isabelle: src/HOL/Library/Extended_Real.thy@19f68d7671f0 (annotated)

43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1	(* Title: HOL/Library/Extended_Real.thy
41983 2dc6e382a58b standardized headers; wenzelm parents: 41980 diff changeset	2	Author: Johannes Hölzl, TU München
2dc6e382a58b standardized headers; wenzelm parents: 41980 diff changeset	3	Author: Robert Himmelmann, TU München
2dc6e382a58b standardized headers; wenzelm parents: 41980 diff changeset	4	Author: Armin Heller, TU München
2dc6e382a58b standardized headers; wenzelm parents: 41980 diff changeset	5	Author: Bogdan Grechuk, University of Edinburgh
2dc6e382a58b standardized headers; wenzelm parents: 41980 diff changeset	6	*)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	7
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	8	header {* Extended real number line *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	9
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	10	theory Extended_Real
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	11	imports Complex_Main Extended_Nat
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	12	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	13
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	14	text {*
28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	15
28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	16	For more lemmas about the extended real numbers go to
42600 604661fb94eb fixing typo bulwahn parents: 41983 diff changeset	17	@{text "src/HOL/Multivariate_Analysis/Extended_Real_Limits.thy"}
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	18
28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	19	*}
28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	20
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	21	lemma (in complete_lattice) atLeast_eq_UNIV_iff: "{x..} = UNIV \<longleftrightarrow> x = bot"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	22	proof
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	23	assume "{x..} = UNIV"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	24	show "x = bot"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	25	proof (rule ccontr)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	26	assume "x \<noteq> bot" then have "bot \<notin> {x..}" by (simp add: le_less)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	27	then show False using `{x..} = UNIV` by simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	28	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	29	qed auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	30
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	31	lemma SUPR_pair:
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	32	"(SUP i : A. SUP j : B. f i j) = (SUP p : A \<times> B. f (fst p) (snd p))"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	33	by (rule antisym) (auto intro!: SUP_least SUP_upper2)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	34
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	35	lemma INFI_pair:
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	36	"(INF i : A. INF j : B. f i j) = (INF p : A \<times> B. f (fst p) (snd p))"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	37	by (rule antisym) (auto intro!: INF_greatest INF_lower2)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	38
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	39	subsection {* Definition and basic properties *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	40
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	41	datatype ereal = ereal real \| PInfty \| MInfty
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	42
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	43	instantiation ereal :: uminus
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	44	begin
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	45	fun uminus_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	46	"- (ereal r) = ereal (- r)"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	47	\| "- PInfty = MInfty"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	48	\| "- MInfty = PInfty"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	49	instance ..
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	50	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	51
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	52	instantiation ereal :: infinity
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	53	begin
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	54	definition "(\<infinity>::ereal) = PInfty"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	55	instance ..
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	56	end
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	57
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	58	declare [[coercion "ereal :: real \<Rightarrow> ereal"]]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	59
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	60	lemma ereal_uminus_uminus[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	61	fixes a :: ereal shows "- (- a) = a"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	62	by (cases a) simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	63
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	64	lemma
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	65	shows PInfty_eq_infinity[simp]: "PInfty = \<infinity>"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	66	and MInfty_eq_minfinity[simp]: "MInfty = - \<infinity>"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	67	and MInfty_neq_PInfty[simp]: "\<infinity> \<noteq> - (\<infinity>::ereal)" "- \<infinity> \<noteq> (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	68	and MInfty_neq_ereal[simp]: "ereal r \<noteq> - \<infinity>" "- \<infinity> \<noteq> ereal r"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	69	and PInfty_neq_ereal[simp]: "ereal r \<noteq> \<infinity>" "\<infinity> \<noteq> ereal r"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	70	and PInfty_cases[simp]: "(case \<infinity> of ereal r \<Rightarrow> f r \| PInfty \<Rightarrow> y \| MInfty \<Rightarrow> z) = y"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	71	and MInfty_cases[simp]: "(case - \<infinity> of ereal r \<Rightarrow> f r \| PInfty \<Rightarrow> y \| MInfty \<Rightarrow> z) = z"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	72	by (simp_all add: infinity_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	73
43933 6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	74	declare
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	75	PInfty_eq_infinity[code_post]
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	76	MInfty_eq_minfinity[code_post]
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	77
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	78	lemma [code_unfold]:
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	79	"\<infinity> = PInfty"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	80	"-PInfty = MInfty"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	81	by simp_all
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	82
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	83	lemma inj_ereal[simp]: "inj_on ereal A"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	84	unfolding inj_on_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	85
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	86	lemma ereal_cases[case_names real PInf MInf, cases type: ereal]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	87	assumes "\<And>r. x = ereal r \<Longrightarrow> P"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	88	assumes "x = \<infinity> \<Longrightarrow> P"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	89	assumes "x = -\<infinity> \<Longrightarrow> P"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	90	shows P
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	91	using assms by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	92
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	93	lemmas ereal2_cases = ereal_cases[case_product ereal_cases]
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	94	lemmas ereal3_cases = ereal2_cases[case_product ereal_cases]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	95
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	96	lemma ereal_uminus_eq_iff[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	97	fixes a b :: ereal shows "-a = -b \<longleftrightarrow> a = b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	98	by (cases rule: ereal2_cases[of a b]) simp_all
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	99
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	100	function of_ereal :: "ereal \<Rightarrow> real" where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	101	"of_ereal (ereal r) = r" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	102	"of_ereal \<infinity> = 0" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	103	"of_ereal (-\<infinity>) = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	104	by (auto intro: ereal_cases)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	105	termination proof qed (rule wf_empty)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	106
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	107	defs (overloaded)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	108	real_of_ereal_def [code_unfold]: "real \<equiv> of_ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	109
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	110	lemma real_of_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	111	"real (- x :: ereal) = - (real x)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	112	"real (ereal r) = r"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	113	"real (\<infinity>::ereal) = 0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	114	by (cases x) (simp_all add: real_of_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	115
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	116	lemma range_ereal[simp]: "range ereal = UNIV - {\<infinity>, -\<infinity>}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	117	proof safe
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	118	fix x assume "x \<notin> range ereal" "x \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	119	then show "x = -\<infinity>" by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	120	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	121
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	122	lemma ereal_range_uminus[simp]: "range uminus = (UNIV::ereal set)"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	123	proof safe
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	124	fix x :: ereal show "x \<in> range uminus" by (intro image_eqI[of _ _ "-x"]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	125	qed auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	126
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	127	instantiation ereal :: number
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	128	begin
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	129	definition [simp]: "number_of x = ereal (number_of x)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	130	instance proof qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	131	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	132
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	133	instantiation ereal :: abs
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	134	begin
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	135	function abs_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	136	"\<bar>ereal r\<bar> = ereal \<bar>r\<bar>"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	137	\| "\<bar>-\<infinity>\<bar> = (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	138	\| "\<bar>\<infinity>\<bar> = (\<infinity>::ereal)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	139	by (auto intro: ereal_cases)
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	140	termination proof qed (rule wf_empty)
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	141	instance ..
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	142	end
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	143
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	144	lemma abs_eq_infinity_cases[elim!]: "\<lbrakk> \<bar>x :: ereal\<bar> = \<infinity> ; x = \<infinity> \<Longrightarrow> P ; x = -\<infinity> \<Longrightarrow> P \<rbrakk> \<Longrightarrow> P"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	145	by (cases x) auto
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	146
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	147	lemma abs_neq_infinity_cases[elim!]: "\<lbrakk> \<bar>x :: ereal\<bar> \<noteq> \<infinity> ; \<And>r. x = ereal r \<Longrightarrow> P \<rbrakk> \<Longrightarrow> P"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	148	by (cases x) auto
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	149
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	150	lemma abs_ereal_uminus[simp]: "\<bar>- x\<bar> = \<bar>x::ereal\<bar>"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	151	by (cases x) auto
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	152
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	153	subsubsection "Addition"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	154
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	155	instantiation ereal :: comm_monoid_add
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	156	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	157
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	158	definition "0 = ereal 0"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	159
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	160	function plus_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	161	"ereal r + ereal p = ereal (r + p)" \|
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	162	"\<infinity> + a = (\<infinity>::ereal)" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	163	"a + \<infinity> = (\<infinity>::ereal)" \|
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	164	"ereal r + -\<infinity> = - \<infinity>" \|
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	165	"-\<infinity> + ereal p = -(\<infinity>::ereal)" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	166	"-\<infinity> + -\<infinity> = -(\<infinity>::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	167	proof -
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	168	case (goal1 P x)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	169	moreover then obtain a b where "x = (a, b)" by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	170	ultimately show P
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	171	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	172	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	173	termination proof qed (rule wf_empty)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	174
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	175	lemma Infty_neq_0[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	176	"(\<infinity>::ereal) \<noteq> 0" "0 \<noteq> (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	177	"-(\<infinity>::ereal) \<noteq> 0" "0 \<noteq> -(\<infinity>::ereal)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	178	by (simp_all add: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	179
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	180	lemma ereal_eq_0[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	181	"ereal r = 0 \<longleftrightarrow> r = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	182	"0 = ereal r \<longleftrightarrow> r = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	183	unfolding zero_ereal_def by simp_all
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	184
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	185	instance
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	186	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	187	fix a :: ereal show "0 + a = a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	188	by (cases a) (simp_all add: zero_ereal_def)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	189	fix b :: ereal show "a + b = b + a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	190	by (cases rule: ereal2_cases[of a b]) simp_all
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	191	fix c :: ereal show "a + b + c = a + (b + c)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	192	by (cases rule: ereal3_cases[of a b c]) simp_all
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	193	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	194	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	195
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	196	lemma real_of_ereal_0[simp]: "real (0::ereal) = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	197	unfolding real_of_ereal_def zero_ereal_def by simp
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	198
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	199	lemma abs_ereal_zero[simp]: "\<bar>0\<bar> = (0::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	200	unfolding zero_ereal_def abs_ereal.simps by simp
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	201
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	202	lemma ereal_uminus_zero[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	203	"- 0 = (0::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	204	by (simp add: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	205
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	206	lemma ereal_uminus_zero_iff[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	207	fixes a :: ereal shows "-a = 0 \<longleftrightarrow> a = 0"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	208	by (cases a) simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	209
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	210	lemma ereal_plus_eq_PInfty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	211	fixes a b :: ereal shows "a + b = \<infinity> \<longleftrightarrow> a = \<infinity> \<or> b = \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	212	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	213
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	214	lemma ereal_plus_eq_MInfty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	215	fixes a b :: ereal shows "a + b = -\<infinity> \<longleftrightarrow>
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	216	(a = -\<infinity> \<or> b = -\<infinity>) \<and> a \<noteq> \<infinity> \<and> b \<noteq> \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	217	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	218
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	219	lemma ereal_add_cancel_left:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	220	fixes a b :: ereal assumes "a \<noteq> -\<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	221	shows "a + b = a + c \<longleftrightarrow> (a = \<infinity> \<or> b = c)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	222	using assms by (cases rule: ereal3_cases[of a b c]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	223
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	224	lemma ereal_add_cancel_right:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	225	fixes a b :: ereal assumes "a \<noteq> -\<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	226	shows "b + a = c + a \<longleftrightarrow> (a = \<infinity> \<or> b = c)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	227	using assms by (cases rule: ereal3_cases[of a b c]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	228
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	229	lemma ereal_real:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	230	"ereal (real x) = (if \<bar>x\<bar> = \<infinity> then 0 else x)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	231	by (cases x) simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	232
