parents: 47446 diff changeset	327
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	328	lemma set_setsum_alt:
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	329	assumes fin: "finite I"
47444 d21c95af2df7 removed "setsum_set", now subsumed by generic setsum krauss parents: 47443 diff changeset	330	shows "setsum S I = {setsum s I \|s. \<forall>i\<in>I. s i \<in> S i}"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	331	(is "_ = ?setsum I")
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	332	using fin
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	333	proof induct
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	334	case empty
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	335	then show ?case by simp
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	336	next
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	337	case (insert x F)
47445 69e96e5500df Set_Algebras: removed syntax \<oplus> and \<otimes>, in favour of plain + and * krauss parents: 47444 diff changeset	338	have "setsum S (insert x F) = S x + ?setsum F"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	339	using insert.hyps by auto
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	340	also have "\<dots> = {s x + setsum s F \|s. \<forall> i\<in>insert x F. s i \<in> S i}"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	341	unfolding set_plus_def
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	342	proof safe
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	343	fix y s
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	344	assume "y \<in> S x" "\<forall>i\<in>F. s i \<in> S i"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	345	then show "\<exists>s'. y + setsum s F = s' x + setsum s' F \<and> (\<forall>i\<in>insert x F. s' i \<in> S i)"
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	346	using insert.hyps
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	347	by (intro exI[of _ "\<lambda>i. if i \<in> F then s i else y"]) (auto simp add: set_plus_def)
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	348	qed auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	349	finally show ?case
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	350	using insert.hyps by auto
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	351	qed
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	352
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	353	lemma setsum_set_cond_linear:
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	354	fixes f :: "'a::comm_monoid_add set \<Rightarrow> 'b::comm_monoid_add set"
47445 69e96e5500df Set_Algebras: removed syntax \<oplus> and \<otimes>, in favour of plain + and * krauss parents: 47444 diff changeset	355	assumes [intro!]: "\<And>A B. P A \<Longrightarrow> P B \<Longrightarrow> P (A + B)" "P {0}"
69e96e5500df Set_Algebras: removed syntax \<oplus> and \<otimes>, in favour of plain + and * krauss parents: 47444 diff changeset	356	and f: "\<And>A B. P A \<Longrightarrow> P B \<Longrightarrow> f (A + B) = f A + f B" "f {0} = {0}"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	357	assumes all: "\<And>i. i \<in> I \<Longrightarrow> P (S i)"
47444 d21c95af2df7 removed "setsum_set", now subsumed by generic setsum krauss parents: 47443 diff changeset	358	shows "f (setsum S I) = setsum (f \<circ> S) I"
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	359	proof (cases "finite I")
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	360	case True
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	361	from this all show ?thesis
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	362	proof induct
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	363	case empty
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	364	then show ?case by (auto intro!: f)
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	365	next
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	366	case (insert x F)
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 58881 diff changeset	367	from \<open>finite F\<close> \<open>\<And>i. i \<in> insert x F \<Longrightarrow> P (S i)\<close> have "P (setsum S F)"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	368	by induct auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	369	with insert show ?case
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	370	by (simp, subst f) auto
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	371	qed
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	372	next
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	373	case False
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	374	then show ?thesis by (auto intro!: f)
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	375	qed
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	376
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	377	lemma setsum_set_linear:
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	378	fixes f :: "'a::comm_monoid_add set \<Rightarrow> 'b::comm_monoid_add set"
47445 69e96e5500df Set_Algebras: removed syntax \<oplus> and \<otimes>, in favour of plain + and * krauss parents: 47444 diff changeset	379	assumes "\<And>A B. f(A) + f(B) = f(A + B)" "f {0} = {0}"
47444 d21c95af2df7 removed "setsum_set", now subsumed by generic setsum krauss parents: 47443 diff changeset	380	shows "f (setsum S I) = setsum (f \<circ> S) I"
40887 ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	381	using setsum_set_cond_linear[of "\<lambda>x. True" f I S] assms by auto
ee8d0548c148 Prove rel_interior_convex_hull_union (by Grechuck Bogdan). hoelzl parents: 39302 diff changeset	382
47446 ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	383	lemma set_times_Un_distrib:
ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	384	"A * (B \<union> C) = A * B \<union> A * C"
ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	385	"(A \<union> B) * C = A * C \<union> B * C"
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	386	by (auto simp: set_times_def)
47446 ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	387
ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	388	lemma set_times_UNION_distrib:
56899 9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	389	"A * UNION I M = (\<Union>i\<in>I. A * M i)"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	390	"UNION I M * A = (\<Union>i\<in>I. M i * A)"
9b9f4abaaa7e more symbols; wenzelm parents: 54230 diff changeset	391	by (auto simp: set_times_def)
47446 ed0795caec95 distributivity of * over Un and UNION krauss parents: 47445 diff changeset	392
16908 d374530bfaaa Added two new theories to HOL/Library: SetsAndFunctions.thy and BigO.thy avigad parents: diff changeset	393	end

author	wenzelm
	Mon, 06 Jul 2015 22:06:02 +0200
changeset 60678	17ba2df56dee
parent 60500	903bb1495239
child 60679	ade12ef2773c
permissions	-rw-r--r--