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	233	lemma real_of_ereal_add:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	234	fixes a b :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	235	shows "real (a + b) = (if (\<bar>a\<bar> = \<infinity>) \<and> (\<bar>b\<bar> = \<infinity>) \<or> (\<bar>a\<bar> \<noteq> \<infinity>) \<and> (\<bar>b\<bar> \<noteq> \<infinity>) then real a + real b else 0)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	236	by (cases rule: ereal2_cases[of a b]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	237
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	238	subsubsection "Linear order on @{typ ereal}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	239
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	240	instantiation ereal :: linorder
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	241	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	242
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	243	function less_ereal where
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	244	" ereal x < ereal y \<longleftrightarrow> x < y" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	245	"(\<infinity>::ereal) < a \<longleftrightarrow> False" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	246	" a < -(\<infinity>::ereal) \<longleftrightarrow> False" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	247	"ereal x < \<infinity> \<longleftrightarrow> True" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	248	" -\<infinity> < ereal r \<longleftrightarrow> True" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	249	" -\<infinity> < (\<infinity>::ereal) \<longleftrightarrow> True"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	250	proof -
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	251	case (goal1 P x)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	252	moreover then obtain a b where "x = (a,b)" by (cases x) auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	253	ultimately show P by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	254	qed simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	255	termination by (relation "{}") simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	256
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	257	definition "x \<le> (y::ereal) \<longleftrightarrow> x < y \<or> x = y"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	258
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	259	lemma ereal_infty_less[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	260	fixes x :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	261	shows "x < \<infinity> \<longleftrightarrow> (x \<noteq> \<infinity>)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	262	"-\<infinity> < x \<longleftrightarrow> (x \<noteq> -\<infinity>)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	263	by (cases x, simp_all) (cases x, simp_all)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	264
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	265	lemma ereal_infty_less_eq[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	266	fixes x :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	267	shows "\<infinity> \<le> x \<longleftrightarrow> x = \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	268	"x \<le> -\<infinity> \<longleftrightarrow> x = -\<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	269	by (auto simp add: less_eq_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	270
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	271	lemma ereal_less[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	272	"ereal r < 0 \<longleftrightarrow> (r < 0)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	273	"0 < ereal r \<longleftrightarrow> (0 < r)"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	274	"0 < (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	275	"-(\<infinity>::ereal) < 0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	276	by (simp_all add: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	277
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	278	lemma ereal_less_eq[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	279	"x \<le> (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	280	"-(\<infinity>::ereal) \<le> x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	281	"ereal r \<le> ereal p \<longleftrightarrow> r \<le> p"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	282	"ereal r \<le> 0 \<longleftrightarrow> r \<le> 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	283	"0 \<le> ereal r \<longleftrightarrow> 0 \<le> r"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	284	by (auto simp add: less_eq_ereal_def zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	285
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	286	lemma ereal_infty_less_eq2:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	287	"a \<le> b \<Longrightarrow> a = \<infinity> \<Longrightarrow> b = (\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	288	"a \<le> b \<Longrightarrow> b = -\<infinity> \<Longrightarrow> a = -(\<infinity>::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	289	by simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	290
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	291	instance
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	292	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	293	fix x :: ereal show "x \<le> x"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	294	by (cases x) simp_all
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	295	fix y :: ereal show "x < y \<longleftrightarrow> x \<le> y \<and> \<not> y \<le> x"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	296	by (cases rule: ereal2_cases[of x y]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	297	show "x \<le> y \<or> y \<le> x "
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	298	by (cases rule: ereal2_cases[of x y]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	299	{ assume "x \<le> y" "y \<le> x" then show "x = y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	300	by (cases rule: ereal2_cases[of x y]) auto }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	301	{ fix z assume "x \<le> y" "y \<le> z" then show "x \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	302	by (cases rule: ereal3_cases[of x y z]) auto }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	303	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	304	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	305
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	306	instance ereal :: ordered_ab_semigroup_add
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	307	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	308	fix a b c :: ereal assume "a \<le> b" then show "c + a \<le> c + b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	309	by (cases rule: ereal3_cases[of a b c]) auto
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	310	qed
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	311
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	312	lemma real_of_ereal_positive_mono:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	313	fixes x y :: ereal shows "\<lbrakk>0 \<le> x; x \<le> y; y \<noteq> \<infinity>\<rbrakk> \<Longrightarrow> real x \<le> real y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	314	by (cases rule: ereal2_cases[of x y]) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	315
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	316	lemma ereal_MInfty_lessI[intro, simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	317	fixes a :: ereal shows "a \<noteq> -\<infinity> \<Longrightarrow> -\<infinity> < a"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	318	by (cases a) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	319
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	320	lemma ereal_less_PInfty[intro, simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	321	fixes a :: ereal shows "a \<noteq> \<infinity> \<Longrightarrow> a < \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	322	by (cases a) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	323
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	324	lemma ereal_less_ereal_Ex:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	325	fixes a b :: ereal
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	326	shows "x < ereal r \<longleftrightarrow> x = -\<infinity> \<or> (\<exists>p. p < r \<and> x = ereal p)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	327	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	328
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	329	lemma less_PInf_Ex_of_nat: "x \<noteq> \<infinity> \<longleftrightarrow> (\<exists>n::nat. x < ereal (real n))"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	330	proof (cases x)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	331	case (real r) then show ?thesis
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	332	using reals_Archimedean2[of r] by simp
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	333	qed simp_all
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	334
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	335	lemma ereal_add_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	336	fixes a b c d :: ereal assumes "a \<le> b" "c \<le> d" shows "a + c \<le> b + d"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	337	using assms
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	338	apply (cases a)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	339	apply (cases rule: ereal3_cases[of b c d], auto)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	340	apply (cases rule: ereal3_cases[of b c d], auto)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	341	done
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	342
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	343	lemma ereal_minus_le_minus[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	344	fixes a b :: ereal shows "- a \<le> - b \<longleftrightarrow> b \<le> a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	345	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	346
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	347	lemma ereal_minus_less_minus[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	348	fixes a b :: ereal shows "- a < - b \<longleftrightarrow> b < a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	349	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	350
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	351	lemma ereal_le_real_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	352	"x \<le> real y \<longleftrightarrow> ((\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> ereal x \<le> y) \<and> (\<bar>y\<bar> = \<infinity> \<longrightarrow> x \<le> 0))"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	353	by (cases y) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	354
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	355	lemma real_le_ereal_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	356	"real y \<le> x \<longleftrightarrow> ((\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> y \<le> ereal x) \<and> (\<bar>y\<bar> = \<infinity> \<longrightarrow> 0 \<le> x))"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	357	by (cases y) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	358
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	359	lemma ereal_less_real_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	360	"x < real y \<longleftrightarrow> ((\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> ereal x < y) \<and> (\<bar>y\<bar> = \<infinity> \<longrightarrow> x < 0))"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	361	by (cases y) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	362
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	363	lemma real_less_ereal_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	364	"real y < x \<longleftrightarrow> ((\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> y < ereal x) \<and> (\<bar>y\<bar> = \<infinity> \<longrightarrow> 0 < x))"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	365	by (cases y) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	366
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	367	lemma real_of_ereal_pos:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	368	fixes x :: ereal shows "0 \<le> x \<Longrightarrow> 0 \<le> real x" by (cases x) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	369
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	370	lemmas real_of_ereal_ord_simps =
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	371	ereal_le_real_iff real_le_ereal_iff ereal_less_real_iff real_less_ereal_iff
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	372
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	373	lemma abs_ereal_ge0[simp]: "0 \<le> x \<Longrightarrow> \<bar>x :: ereal\<bar> = x"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	374	by (cases x) auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	375
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	376	lemma abs_ereal_less0[simp]: "x < 0 \<Longrightarrow> \<bar>x :: ereal\<bar> = -x"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	377	by (cases x) auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	378
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	379	lemma abs_ereal_pos[simp]: "0 \<le> \<bar>x :: ereal\<bar>"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	380	by (cases x) auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	381
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	382	lemma real_of_ereal_le_0[simp]: "real (x :: ereal) \<le> 0 \<longleftrightarrow> (x \<le> 0 \<or> x = \<infinity>)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	383	by (cases x) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	384
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	385	lemma abs_real_of_ereal[simp]: "\<bar>real (x :: ereal)\<bar> = real \<bar>x\<bar>"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	386	by (cases x) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	387
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	388	lemma zero_less_real_of_ereal:
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	389	fixes x :: ereal shows "0 < real x \<longleftrightarrow> (0 < x \<and> x \<noteq> \<infinity>)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	390	by (cases x) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	391
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	392	lemma ereal_0_le_uminus_iff[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	393	fixes a :: ereal shows "0 \<le> -a \<longleftrightarrow> a \<le> 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	394	by (cases rule: ereal2_cases[of a]) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	395
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	396	lemma ereal_uminus_le_0_iff[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	397	fixes a :: ereal shows "-a \<le> 0 \<longleftrightarrow> 0 \<le> a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	398	by (cases rule: ereal2_cases[of a]) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	399
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	400	lemma ereal_dense2: "x < y \<Longrightarrow> \<exists>z. x < ereal z \<and> ereal z < y"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	401	using lt_ex gt_ex dense by (cases x y rule: ereal2_cases) auto
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	402
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	403	lemma ereal_dense:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	404	fixes x y :: ereal assumes "x < y"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	405	shows "\<exists>z. x < z \<and> z < y"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	406	using ereal_dense2[OF `x < y`] by blast
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	407
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	408	lemma ereal_add_strict_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	409	fixes a b c d :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	410	assumes "a = b" "0 \<le> a" "a \<noteq> \<infinity>" "c < d"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	411	shows "a + c < b + d"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	412	using assms by (cases rule: ereal3_cases[case_product ereal_cases, of a b c d]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	413
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	414	lemma ereal_less_add:
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	415	fixes a b c :: ereal shows "\<bar>a\<bar> \<noteq> \<infinity> \<Longrightarrow> c < b \<Longrightarrow> a + c < a + b"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	416	by (cases rule: ereal2_cases[of b c]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	417
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	418	lemma ereal_uminus_eq_reorder: "- a = b \<longleftrightarrow> a = (-b::ereal)" by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	419
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	420	lemma ereal_uminus_less_reorder: "- a < b \<longleftrightarrow> -b < (a::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	421	by (subst (3) ereal_uminus_uminus[symmetric]) (simp only: ereal_minus_less_minus)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	422
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	423	lemma ereal_uminus_le_reorder: "- a \<le> b \<longleftrightarrow> -b \<le> (a::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	424	by (subst (3) ereal_uminus_uminus[symmetric]) (simp only: ereal_minus_le_minus)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	425
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	426	lemmas ereal_uminus_reorder =
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	427	ereal_uminus_eq_reorder ereal_uminus_less_reorder ereal_uminus_le_reorder
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	428
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	429	lemma ereal_bot:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	430	fixes x :: ereal assumes "\<And>B. x \<le> ereal B" shows "x = - \<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	431	proof (cases x)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	432	case (real r) with assms[of "r - 1"] show ?thesis by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	433	next case PInf with assms[of 0] show ?thesis by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	434	next case MInf then show ?thesis by simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	435	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	436
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	437	lemma ereal_top:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	438	fixes x :: ereal assumes "\<And>B. x \<ge> ereal B" shows "x = \<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	439	proof (cases x)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	440	case (real r) with assms[of "r + 1"] show ?thesis by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	441	next case MInf with assms[of 0] show ?thesis by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	442	next case PInf then show ?thesis by simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	443	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	444
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	445	lemma
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	446	shows ereal_max[simp]: "ereal (max x y) = max (ereal x) (ereal y)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	447	and ereal_min[simp]: "ereal (min x y) = min (ereal x) (ereal y)"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	448	by (simp_all add: min_def max_def)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	449
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	450	lemma ereal_max_0: "max 0 (ereal r) = ereal (max 0 r)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	451	by (auto simp: zero_ereal_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	452
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	453	lemma
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	454	fixes f :: "nat \<Rightarrow> ereal"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	455	shows incseq_uminus[simp]: "incseq (\<lambda>x. - f x) \<longleftrightarrow> decseq f"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	456	and decseq_uminus[simp]: "decseq (\<lambda>x. - f x) \<longleftrightarrow> incseq f"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	457	unfolding decseq_def incseq_def by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	458
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	459	lemma incseq_ereal: "incseq f \<Longrightarrow> incseq (\<lambda>x. ereal (f x))"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	460	unfolding incseq_def by auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	461
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	462	lemma ereal_add_nonneg_nonneg:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	463	fixes a b :: ereal shows "0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> 0 \<le> a + b"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	464	using add_mono[of 0 a 0 b] by simp
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	465
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	466	lemma image_eqD: "f ` A = B \<Longrightarrow> (\<forall>x\<in>A. f x \<in> B)"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	467	by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	468
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	469	lemma incseq_setsumI:
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	470	fixes f :: "nat \<Rightarrow> 'a::{comm_monoid_add, ordered_ab_semigroup_add}"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	471	assumes "\<And>i. 0 \<le> f i"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	472	shows "incseq (\<lambda>i. setsum f {..< i})"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	473	proof (intro incseq_SucI)
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	474	fix n have "setsum f {..< n} + 0 \<le> setsum f {..<n} + f n"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	475	using assms by (rule add_left_mono)
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	476	then show "setsum f {..< n} \<le> setsum f {..< Suc n}"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	477	by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	478	qed
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	479
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	480	lemma incseq_setsumI2:
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	481	fixes f :: "'i \<Rightarrow> nat \<Rightarrow> 'a::{comm_monoid_add, ordered_ab_semigroup_add}"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	482	assumes "\<And>n. n \<in> A \<Longrightarrow> incseq (f n)"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	483	shows "incseq (\<lambda>i. \<Sum>n\<in>A. f n i)"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	484	using assms unfolding incseq_def by (auto intro: setsum_mono)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	485
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	486	subsubsection "Multiplication"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	487
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	488	instantiation ereal :: "{comm_monoid_mult, sgn}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	489	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	490
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	491	definition "1 = ereal 1"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	492
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	493	function sgn_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	494	"sgn (ereal r) = ereal (sgn r)"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	495	\| "sgn (\<infinity>::ereal) = 1"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	496	\| "sgn (-\<infinity>::ereal) = -1"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	497	by (auto intro: ereal_cases)
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	498	termination proof qed (rule wf_empty)
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	499
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	500	function times_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	501	"ereal r * ereal p = ereal (r * p)" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	502	"ereal r * \<infinity> = (if r = 0 then 0 else if r > 0 then \<infinity> else -\<infinity>)" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	503	"\<infinity> * ereal r = (if r = 0 then 0 else if r > 0 then \<infinity> else -\<infinity>)" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	504	"ereal r * -\<infinity> = (if r = 0 then 0 else if r > 0 then -\<infinity> else \<infinity>)" \|
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	505	"-\<infinity> * ereal r = (if r = 0 then 0 else if r > 0 then -\<infinity> else \<infinity>)" \|
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	506	"(\<infinity>::ereal) * \<infinity> = \<infinity>" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	507	"-(\<infinity>::ereal) * \<infinity> = -\<infinity>" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	508	"(\<infinity>::ereal) * -\<infinity> = -\<infinity>" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	509	"-(\<infinity>::ereal) * -\<infinity> = \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	510	proof -
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	511	case (goal1 P x)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	512	moreover then obtain a b where "x = (a, b)" by (cases x) auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	513	ultimately show P by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	514	qed simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	515	termination by (relation "{}") simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	516
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	517	instance
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	518	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	519	fix a :: ereal show "1 * a = a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	520	by (cases a) (simp_all add: one_ereal_def)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	521	fix b :: ereal show "a * b = b * a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	522	by (cases rule: ereal2_cases[of a b]) simp_all
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	523	fix c :: ereal show "a * b * c = a * (b * c)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	524	by (cases rule: ereal3_cases[of a b c])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	525	(simp_all add: zero_ereal_def zero_less_mult_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	526	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	527	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	528
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	529	lemma real_of_ereal_le_1:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	530	fixes a :: ereal shows "a \<le> 1 \<Longrightarrow> real a \<le> 1"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	531	by (cases a) (auto simp: one_ereal_def)
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	532
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	533	lemma abs_ereal_one[simp]: "\<bar>1\<bar> = (1::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	534	unfolding one_ereal_def by simp
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	535
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	536	lemma ereal_mult_zero[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	537	fixes a :: ereal shows "a * 0 = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	538	by (cases a) (simp_all add: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	539
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	540	lemma ereal_zero_mult[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	541	fixes a :: ereal shows "0 * a = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	542	by (cases a) (simp_all add: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	543
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	544	lemma ereal_m1_less_0[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	545	"-(1::ereal) < 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	546	by (simp add: zero_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	547
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	548	lemma ereal_zero_m1[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	549	"1 \<noteq> (0::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	550	by (simp add: zero_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	551
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	552	lemma ereal_times_0[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	553	fixes x :: ereal shows "0 * x = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	554	by (cases x) (auto simp: zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	555
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	556	lemma ereal_times[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	557	"1 \<noteq> (\<infinity>::ereal)" "(\<infinity>::ereal) \<noteq> 1"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	558	"1 \<noteq> -(\<infinity>::ereal)" "-(\<infinity>::ereal) \<noteq> 1"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	559	by (auto simp add: times_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	560
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	561	lemma ereal_plus_1[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	562	"1 + ereal r = ereal (r + 1)" "ereal r + 1 = ereal (r + 1)"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	563	"1 + -(\<infinity>::ereal) = -\<infinity>" "-(\<infinity>::ereal) + 1 = -\<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	564	unfolding one_ereal_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	565
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	566	lemma ereal_zero_times[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	567	fixes a b :: ereal shows "a * b = 0 \<longleftrightarrow> a = 0 \<or> b = 0"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	568	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	569
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	570	lemma ereal_mult_eq_PInfty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	571	shows "a * b = (\<infinity>::ereal) \<longleftrightarrow>
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	572	(a = \<infinity> \<and> b > 0) \<or> (a > 0 \<and> b = \<infinity>) \<or> (a = -\<infinity> \<and> b < 0) \<or> (a < 0 \<and> b = -\<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	573	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	574
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	575	lemma ereal_mult_eq_MInfty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	576	shows "a * b = -(\<infinity>::ereal) \<longleftrightarrow>
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	577	(a = \<infinity> \<and> b < 0) \<or> (a < 0 \<and> b = \<infinity>) \<or> (a = -\<infinity> \<and> b > 0) \<or> (a > 0 \<and> b = -\<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	578	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	579
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	580	lemma ereal_0_less_1[simp]: "0 < (1::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	581	by (simp_all add: zero_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	582
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	583	lemma ereal_zero_one[simp]: "0 \<noteq> (1::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	584	by (simp_all add: zero_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	585
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	586	lemma ereal_mult_minus_left[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	587	fixes a b :: ereal shows "-a * b = - (a * b)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	588	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	589
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	590	lemma ereal_mult_minus_right[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	591	fixes a b :: ereal shows "a * -b = - (a * b)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	592	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	593
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	594	lemma ereal_mult_infty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	595	"a * (\<infinity>::ereal) = (if a = 0 then 0 else if 0 < a then \<infinity> else - \<infinity>)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	596	by (cases a) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	597
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	598	lemma ereal_infty_mult[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	599	"(\<infinity>::ereal) * a = (if a = 0 then 0 else if 0 < a then \<infinity> else - \<infinity>)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	600	by (cases a) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	601
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	602	lemma ereal_mult_strict_right_mono:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	603	assumes "a < b" and "0 < c" "c < (\<infinity>::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	604	shows "a * c < b * c"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	605	using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	606	by (cases rule: ereal3_cases[of a b c])
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 43943 diff changeset	607	(auto simp: zero_le_mult_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	608
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	609	lemma ereal_mult_strict_left_mono:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	610	"\<lbrakk> a < b ; 0 < c ; c < (\<infinity>::ereal)\<rbrakk> \<Longrightarrow> c * a < c * b"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	611	using ereal_mult_strict_right_mono by (simp add: mult_commute[of c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	612
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	613	lemma ereal_mult_right_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	614	fixes a b c :: ereal shows "\<lbrakk>a \<le> b; 0 \<le> c\<rbrakk> \<Longrightarrow> ac \<le> bc"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	615	using assms
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	616	apply (cases "c = 0") apply simp
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	617	by (cases rule: ereal3_cases[of a b c])
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 43943 diff changeset	618	(auto simp: zero_le_mult_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	619
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	620	lemma ereal_mult_left_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	621	fixes a b c :: ereal shows "\<lbrakk>a \<le> b; 0 \<le> c\<rbrakk> \<Longrightarrow> c * a \<le> c * b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	622	using ereal_mult_right_mono by (simp add: mult_commute[of c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	623
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	624	lemma zero_less_one_ereal[simp]: "0 \<le> (1::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	625	by (simp add: one_ereal_def zero_ereal_def)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	626
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	627	lemma ereal_0_le_mult[simp]: "0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> 0 \<le> a * (b :: ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	628	by (cases rule: ereal2_cases[of a b]) (auto simp: mult_nonneg_nonneg)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	629
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	630	lemma ereal_right_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	631	fixes r a b :: ereal shows "0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> r * (a + b) = r * a + r * b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	632	by (cases rule: ereal3_cases[of r a b]) (simp_all add: field_simps)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	633
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	634	lemma ereal_left_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	635	fixes r a b :: ereal shows "0 \<le> a \<Longrightarrow> 0 \<le> b \<Longrightarrow> (a + b) * r = a * r + b * r"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	636	by (cases rule: ereal3_cases[of r a b]) (simp_all add: field_simps)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	637
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	638	lemma ereal_mult_le_0_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	639	fixes a b :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	640	shows "a * b \<le> 0 \<longleftrightarrow> (0 \<le> a \<and> b \<le> 0) \<or> (a \<le> 0 \<and> 0 \<le> b)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	641	by (cases rule: ereal2_cases[of a b]) (simp_all add: mult_le_0_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	642
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	643	lemma ereal_zero_le_0_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	644	fixes a b :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	645	shows "0 \<le> a * b \<longleftrightarrow> (0 \<le> a \<and> 0 \<le> b) \<or> (a \<le> 0 \<and> b \<le> 0)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	646	by (cases rule: ereal2_cases[of a b]) (simp_all add: zero_le_mult_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	647
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	648	lemma ereal_mult_less_0_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	649	fixes a b :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	650	shows "a * b < 0 \<longleftrightarrow> (0 < a \<and> b < 0) \<or> (a < 0 \<and> 0 < b)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	651	by (cases rule: ereal2_cases[of a b]) (simp_all add: mult_less_0_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	652
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	653	lemma ereal_zero_less_0_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	654	fixes a b :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	655	shows "0 < a * b \<longleftrightarrow> (0 < a \<and> 0 < b) \<or> (a < 0 \<and> b < 0)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	656	by (cases rule: ereal2_cases[of a b]) (simp_all add: zero_less_mult_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	657
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	658	lemma ereal_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	659	fixes a b c :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	660	assumes "a \<noteq> \<infinity> \<or> b \<noteq> -\<infinity>" "a \<noteq> -\<infinity> \<or> b \<noteq> \<infinity>" "\<bar>c\<bar> \<noteq> \<infinity>"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	661	shows "(a + b) * c = a * c + b * c"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	662	using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	663	by (cases rule: ereal3_cases[of a b c]) (simp_all add: field_simps)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	664
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	665	lemma ereal_le_epsilon:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	666	fixes x y :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	667	assumes "ALL e. 0 < e --> x <= y + e"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	668	shows "x <= y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	669	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	670	{ assume a: "EX r. y = ereal r"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	671	from this obtain r where r_def: "y = ereal r" by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	672	{ assume "x=(-\<infinity>)" hence ?thesis by auto }
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	673	moreover
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	674	{ assume "~(x=(-\<infinity>))"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	675	from this obtain p where p_def: "x = ereal p"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	676	using a assms[rule_format, of 1] by (cases x) auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	677	{ fix e have "0 < e --> p <= r + e"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	678	using assms[rule_format, of "ereal e"] p_def r_def by auto }
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	679	hence "p <= r" apply (subst field_le_epsilon) by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	680	hence ?thesis using r_def p_def by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	681	} ultimately have ?thesis by blast
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	682	}
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	683	moreover
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	684	{ assume "y=(-\<infinity>) \| y=\<infinity>" hence ?thesis
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	685	using assms[rule_format, of 1] by (cases x) auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	686	} ultimately show ?thesis by (cases y) auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	687	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	688
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	689
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	690	lemma ereal_le_epsilon2:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	691	fixes x y :: ereal
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	692	assumes "ALL e. 0 < e --> x <= y + ereal e"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	693	shows "x <= y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	694	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	695	{ fix e :: ereal assume "e>0"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	696	{ assume "e=\<infinity>" hence "x<=y+e" by auto }
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	697	moreover
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	698	{ assume "e~=\<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	699	from this obtain r where "e = ereal r" using `e>0` apply (cases e) by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	700	hence "x<=y+e" using assms[rule_format, of r] `e>0` by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	701	} ultimately have "x<=y+e" by blast
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	702	} from this show ?thesis using ereal_le_epsilon by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	703	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	704
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	705	lemma ereal_le_real:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	706	fixes x y :: ereal
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	707	assumes "ALL z. x <= ereal z --> y <= ereal z"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	708	shows "y <= x"
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 43943 diff changeset	709	by (metis assms ereal_bot ereal_cases ereal_infty_less_eq(2) ereal_less_eq(1) linorder_le_cases)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	710
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	711	lemma ereal_le_ereal:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	712	fixes x y :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	713	assumes "\<And>B. B < x \<Longrightarrow> B <= y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	714	shows "x <= y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	715	by (metis assms ereal_dense leD linorder_le_less_linear)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	716
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	717	lemma ereal_ge_ereal:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	718	fixes x y :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	719	assumes "ALL B. B>x --> B >= y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	720	shows "x >= y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	721	by (metis assms ereal_dense leD linorder_le_less_linear)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	722
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	723	lemma setprod_ereal_0:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	724	fixes f :: "'a \<Rightarrow> ereal"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	725	shows "(\<Prod>i\<in>A. f i) = 0 \<longleftrightarrow> (finite A \<and> (\<exists>i\<in>A. f i = 0))"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	726	proof cases
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	727	assume "finite A"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	728	then show ?thesis by (induct A) auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	729	qed auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	730
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	731	lemma setprod_ereal_pos:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	732	fixes f :: "'a \<Rightarrow> ereal" assumes pos: "\<And>i. i \<in> I \<Longrightarrow> 0 \<le> f i" shows "0 \<le> (\<Prod>i\<in>I. f i)"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	733	proof cases
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	734	assume "finite I" from this pos show ?thesis by induct auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	735	qed simp
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	736
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	737	lemma setprod_PInf:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	738	fixes f :: "'a \<Rightarrow> ereal"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	739	assumes "\<And>i. i \<in> I \<Longrightarrow> 0 \<le> f i"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	740	shows "(\<Prod>i\<in>I. f i) = \<infinity> \<longleftrightarrow> finite I \<and> (\<exists>i\<in>I. f i = \<infinity>) \<and> (\<forall>i\<in>I. f i \<noteq> 0)"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	741	proof cases
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	742	assume "finite I" from this assms show ?thesis
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	743	proof (induct I)
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	744	case (insert i I)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	745	then have pos: "0 \<le> f i" "0 \<le> setprod f I" by (auto intro!: setprod_ereal_pos)
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	746	from insert have "(\<Prod>j\<in>insert i I. f j) = \<infinity> \<longleftrightarrow> setprod f I * f i = \<infinity>" by auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	747	also have "\<dots> \<longleftrightarrow> (setprod f I = \<infinity> \<or> f i = \<infinity>) \<and> f i \<noteq> 0 \<and> setprod f I \<noteq> 0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	748	using setprod_ereal_pos[of I f] pos
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	749	by (cases rule: ereal2_cases[of "f i" "setprod f I"]) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	750	also have "\<dots> \<longleftrightarrow> finite (insert i I) \<and> (\<exists>j\<in>insert i I. f j = \<infinity>) \<and> (\<forall>j\<in>insert i I. f j \<noteq> 0)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	751	using insert by (auto simp: setprod_ereal_0)
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	752	finally show ?case .
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	753	qed simp
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	754	qed simp
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	755
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	756	lemma setprod_ereal: "(\<Prod>i\<in>A. ereal (f i)) = ereal (setprod f A)"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	757	proof cases
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	758	assume "finite A" then show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	759	by induct (auto simp: one_ereal_def)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	760	qed (simp add: one_ereal_def)
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	761
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	762	subsubsection {* Power *}
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	763
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	764	lemma ereal_power[simp]: "(ereal x) ^ n = ereal (x^n)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	765	by (induct n) (auto simp: one_ereal_def)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	766
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	767	lemma ereal_power_PInf[simp]: "(\<infinity>::ereal) ^ n = (if n = 0 then 1 else \<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	768	by (induct n) (auto simp: one_ereal_def)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	769
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	770	lemma ereal_power_uminus[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	771	fixes x :: ereal
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	772	shows "(- x) ^ n = (if even n then x ^ n else - (x^n))"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	773	by (induct n) (auto simp: one_ereal_def)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	774
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	775	lemma ereal_power_number_of[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	776	"(number_of num :: ereal) ^ n = ereal (number_of num ^ n)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	777	by (induct n) (auto simp: one_ereal_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	778
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	779	lemma zero_le_power_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	780	fixes a :: ereal assumes "0 \<le> a"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	781	shows "0 \<le> a ^ n"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	782	using assms by (induct n) (auto simp: ereal_zero_le_0_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	783
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	784	subsubsection {* Subtraction *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	785
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	786	lemma ereal_minus_minus_image[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	787	fixes S :: "ereal set"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	788	shows "uminus ` uminus ` S = S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	789	by (auto simp: image_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	790
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	791	lemma ereal_uminus_lessThan[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	792	fixes a :: ereal shows "uminus ` {..<a} = {-a<..}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	793	proof (safe intro!: image_eqI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	794	fix x assume "-a < x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	795	then have "- x < - (- a)" by (simp del: ereal_uminus_uminus)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	796	then show "- x < a" by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	797	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	798
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	799	lemma ereal_uminus_greaterThan[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	800	"uminus ` {(a::ereal)<..} = {..<-a}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	801	by (metis ereal_uminus_lessThan ereal_uminus_uminus
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	802	ereal_minus_minus_image)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	803
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	804	instantiation ereal :: minus
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	805	begin
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	806	definition "x - y = x + -(y::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	807	instance ..
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	808	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	809
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	810	lemma ereal_minus[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	811	"ereal r - ereal p = ereal (r - p)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	812	"-\<infinity> - ereal r = -\<infinity>"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	813	"ereal r - \<infinity> = -\<infinity>"
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	814	"(\<infinity>::ereal) - x = \<infinity>"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	815	"-(\<infinity>::ereal) - \<infinity> = -\<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	816	"x - -y = x + y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	817	"x - 0 = x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	818	"0 - x = -x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	819	by (simp_all add: minus_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	820
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	821	lemma ereal_x_minus_x[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	822	"x - x = (if \<bar>x\<bar> = \<infinity> then \<infinity> else 0::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	823	by (cases x) simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	824
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	825	lemma ereal_eq_minus_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	826	fixes x y z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	827	shows "x = z - y \<longleftrightarrow>
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	828	(\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> x + y = z) \<and>
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	829	(y = -\<infinity> \<longrightarrow> x = \<infinity>) \<and>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	830	(y = \<infinity> \<longrightarrow> z = \<infinity> \<longrightarrow> x = \<infinity>) \<and>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	831	(y = \<infinity> \<longrightarrow> z \<noteq> \<infinity> \<longrightarrow> x = -\<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	832	by (cases rule: ereal3_cases[of x y z]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	833
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	834	lemma ereal_eq_minus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	835	fixes x y z :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	836	shows "\<bar>y\<bar> \<noteq> \<infinity> \<Longrightarrow> x = z - y \<longleftrightarrow> x + y = z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	837	by (auto simp: ereal_eq_minus_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	838
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	839	lemma ereal_less_minus_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	840	fixes x y z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	841	shows "x < z - y \<longleftrightarrow>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	842	(y = \<infinity> \<longrightarrow> z = \<infinity> \<and> x \<noteq> \<infinity>) \<and>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	843	(y = -\<infinity> \<longrightarrow> x \<noteq> \<infinity>) \<and>
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	844	(\<bar>y\<bar> \<noteq> \<infinity>\<longrightarrow> x + y < z)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	845	by (cases rule: ereal3_cases[of x y z]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	846
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	847	lemma ereal_less_minus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	848	fixes x y z :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	849	shows "\<bar>y\<bar> \<noteq> \<infinity> \<Longrightarrow> x < z - y \<longleftrightarrow> x + y < z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	850	by (auto simp: ereal_less_minus_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	851
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	852	lemma ereal_le_minus_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	853	fixes x y z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	854	shows "x \<le> z - y \<longleftrightarrow>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	855	(y = \<infinity> \<longrightarrow> z \<noteq> \<infinity> \<longrightarrow> x = -\<infinity>) \<and>
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	856	(\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> x + y \<le> z)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	857	by (cases rule: ereal3_cases[of x y z]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	858
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	859	lemma ereal_le_minus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	860	fixes x y z :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	861	shows "\<bar>y\<bar> \<noteq> \<infinity> \<Longrightarrow> x \<le> z - y \<longleftrightarrow> x + y \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	862	by (auto simp: ereal_le_minus_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	863
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	864	lemma ereal_minus_less_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	865	fixes x y z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	866	shows "x - y < z \<longleftrightarrow>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	867	y \<noteq> -\<infinity> \<and> (y = \<infinity> \<longrightarrow> x \<noteq> \<infinity> \<and> z \<noteq> -\<infinity>) \<and>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	868	(y \<noteq> \<infinity> \<longrightarrow> x < z + y)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	869	by (cases rule: ereal3_cases[of x y z]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	870
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	871	lemma ereal_minus_less:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	872	fixes x y z :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	873	shows "\<bar>y\<bar> \<noteq> \<infinity> \<Longrightarrow> x - y < z \<longleftrightarrow> x < z + y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	874	by (auto simp: ereal_minus_less_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	875
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	876	lemma ereal_minus_le_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	877	fixes x y z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	878	shows "x - y \<le> z \<longleftrightarrow>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	879	(y = -\<infinity> \<longrightarrow> z = \<infinity>) \<and>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	880	(y = \<infinity> \<longrightarrow> x = \<infinity> \<longrightarrow> z = \<infinity>) \<and>
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	881	(\<bar>y\<bar> \<noteq> \<infinity> \<longrightarrow> x \<le> z + y)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	882	by (cases rule: ereal3_cases[of x y z]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	883
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	884	lemma ereal_minus_le:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	885	fixes x y z :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	886	shows "\<bar>y\<bar> \<noteq> \<infinity> \<Longrightarrow> x - y \<le> z \<longleftrightarrow> x \<le> z + y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	887	by (auto simp: ereal_minus_le_iff)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	888
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	889	lemma ereal_minus_eq_minus_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	890	fixes a b c :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	891	shows "a - b = a - c \<longleftrightarrow>
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	892	b = c \<or> a = \<infinity> \<or> (a = -\<infinity> \<and> b \<noteq> -\<infinity> \<and> c \<noteq> -\<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	893	by (cases rule: ereal3_cases[of a b c]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	894
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	895	lemma ereal_add_le_add_iff:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	896	fixes a b c :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	897	shows "c + a \<le> c + b \<longleftrightarrow>
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	898	a \<le> b \<or> c = \<infinity> \<or> (c = -\<infinity> \<and> a \<noteq> \<infinity> \<and> b \<noteq> \<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	899	by (cases rule: ereal3_cases[of a b c]) (simp_all add: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	900
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	901	lemma ereal_mult_le_mult_iff:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	902	fixes a b c :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	903	shows "\<bar>c\<bar> \<noteq> \<infinity> \<Longrightarrow> c * a \<le> c * b \<longleftrightarrow> (0 < c \<longrightarrow> a \<le> b) \<and> (c < 0 \<longrightarrow> b \<le> a)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	904	by (cases rule: ereal3_cases[of a b c]) (simp_all add: mult_le_cancel_left)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	905
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	906	lemma ereal_minus_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	907	fixes A B C D :: ereal assumes "A \<le> B" "D \<le> C"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	908	shows "A - C \<le> B - D"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	909	using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	910	by (cases rule: ereal3_cases[case_product ereal_cases, of A B C D]) simp_all
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	911
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	912	lemma real_of_ereal_minus:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	913	fixes a b :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	914	shows "real (a - b) = (if \<bar>a\<bar> = \<infinity> \<or> \<bar>b\<bar> = \<infinity> then 0 else real a - real b)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	915	by (cases rule: ereal2_cases[of a b]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	916
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	917	lemma ereal_diff_positive:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	918	fixes a b :: ereal shows "a \<le> b \<Longrightarrow> 0 \<le> b - a"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	919	by (cases rule: ereal2_cases[of a b]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	920
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	921	lemma ereal_between:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	922	fixes x e :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	923	assumes "\<bar>x\<bar> \<noteq> \<infinity>" "0 < e"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	924	shows "x - e < x" "x < x + e"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	925	using assms apply (cases x, cases e) apply auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	926	using assms by (cases x, cases e) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	927
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	928	subsubsection {* Division *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	929
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	930	instantiation ereal :: inverse
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	931	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	932
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	933	function inverse_ereal where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	934	"inverse (ereal r) = (if r = 0 then \<infinity> else ereal (inverse r))" \|
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	935	"inverse (\<infinity>::ereal) = 0" \|
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	936	"inverse (-\<infinity>::ereal) = 0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	937	by (auto intro: ereal_cases)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	938	termination by (relation "{}") simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	939
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	940	definition "x / y = x * inverse (y :: ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	941
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	942	instance proof qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	943	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	944
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	945	lemma real_of_ereal_inverse[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	946	fixes a :: ereal
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	947	shows "real (inverse a) = 1 / real a"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	948	by (cases a) (auto simp: inverse_eq_divide)
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	949
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	950	lemma ereal_inverse[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	951	"inverse (0::ereal) = \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	952	"inverse (1::ereal) = 1"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	953	by (simp_all add: one_ereal_def zero_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	954
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	955	lemma ereal_divide[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	956	"ereal r / ereal p = (if p = 0 then ereal r * \<infinity> else ereal (r / p))"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	957	unfolding divide_ereal_def by (auto simp: divide_real_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	958
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	959	lemma ereal_divide_same[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	960	fixes x :: ereal shows "x / x = (if \<bar>x\<bar> = \<infinity> \<or> x = 0 then 0 else 1)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	961	by (cases x)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	962	(simp_all add: divide_real_def divide_ereal_def one_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	963
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	964	lemma ereal_inv_inv[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	965	fixes x :: ereal shows "inverse (inverse x) = (if x \<noteq> -\<infinity> then x else \<infinity>)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	966	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	967
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	968	lemma ereal_inverse_minus[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	969	fixes x :: ereal shows "inverse (- x) = (if x = 0 then \<infinity> else -inverse x)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	970	by (cases x) simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	971
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	972	lemma ereal_uminus_divide[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	973	fixes x y :: ereal shows "- x / y = - (x / y)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	974	unfolding divide_ereal_def by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	975
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	976	lemma ereal_divide_Infty[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	977	fixes x :: ereal shows "x / \<infinity> = 0" "x / -\<infinity> = 0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	978	unfolding divide_ereal_def by simp_all
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	979
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	980	lemma ereal_divide_one[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	981	"x / 1 = (x::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	982	unfolding divide_ereal_def by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	983
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	984	lemma ereal_divide_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	985	"\<infinity> / ereal r = (if 0 \<le> r then \<infinity> else -\<infinity>)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	986	unfolding divide_ereal_def by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	987
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	988	lemma zero_le_divide_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	989	fixes a :: ereal assumes "0 \<le> a" "0 \<le> b"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	990	shows "0 \<le> a / b"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	991	using assms by (cases rule: ereal2_cases[of a b]) (auto simp: zero_le_divide_iff)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	992
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	993	lemma ereal_le_divide_pos:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	994	fixes x y z :: ereal shows "x > 0 \<Longrightarrow> x \<noteq> \<infinity> \<Longrightarrow> y \<le> z / x \<longleftrightarrow> x * y \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	995	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	996
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	997	lemma ereal_divide_le_pos:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	998	fixes x y z :: ereal shows "x > 0 \<Longrightarrow> x \<noteq> \<infinity> \<Longrightarrow> z / x \<le> y \<longleftrightarrow> z \<le> x * y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	999	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1000
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1001	lemma ereal_le_divide_neg:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1002	fixes x y z :: ereal shows "x < 0 \<Longrightarrow> x \<noteq> -\<infinity> \<Longrightarrow> y \<le> z / x \<longleftrightarrow> z \<le> x * y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1003	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1004
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1005	lemma ereal_divide_le_neg:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1006	fixes x y z :: ereal shows "x < 0 \<Longrightarrow> x \<noteq> -\<infinity> \<Longrightarrow> z / x \<le> y \<longleftrightarrow> x * y \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1007	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1008
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1009	lemma ereal_inverse_antimono_strict:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1010	fixes x y :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1011	shows "0 \<le> x \<Longrightarrow> x < y \<Longrightarrow> inverse y < inverse x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1012	by (cases rule: ereal2_cases[of x y]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1013
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1014	lemma ereal_inverse_antimono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1015	fixes x y :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1016	shows "0 \<le> x \<Longrightarrow> x <= y \<Longrightarrow> inverse y <= inverse x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1017	by (cases rule: ereal2_cases[of x y]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1018
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1019	lemma inverse_inverse_Pinfty_iff[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1020	fixes x :: ereal shows "inverse x = \<infinity> \<longleftrightarrow> x = 0"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1021	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1022
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1023	lemma ereal_inverse_eq_0:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1024	fixes x :: ereal shows "inverse x = 0 \<longleftrightarrow> x = \<infinity> \<or> x = -\<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1025	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1026
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1027	lemma ereal_0_gt_inverse:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1028	fixes x :: ereal shows "0 < inverse x \<longleftrightarrow> x \<noteq> \<infinity> \<and> 0 \<le> x"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1029	by (cases x) auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1030
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1031	lemma ereal_mult_less_right:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1032	fixes a b c :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1033	assumes "b * a < c * a" "0 < a" "a < \<infinity>"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1034	shows "b < c"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1035	using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1036	by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1037	(auto split: split_if_asm simp: zero_less_mult_iff zero_le_mult_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1038
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1039	lemma ereal_power_divide:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1040	fixes x y :: ereal shows "y \<noteq> 0 \<Longrightarrow> (x / y) ^ n = x^n / y^n"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1041	by (cases rule: ereal2_cases[of x y])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1042	(auto simp: one_ereal_def zero_ereal_def power_divide not_le
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1043	power_less_zero_eq zero_le_power_iff)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1044
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1045	lemma ereal_le_mult_one_interval:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1046	fixes x y :: ereal
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1047	assumes y: "y \<noteq> -\<infinity>"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1048	assumes z: "\<And>z. \<lbrakk> 0 < z ; z < 1 \<rbrakk> \<Longrightarrow> z * x \<le> y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1049	shows "x \<le> y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1050	proof (cases x)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1051	case PInf with z[of "1 / 2"] show "x \<le> y" by (simp add: one_ereal_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1052	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1053	case (real r) note r = this
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1054	show "x \<le> y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1055	proof (cases y)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1056	case (real p) note p = this
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1057	have "r \<le> p"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1058	proof (rule field_le_mult_one_interval)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1059	fix z :: real assume "0 < z" and "z < 1"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1060	with z[of "ereal z"]
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1061	show "z * r \<le> p" using p r by (auto simp: zero_le_mult_iff one_ereal_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1062	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1063	then show "x \<le> y" using p r by simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1064	qed (insert y, simp_all)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1065	qed simp
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1066
45934 9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1067	lemma ereal_divide_right_mono[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1068	fixes x y z :: ereal
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1069	assumes "x \<le> y" "0 < z" shows "x / z \<le> y / z"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1070	using assms by (cases x y z rule: ereal3_cases) (auto intro: divide_right_mono)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1071
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1072	lemma ereal_divide_left_mono[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1073	fixes x y z :: ereal
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1074	assumes "y \<le> x" "0 < z" "0 < x * y"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1075	shows "z / x \<le> z / y"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1076	using assms by (cases x y z rule: ereal3_cases)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1077	(auto intro: divide_left_mono simp: field_simps sign_simps split: split_if_asm)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1078
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1079	lemma ereal_divide_zero_left[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1080	fixes a :: ereal
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1081	shows "0 / a = 0"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1082	by (cases a) (auto simp: zero_ereal_def)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1083
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1084	lemma ereal_times_divide_eq_left[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1085	fixes a b c :: ereal
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1086	shows "b / c * a = b * a / c"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1087	by (cases a b c rule: ereal3_cases) (auto simp: field_simps sign_simps)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1088
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1089	subsection "Complete lattice"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1090
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1091	instantiation ereal :: lattice
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1092	begin
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1093	definition [simp]: "sup x y = (max x y :: ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1094	definition [simp]: "inf x y = (min x y :: ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1095	instance proof qed simp_all
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1096	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1097
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1098	instantiation ereal :: complete_lattice
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1099	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1100
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1101	definition "bot = (-\<infinity>::ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1102	definition "top = (\<infinity>::ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1103
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1104	definition "Sup S = (LEAST z. \<forall>x\<in>S. x \<le> z :: ereal)"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1105	definition "Inf S = (GREATEST z. \<forall>x\<in>S. z \<le> x :: ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1106
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1107	lemma ereal_complete_Sup:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1108	fixes S :: "ereal set" assumes "S \<noteq> {}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1109	shows "\<exists>x. (\<forall>y\<in>S. y \<le> x) \<and> (\<forall>z. (\<forall>y\<in>S. y \<le> z) \<longrightarrow> x \<le> z)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1110	proof cases
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1111	assume "\<exists>x. \<forall>a\<in>S. a \<le> ereal x"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1112	then obtain y where y: "\<And>a. a\<in>S \<Longrightarrow> a \<le> ereal y" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1113	then have "\<infinity> \<notin> S" by force
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1114	show ?thesis
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1115	proof cases
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1116	assume "S = {-\<infinity>}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1117	then show ?thesis by (auto intro!: exI[of _ "-\<infinity>"])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1118	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1119	assume "S \<noteq> {-\<infinity>}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1120	with `S \<noteq> {}` `\<infinity> \<notin> S` obtain x where "x \<in> S - {-\<infinity>}" "x \<noteq> \<infinity>" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1121	with y `\<infinity> \<notin> S` have "\<forall>z\<in>real ` (S - {-\<infinity>}). z \<le> y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1122	by (auto simp: real_of_ereal_ord_simps)
44669 8e6cdb9c00a7 remove redundant lemma reals_complete2 in favor of complete_real huffman parents: 44520 diff changeset	1123	with complete_real[of "real ` (S - {-\<infinity>})"] `x \<in> S - {-\<infinity>}`
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1124	obtain s where s:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1125	"\<forall>y\<in>S - {-\<infinity>}. real y \<le> s" "\<And>z. (\<forall>y\<in>S - {-\<infinity>}. real y \<le> z) \<Longrightarrow> s \<le> z"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1126	by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1127	show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1128	proof (safe intro!: exI[of _ "ereal s"])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1129	fix z assume "z \<in> S" with `\<infinity> \<notin> S` show "z \<le> ereal s"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1130	proof (cases z)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1131	case (real r)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1132	then show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1133	using s(1)[rule_format, of z] `z \<in> S` `z = ereal r` by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1134	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1135	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1136	fix z assume *: "\<forall>y\<in>S. y \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1137	with `S \<noteq> {-\<infinity>}` `S \<noteq> {}` show "ereal s \<le> z"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1138	proof (cases z)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1139	case (real u)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1140	with * have "s \<le> u"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1141	by (intro s(2)[of u]) (auto simp: real_of_ereal_ord_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1142	then show ?thesis using real by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1143	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1144	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1145	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1146	next
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1147	assume *: "\<not> (\<exists>x. \<forall>a\<in>S. a \<le> ereal x)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1148	show ?thesis
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1149	proof (safe intro!: exI[of _ \<infinity>])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1150	fix y assume **: "\<forall>z\<in>S. z \<le> y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1151	with * show "\<infinity> \<le> y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1152	proof (cases y)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1153	case MInf with * ** show ?thesis by (force simp: not_le)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1154	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1155	qed simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1156	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1157
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1158	lemma ereal_complete_Inf:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1159	fixes S :: "ereal set" assumes "S ~= {}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1160	shows "EX x. (ALL y:S. x <= y) & (ALL z. (ALL y:S. z <= y) --> z <= x)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1161	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1162	def S1 == "uminus ` S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1163	hence "S1 ~= {}" using assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1164	from this obtain x where x_def: "(ALL y:S1. y <= x) & (ALL z. (ALL y:S1. y <= z) --> x <= z)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1165	using ereal_complete_Sup[of S1] by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1166	{ fix z assume "ALL y:S. z <= y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1167	hence "ALL y:S1. y <= -z" unfolding S1_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1168	hence "x <= -z" using x_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1169	hence "z <= -x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1170	apply (subst ereal_uminus_uminus[symmetric])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1171	unfolding ereal_minus_le_minus . }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1172	moreover have "(ALL y:S. -x <= y)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1173	using x_def unfolding S1_def
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1174	apply simp
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1175	apply (subst (3) ereal_uminus_uminus[symmetric])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1176	unfolding ereal_minus_le_minus by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1177	ultimately show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1178	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1179
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1180	lemma ereal_complete_uminus_eq:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1181	fixes S :: "ereal set"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1182	shows "(\<forall>y\<in>uminus`S. y \<le> x) \<and> (\<forall>z. (\<forall>y\<in>uminus`S. y \<le> z) \<longrightarrow> x \<le> z)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1183	\<longleftrightarrow> (\<forall>y\<in>S. -x \<le> y) \<and> (\<forall>z. (\<forall>y\<in>S. z \<le> y) \<longrightarrow> z \<le> -x)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1184	by simp (metis ereal_minus_le_minus ereal_uminus_uminus)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1185
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1186	lemma ereal_Sup_uminus_image_eq:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1187	fixes S :: "ereal set"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1188	shows "Sup (uminus ` S) = - Inf S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1189	proof cases
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1190	assume "S = {}"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1191	moreover have "(THE x. All (op \<le> x)) = (-\<infinity>::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1192	by (rule the_equality) (auto intro!: ereal_bot)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1193	moreover have "(SOME x. \<forall>y. y \<le> x) = (\<infinity>::ereal)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1194	by (rule some_equality) (auto intro!: ereal_top)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1195	ultimately show ?thesis unfolding Inf_ereal_def Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1196	Least_def Greatest_def GreatestM_def by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1197	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1198	assume "S \<noteq> {}"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1199	with ereal_complete_Sup[of "uminus`S"]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1200	obtain x where x: "(\<forall>y\<in>S. -x \<le> y) \<and> (\<forall>z. (\<forall>y\<in>S. z \<le> y) \<longrightarrow> z \<le> -x)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1201	unfolding ereal_complete_uminus_eq by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1202	show "Sup (uminus ` S) = - Inf S"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1203	unfolding Inf_ereal_def Greatest_def GreatestM_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1204	proof (intro someI2[of _ _ "\<lambda>x. Sup (uminus`S) = - x"])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1205	show "(\<forall>y\<in>S. -x \<le> y) \<and> (\<forall>y. (\<forall>z\<in>S. y \<le> z) \<longrightarrow> y \<le> -x)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1206	using x .
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1207	fix x' assume "(\<forall>y\<in>S. x' \<le> y) \<and> (\<forall>y. (\<forall>z\<in>S. y \<le> z) \<longrightarrow> y \<le> x')"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1208	then have "(\<forall>y\<in>uminus`S. y \<le> - x') \<and> (\<forall>y. (\<forall>z\<in>uminus`S. z \<le> y) \<longrightarrow> - x' \<le> y)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1209	unfolding ereal_complete_uminus_eq by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1210	then show "Sup (uminus ` S) = -x'"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1211	unfolding Sup_ereal_def ereal_uminus_eq_iff
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1212	by (intro Least_equality) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1213	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1214	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1215
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1216	instance
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1217	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1218	{ fix x :: ereal and A
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1219	show "bot <= x" by (cases x) (simp_all add: bot_ereal_def)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1220	show "x <= top" by (simp add: top_ereal_def) }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1221
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1222	{ fix x :: ereal and A assume "x : A"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1223	with ereal_complete_Sup[of A]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1224	obtain s where s: "\<forall>y\<in>A. y <= s" "\<forall>z. (\<forall>y\<in>A. y <= z) \<longrightarrow> s <= z" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1225	hence "x <= s" using `x : A` by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1226	also have "... = Sup A" using s unfolding Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1227	by (auto intro!: Least_equality[symmetric])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1228	finally show "x <= Sup A" . }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1229	note le_Sup = this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1230
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1231	{ fix x :: ereal and A assume *: "!!z. (z : A ==> z <= x)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1232	show "Sup A <= x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1233	proof (cases "A = {}")
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1234	case True
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1235	hence "Sup A = -\<infinity>" unfolding Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1236	by (auto intro!: Least_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1237	thus "Sup A <= x" by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1238	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1239	case False
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1240	with ereal_complete_Sup[of A]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1241	obtain s where s: "\<forall>y\<in>A. y <= s" "\<forall>z. (\<forall>y\<in>A. y <= z) \<longrightarrow> s <= z" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1242	hence "Sup A = s"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1243	unfolding Sup_ereal_def by (auto intro!: Least_equality)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1244	also have "s <= x" using * s by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1245	finally show "Sup A <= x" .
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1246	qed }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1247	note Sup_le = this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1248
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1249	{ fix x :: ereal and A assume "x \<in> A"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1250	with le_Sup[of "-x" "uminus`A"] show "Inf A \<le> x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1251	unfolding ereal_Sup_uminus_image_eq by simp }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1252
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1253	{ fix x :: ereal and A assume *: "!!z. (z : A ==> x <= z)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1254	with Sup_le[of "uminus`A" "-x"] show "x \<le> Inf A"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1255	unfolding ereal_Sup_uminus_image_eq by force }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1256	qed
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	1257
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1258	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1259
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	1260	instance ereal :: complete_linorder ..
481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	1261
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1262	lemma ereal_SUPR_uminus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1263	fixes f :: "'a => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1264	shows "(SUP i : R. -(f i)) = -(INF i : R. f i)"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1265	unfolding SUP_def INF_def
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1266	using ereal_Sup_uminus_image_eq[of "f`R"]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1267	by (simp add: image_image)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1268
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1269	lemma ereal_INFI_uminus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1270	fixes f :: "'a => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1271	shows "(INF i : R. -(f i)) = -(SUP i : R. f i)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1272	using ereal_SUPR_uminus[of _ "\<lambda>x. - f x"] by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1273
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1274	lemma ereal_Inf_uminus_image_eq: "Inf (uminus ` S) = - Sup (S::ereal set)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1275	using ereal_Sup_uminus_image_eq[of "uminus ` S"] by (simp add: image_image)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1276
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1277	lemma ereal_inj_on_uminus[intro, simp]: "inj_on uminus (A :: ereal set)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1278	by (auto intro!: inj_onI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1279
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1280	lemma ereal_image_uminus_shift:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1281	fixes X Y :: "ereal set" shows "uminus ` X = Y \<longleftrightarrow> X = uminus ` Y"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1282	proof
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1283	assume "uminus ` X = Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1284	then have "uminus ` uminus ` X = uminus ` Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1285	by (simp add: inj_image_eq_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1286	then show "X = uminus ` Y" by (simp add: image_image)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1287	qed (simp add: image_image)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1288
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1289	lemma Inf_ereal_iff:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1290	fixes z :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1291	shows "(!!x. x:X ==> z <= x) ==> (EX x:X. x<y) <-> Inf X < y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1292	by (metis complete_lattice_class.Inf_greatest complete_lattice_class.Inf_lower less_le_not_le linear
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1293	order_less_le_trans)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1294
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1295	lemma Sup_eq_MInfty:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1296	fixes S :: "ereal set" shows "Sup S = -\<infinity> \<longleftrightarrow> S = {} \<or> S = {-\<infinity>}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1297	proof
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1298	assume a: "Sup S = -\<infinity>"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1299	with complete_lattice_class.Sup_upper[of _ S]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1300	show "S={} \<or> S={-\<infinity>}" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1301	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1302	assume "S={} \<or> S={-\<infinity>}" then show "Sup S = -\<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1303	unfolding Sup_ereal_def by (auto intro!: Least_equality)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1304	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1305
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1306	lemma Inf_eq_PInfty:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1307	fixes S :: "ereal set" shows "Inf S = \<infinity> \<longleftrightarrow> S = {} \<or> S = {\<infinity>}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1308	using Sup_eq_MInfty[of "uminus`S"]
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1309	unfolding ereal_Sup_uminus_image_eq ereal_image_uminus_shift by simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1310
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1311	lemma Inf_eq_MInfty:
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1312	fixes S :: "ereal set" shows "-\<infinity> \<in> S \<Longrightarrow> Inf S = -\<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1313	unfolding Inf_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1314	by (auto intro!: Greatest_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1315
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1316	lemma Sup_eq_PInfty:
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1317	fixes S :: "ereal set" shows "\<infinity> \<in> S \<Longrightarrow> Sup S = \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1318	unfolding Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1319	by (auto intro!: Least_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1320
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1321	lemma ereal_SUPI:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1322	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1323	assumes "!!i. i : A ==> f i <= x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1324	assumes "!!y. (!!i. i : A ==> f i <= y) ==> x <= y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1325	shows "(SUP i:A. f i) = x"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1326	unfolding SUP_def Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1327	using assms by (auto intro!: Least_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1328
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1329	lemma ereal_INFI:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1330	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1331	assumes "!!i. i : A ==> f i >= x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1332	assumes "!!y. (!!i. i : A ==> f i >= y) ==> x >= y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1333	shows "(INF i:A. f i) = x"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1334	unfolding INF_def Inf_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1335	using assms by (auto intro!: Greatest_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1336
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1337	lemma Sup_ereal_close:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1338	fixes e :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1339	assumes "0 < e" and S: "\<bar>Sup S\<bar> \<noteq> \<infinity>" "S \<noteq> {}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1340	shows "\<exists>x\<in>S. Sup S - e < x"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1341	using assms by (cases e) (auto intro!: less_Sup_iff[THEN iffD1])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1342
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1343	lemma Inf_ereal_close:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1344	fixes e :: ereal assumes "\<bar>Inf X\<bar> \<noteq> \<infinity>" "0 < e"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1345	shows "\<exists>x\<in>X. x < Inf X + e"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1346	proof (rule Inf_less_iff[THEN iffD1])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1347	show "Inf X < Inf X + e" using assms
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1348	by (cases e) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1349	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1350
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1351	lemma SUP_nat_Infty: "(SUP i::nat. ereal (real i)) = \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1352	proof -
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1353	{ fix x ::ereal assume "x \<noteq> \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1354	then have "\<exists>k::nat. x < ereal (real k)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1355	proof (cases x)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1356	case MInf then show ?thesis by (intro exI[of _ 0]) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1357	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1358	case (real r)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1359	moreover obtain k :: nat where "r < real k"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1360	using ex_less_of_nat by (auto simp: real_eq_of_nat)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1361	ultimately show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1362	qed simp }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1363	then show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1364	using SUP_eq_top_iff[of UNIV "\<lambda>n::nat. ereal (real n)"]
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1365	by (auto simp: top_ereal_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1366	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1367
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1368	lemma ereal_le_Sup:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1369	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1370	shows "(x <= (SUP i:A. f i)) <-> (ALL y. y < x --> (EX i. i : A & y <= f i))"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1371	(is "?lhs <-> ?rhs")
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1372	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1373	{ assume "?rhs"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1374	{ assume "~(x <= (SUP i:A. f i))" hence "(SUP i:A. f i)<x" by (simp add: not_le)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1375	from this obtain y where y_def: "(SUP i:A. f i)<y & y<x" using ereal_dense by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1376	from this obtain i where "i : A & y <= f i" using `?rhs` by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1377	hence "y <= (SUP i:A. f i)" using SUP_upper[of i A f] by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1378	hence False using y_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1379	} hence "?lhs" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1380	}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1381	moreover
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1382	{ assume "?lhs" hence "?rhs"
45236 ac4a2a66707d replacing metis proofs with facts xt1 by new proof with more readable names bulwahn parents: 45036 diff changeset	1383	by (metis less_SUP_iff order_less_imp_le order_less_le_trans)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1384	} ultimately show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1385	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1386
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1387	lemma ereal_Inf_le:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1388	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1389	shows "((INF i:A. f i) <= x) <-> (ALL y. x < y --> (EX i. i : A & f i <= y))"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1390	(is "?lhs <-> ?rhs")
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1391	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1392	{ assume "?rhs"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1393	{ assume "~((INF i:A. f i) <= x)" hence "x < (INF i:A. f i)" by (simp add: not_le)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1394	from this obtain y where y_def: "x<y & y<(INF i:A. f i)" using ereal_dense by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1395	from this obtain i where "i : A & f i <= y" using `?rhs` by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1396	hence "(INF i:A. f i) <= y" using INF_lower[of i A f] by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1397	hence False using y_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1398	} hence "?lhs" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1399	}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1400	moreover
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1401	{ assume "?lhs" hence "?rhs"
45236 ac4a2a66707d replacing metis proofs with facts xt1 by new proof with more readable names bulwahn parents: 45036 diff changeset	1402	by (metis INF_less_iff order_le_less order_less_le_trans)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1403	} ultimately show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1404	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1405
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1406	lemma Inf_less:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1407	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1408	assumes "(INF i:A. f i) < x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1409	shows "EX i. i : A & f i <= x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1410	proof(rule ccontr)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1411	assume "~ (EX i. i : A & f i <= x)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1412	hence "ALL i:A. f i > x" by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1413	hence "(INF i:A. f i) >= x" apply (subst INF_greatest) by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1414	thus False using assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1415	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1416
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1417	lemma same_INF:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1418	assumes "ALL e:A. f e = g e"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1419	shows "(INF e:A. f e) = (INF e:A. g e)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1420	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1421	have "f ` A = g ` A" unfolding image_def using assms by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1422	thus ?thesis unfolding INF_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1423	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1424
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1425	lemma same_SUP:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1426	assumes "ALL e:A. f e = g e"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1427	shows "(SUP e:A. f e) = (SUP e:A. g e)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1428	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1429	have "f ` A = g ` A" unfolding image_def using assms by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1430	thus ?thesis unfolding SUP_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1431	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1432
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1433	lemma SUPR_eq:
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1434	assumes "\<forall>i\<in>A. \<exists>j\<in>B. f i \<le> g j"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1435	assumes "\<forall>j\<in>B. \<exists>i\<in>A. g j \<le> f i"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1436	shows "(SUP i:A. f i) = (SUP j:B. g j)"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1437	proof (intro antisym)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1438	show "(SUP i:A. f i) \<le> (SUP j:B. g j)"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1439	using assms by (metis SUP_least SUP_upper2)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1440	show "(SUP i:B. g i) \<le> (SUP j:A. f j)"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1441	using assms by (metis SUP_least SUP_upper2)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1442	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1443
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1444	lemma SUP_ereal_le_addI:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1445	fixes f :: "'i \<Rightarrow> ereal"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1446	assumes "\<And>i. f i + y \<le> z" and "y \<noteq> -\<infinity>"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1447	shows "SUPR UNIV f + y \<le> z"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1448	proof (cases y)
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1449	case (real r)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1450	then have "\<And>i. f i \<le> z - y" using assms by (simp add: ereal_le_minus_iff)
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1451	then have "SUPR UNIV f \<le> z - y" by (rule SUP_least)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1452	then show ?thesis using real by (simp add: ereal_le_minus_iff)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1453	qed (insert assms, auto)
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1454
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1455	lemma SUPR_ereal_add:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1456	fixes f g :: "nat \<Rightarrow> ereal"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1457	assumes "incseq f" "incseq g" and pos: "\<And>i. f i \<noteq> -\<infinity>" "\<And>i. g i \<noteq> -\<infinity>"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1458	shows "(SUP i. f i + g i) = SUPR UNIV f + SUPR UNIV g"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1459	proof (rule ereal_SUPI)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1460	fix y assume *: "\<And>i. i \<in> UNIV \<Longrightarrow> f i + g i \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1461	have f: "SUPR UNIV f \<noteq> -\<infinity>" using pos
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1462	unfolding SUP_def Sup_eq_MInfty by (auto dest: image_eqD)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1463	{ fix j
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1464	{ fix i
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1465	have "f i + g j \<le> f i + g (max i j)"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1466	using `incseq g`[THEN incseqD] by (rule add_left_mono) auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1467	also have "\<dots> \<le> f (max i j) + g (max i j)"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1468	using `incseq f`[THEN incseqD] by (rule add_right_mono) auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1469	also have "\<dots> \<le> y" using * by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1470	finally have "f i + g j \<le> y" . }
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1471	then have "SUPR UNIV f + g j \<le> y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1472	using assms(4)[of j] by (intro SUP_ereal_le_addI) auto
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1473	then have "g j + SUPR UNIV f \<le> y" by (simp add: ac_simps) }
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1474	then have "SUPR UNIV g + SUPR UNIV f \<le> y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1475	using f by (rule SUP_ereal_le_addI)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1476	then show "SUPR UNIV f + SUPR UNIV g \<le> y" by (simp add: ac_simps)
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1477	qed (auto intro!: add_mono SUP_upper)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1478
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1479	lemma SUPR_ereal_add_pos:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1480	fixes f g :: "nat \<Rightarrow> ereal"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1481	assumes inc: "incseq f" "incseq g" and pos: "\<And>i. 0 \<le> f i" "\<And>i. 0 \<le> g i"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1482	shows "(SUP i. f i + g i) = SUPR UNIV f + SUPR UNIV g"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1483	proof (intro SUPR_ereal_add inc)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1484	fix i show "f i \<noteq> -\<infinity>" "g i \<noteq> -\<infinity>" using pos[of i] by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1485	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1486
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1487	lemma SUPR_ereal_setsum:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1488	fixes f g :: "'a \<Rightarrow> nat \<Rightarrow> ereal"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1489	assumes "\<And>n. n \<in> A \<Longrightarrow> incseq (f n)" and pos: "\<And>n i. n \<in> A \<Longrightarrow> 0 \<le> f n i"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1490	shows "(SUP i. \<Sum>n\<in>A. f n i) = (\<Sum>n\<in>A. SUPR UNIV (f n))"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1491	proof cases
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1492	assume "finite A" then show ?thesis using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1493	by induct (auto simp: incseq_setsumI2 setsum_nonneg SUPR_ereal_add_pos)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1494	qed simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1495
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1496	lemma SUPR_ereal_cmult:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1497	fixes f :: "nat \<Rightarrow> ereal" assumes "\<And>i. 0 \<le> f i" "0 \<le> c"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1498	shows "(SUP i. c * f i) = c * SUPR UNIV f"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1499	proof (rule ereal_SUPI)
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1500	fix i have "f i \<le> SUPR UNIV f" by (rule SUP_upper) auto
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1501	then show "c * f i \<le> c * SUPR UNIV f"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1502	using `0 \<le> c` by (rule ereal_mult_left_mono)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1503	next
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1504	fix y assume : "\<And>i. i \<in> UNIV \<Longrightarrow> c f i \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1505	show "c * SUPR UNIV f \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1506	proof cases
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1507	assume c: "0 < c \<and> c \<noteq> \<infinity>"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1508	with * have "SUPR UNIV f \<le> y / c"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1509	by (intro SUP_least) (auto simp: ereal_le_divide_pos)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1510	with c show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1511	by (auto simp: ereal_le_divide_pos)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1512	next
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1513	{ assume "c = \<infinity>" have ?thesis
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1514	proof cases
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1515	assume "\<forall>i. f i = 0"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1516	moreover then have "range f = {0}" by auto
44918 6a80fbc4e72c tune simpset for Complete_Lattices noschinl parents: 44890 diff changeset	1517	ultimately show "c * SUPR UNIV f \<le> y" using *
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1518	by (auto simp: SUP_def min_max.sup_absorb1)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1519	next
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1520	assume "\<not> (\<forall>i. f i = 0)"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1521	then obtain i where "f i \<noteq> 0" by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1522	with *[of i] `c = \<infinity>` `0 \<le> f i` show ?thesis by (auto split: split_if_asm)
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1523	qed }
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1524	moreover assume "\<not> (0 < c \<and> c \<noteq> \<infinity>)"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1525	ultimately show ?thesis using * `0 \<le> c` by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1526	qed
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1527	qed
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	1528
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1529	lemma SUP_PInfty:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1530	fixes f :: "'a \<Rightarrow> ereal"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1531	assumes "\<And>n::nat. \<exists>i\<in>A. ereal (real n) \<le> f i"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1532	shows "(SUP i:A. f i) = \<infinity>"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1533	unfolding SUP_def Sup_eq_top_iff[where 'a=ereal, unfolded top_ereal_def]
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1534	apply simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1535	proof safe
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1536	fix x :: ereal assume "x \<noteq> \<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1537	show "\<exists>i\<in>A. x < f i"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1538	proof (cases x)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1539	case PInf with `x \<noteq> \<infinity>` show ?thesis by simp
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1540	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1541	case MInf with assms[of "0"] show ?thesis by force
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1542	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1543	case (real r)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1544	with less_PInf_Ex_of_nat[of x] obtain n :: nat where "x < ereal (real n)" by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1545	moreover from assms[of n] guess i ..
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1546	ultimately show ?thesis
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1547	by (auto intro!: bexI[of _ i])
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1548	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1549	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1550
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1551	lemma Sup_countable_SUPR:
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1552	assumes "A \<noteq> {}"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1553	shows "\<exists>f::nat \<Rightarrow> ereal. range f \<subseteq> A \<and> Sup A = SUPR UNIV f"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1554	proof (cases "Sup A")
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1555	case (real r)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1556	have "\<forall>n::nat. \<exists>x. x \<in> A \<and> Sup A < x + 1 / ereal (real n)"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1557	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1558	fix n ::nat have "\<exists>x\<in>A. Sup A - 1 / ereal (real n) < x"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1559	using assms real by (intro Sup_ereal_close) (auto simp: one_ereal_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1560	then guess x ..
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1561	then show "\<exists>x. x \<in> A \<and> Sup A < x + 1 / ereal (real n)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1562	by (auto intro!: exI[of _ x] simp: ereal_minus_less_iff)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1563	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1564	from choice[OF this] guess f .. note f = this
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1565	have "SUPR UNIV f = Sup A"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1566	proof (rule ereal_SUPI)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1567	fix i show "f i \<le> Sup A" using f
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1568	by (auto intro!: complete_lattice_class.Sup_upper)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1569	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1570	fix y assume bound: "\<And>i. i \<in> UNIV \<Longrightarrow> f i \<le> y"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1571	show "Sup A \<le> y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1572	proof (rule ereal_le_epsilon, intro allI impI)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1573	fix e :: ereal assume "0 < e"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1574	show "Sup A \<le> y + e"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1575	proof (cases e)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1576	case (real r)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1577	hence "0 < r" using `0 < e` by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1578	then obtain n ::nat where *: "1 / real n < r" "0 < n"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1579	using ex_inverse_of_nat_less by (auto simp: real_eq_of_nat inverse_eq_divide)
44918 6a80fbc4e72c tune simpset for Complete_Lattices noschinl parents: 44890 diff changeset	1580	have "Sup A \<le> f n + 1 / ereal (real n)" using f[THEN spec, of n]
6a80fbc4e72c tune simpset for Complete_Lattices noschinl parents: 44890 diff changeset	1581	by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1582	also have "1 / ereal (real n) \<le> e" using real * by (auto simp: one_ereal_def )
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1583	with bound have "f n + 1 / ereal (real n) \<le> y + e" by (rule add_mono) simp
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1584	finally show "Sup A \<le> y + e" .
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1585	qed (insert `0 < e`, auto)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1586	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1587	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1588	with f show ?thesis by (auto intro!: exI[of _ f])
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1589	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1590	case PInf
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1591	from `A \<noteq> {}` obtain x where "x \<in> A" by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1592	show ?thesis
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1593	proof cases
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1594	assume "\<infinity> \<in> A"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1595	moreover then have "\<infinity> \<le> Sup A" by (intro complete_lattice_class.Sup_upper)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1596	ultimately show ?thesis by (auto intro!: exI[of _ "\<lambda>x. \<infinity>"])
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1597	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1598	assume "\<infinity> \<notin> A"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1599	have "\<exists>x\<in>A. 0 \<le> x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1600	by (metis Infty_neq_0 PInf complete_lattice_class.Sup_least ereal_infty_less_eq2 linorder_linear)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1601	then obtain x where "x \<in> A" "0 \<le> x" by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1602	have "\<forall>n::nat. \<exists>f. f \<in> A \<and> x + ereal (real n) \<le> f"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1603	proof (rule ccontr)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1604	assume "\<not> ?thesis"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1605	then have "\<exists>n::nat. Sup A \<le> x + ereal (real n)"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1606	by (simp add: Sup_le_iff not_le less_imp_le Ball_def) (metis less_imp_le)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1607	then show False using `x \<in> A` `\<infinity> \<notin> A` PInf
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1608	by(cases x) auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1609	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1610	from choice[OF this] guess f .. note f = this
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1611	have "SUPR UNIV f = \<infinity>"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1612	proof (rule SUP_PInfty)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1613	fix n :: nat show "\<exists>i\<in>UNIV. ereal (real n) \<le> f i"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1614	using f[THEN spec, of n] `0 \<le> x`
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1615	by (cases rule: ereal2_cases[of "f n" x]) (auto intro!: exI[of _ n])
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1616	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1617	then show ?thesis using f PInf by (auto intro!: exI[of _ f])
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1618	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1619	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1620	case MInf
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1621	with `A \<noteq> {}` have "A = {-\<infinity>}" by (auto simp: Sup_eq_MInfty)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1622	then show ?thesis using MInf by (auto intro!: exI[of _ "\<lambda>x. -\<infinity>"])
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1623	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1624
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1625	lemma SUPR_countable_SUPR:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1626	"A \<noteq> {} \<Longrightarrow> \<exists>f::nat \<Rightarrow> ereal. range f \<subseteq> g`A \<and> SUPR A g = SUPR UNIV f"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1627	using Sup_countable_SUPR[of "g`A"] by (auto simp: SUP_def)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1628
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1629	lemma Sup_ereal_cadd:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1630	fixes A :: "ereal set" assumes "A \<noteq> {}" and "a \<noteq> -\<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1631	shows "Sup ((\<lambda>x. a + x) ` A) = a + Sup A"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1632	proof (rule antisym)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1633	have *: "\<And>a::ereal. \<And>A. Sup ((\<lambda>x. a + x) ` A) \<le> a + Sup A"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1634	by (auto intro!: add_mono complete_lattice_class.Sup_least complete_lattice_class.Sup_upper)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1635	then show "Sup ((\<lambda>x. a + x) ` A) \<le> a + Sup A" .
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1636	show "a + Sup A \<le> Sup ((\<lambda>x. a + x) ` A)"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1637	proof (cases a)
44918 6a80fbc4e72c tune simpset for Complete_Lattices noschinl parents: 44890 diff changeset	1638	case PInf with `A \<noteq> {}` show ?thesis by (auto simp: image_constant min_max.sup_absorb1)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1639	next
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1640	case (real r)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1641	then have **: "op + (- a) ` op + a ` A = A"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1642	by (auto simp: image_iff ac_simps zero_ereal_def[symmetric])
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1643	from [of "-a" "(\<lambda>x. a + x) ` A"] real show ?thesis unfolding *
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1644	by (cases rule: ereal2_cases[of "Sup A" "Sup (op + a ` A)"]) auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1645	qed (insert `a \<noteq> -\<infinity>`, auto)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1646	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1647
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1648	lemma Sup_ereal_cminus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1649	fixes A :: "ereal set" assumes "A \<noteq> {}" and "a \<noteq> -\<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1650	shows "Sup ((\<lambda>x. a - x) ` A) = a - Inf A"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1651	using Sup_ereal_cadd[of "uminus ` A" a] assms
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1652	by (simp add: comp_def image_image minus_ereal_def
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1653	ereal_Sup_uminus_image_eq)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1654
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1655	lemma SUPR_ereal_cminus:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1656	fixes f :: "'i \<Rightarrow> ereal"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1657	fixes A assumes "A \<noteq> {}" and "a \<noteq> -\<infinity>"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1658	shows "(SUP x:A. a - f x) = a - (INF x:A. f x)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1659	using Sup_ereal_cminus[of "f`A" a] assms
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1660	unfolding SUP_def INF_def image_image by auto
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1661
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1662	lemma Inf_ereal_cminus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1663	fixes A :: "ereal set" assumes "A \<noteq> {}" and "\<bar>a\<bar> \<noteq> \<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1664	shows "Inf ((\<lambda>x. a - x) ` A) = a - Sup A"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1665	proof -
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1666	{ fix x have "-a - -x = -(a - x)" using assms by (cases x) auto }
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1667	moreover then have "(\<lambda>x. -a - x)`uminus`A = uminus ` (\<lambda>x. a - x) ` A"
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1668	by (auto simp: image_image)
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1669	ultimately show ?thesis
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1670	using Sup_ereal_cminus[of "uminus ` A" "-a"] assms
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1671	by (auto simp add: ereal_Sup_uminus_image_eq ereal_Inf_uminus_image_eq)
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1672	qed
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1673
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1674	lemma INFI_ereal_cminus:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1675	fixes a :: ereal assumes "A \<noteq> {}" and "\<bar>a\<bar> \<noteq> \<infinity>"
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1676	shows "(INF x:A. a - f x) = a - (SUP x:A. f x)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1677	using Inf_ereal_cminus[of "f`A" a] assms
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	1678	unfolding SUP_def INF_def image_image
41979 b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1679	by auto
b10ec1f5e9d5 lemmas about addition, SUP on countable sets and infinite sums for extreal hoelzl parents: 41978 diff changeset	1680
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1681	lemma uminus_ereal_add_uminus_uminus:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1682	fixes a b :: ereal shows "a \<noteq> \<infinity> \<Longrightarrow> b \<noteq> \<infinity> \<Longrightarrow> - (- a + - b) = a + b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1683	by (cases rule: ereal2_cases[of a b]) auto
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1684
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1685	lemma INFI_ereal_add:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1686	fixes f :: "nat \<Rightarrow> ereal"
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1687	assumes "decseq f" "decseq g" and fin: "\<And>i. f i \<noteq> \<infinity>" "\<And>i. g i \<noteq> \<infinity>"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1688	shows "(INF i. f i + g i) = INFI UNIV f + INFI UNIV g"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1689	proof -
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1690	have INF_less: "(INF i. f i) < \<infinity>" "(INF i. g i) < \<infinity>"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1691	using assms unfolding INF_less_iff by auto
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1692	{ fix i from fin[of i] have "- ((- f i) + (- g i)) = f i + g i"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1693	by (rule uminus_ereal_add_uminus_uminus) }
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1694	then have "(INF i. f i + g i) = (INF i. - ((- f i) + (- g i)))"
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1695	by simp
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1696	also have "\<dots> = INFI UNIV f + INFI UNIV g"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1697	unfolding ereal_INFI_uminus
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1698	using assms INF_less
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1699	by (subst SUPR_ereal_add)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1700	(auto simp: ereal_SUPR_uminus intro!: uminus_ereal_add_uminus_uminus)
42950 6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1701	finally show ?thesis .
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1702	qed
6e5c2a3c69da move lemmas to Extended_Reals and Extended_Real_Limits hoelzl parents: 42600 diff changeset	1703
45934 9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1704	subsection "Relation to @{typ enat}"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1705
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1706	definition "ereal_of_enat n = (case n of enat n \<Rightarrow> ereal (real n) \| \<infinity> \<Rightarrow> \<infinity>)"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1707
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1708	declare [[coercion "ereal_of_enat :: enat \<Rightarrow> ereal"]]
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1709	declare [[coercion "(\<lambda>n. ereal (real n)) :: nat \<Rightarrow> ereal"]]
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1710
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1711	lemma ereal_of_enat_simps[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1712	"ereal_of_enat (enat n) = ereal n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1713	"ereal_of_enat \<infinity> = \<infinity>"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1714	by (simp_all add: ereal_of_enat_def)
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1715
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1716	lemma ereal_of_enat_le_iff[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1717	"ereal_of_enat m \<le> ereal_of_enat n \<longleftrightarrow> m \<le> n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1718	by (cases m n rule: enat2_cases) auto
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1719
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1720	lemma number_of_le_ereal_of_enat_iff[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1721	shows "number_of m \<le> ereal_of_enat n \<longleftrightarrow> number_of m \<le> n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1722	by (cases n) (auto dest: natceiling_le intro: natceiling_le_eq[THEN iffD1])
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1723
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1724	lemma ereal_of_enat_ge_zero_cancel_iff[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1725	"0 \<le> ereal_of_enat n \<longleftrightarrow> 0 \<le> n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1726	by (cases n) (auto simp: enat_0[symmetric])
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1727
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1728	lemma ereal_of_enat_gt_zero_cancel_iff[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1729	"0 < ereal_of_enat n \<longleftrightarrow> 0 < n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1730	by (cases n) (auto simp: enat_0[symmetric])
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1731
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1732	lemma ereal_of_enat_zero[simp]:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1733	"ereal_of_enat 0 = 0"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1734	by (auto simp: enat_0[symmetric])
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1735
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1736	lemma ereal_of_enat_add:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1737	"ereal_of_enat (m + n) = ereal_of_enat m + ereal_of_enat n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1738	by (cases m n rule: enat2_cases) auto
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1739
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1740	lemma ereal_of_enat_sub:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1741	assumes "n \<le> m" shows "ereal_of_enat (m - n) = ereal_of_enat m - ereal_of_enat n "
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1742	using assms by (cases m n rule: enat2_cases) auto
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1743
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1744	lemma ereal_of_enat_mult:
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1745	"ereal_of_enat (m * n) = ereal_of_enat m * ereal_of_enat n"
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1746	by (cases m n rule: enat2_cases) auto
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1747
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1748	lemmas ereal_of_enat_pushin = ereal_of_enat_add ereal_of_enat_sub ereal_of_enat_mult
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1749	lemmas ereal_of_enat_pushout = ereal_of_enat_pushin[symmetric]
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1750
9321cd2572fe add simp rules for enat and ereal noschinl parents: 45769 diff changeset	1751
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1752	subsection "Limits on @{typ ereal}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1753
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1754	subsubsection "Topological space"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1755
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1756	instantiation ereal :: topological_space
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1757	begin
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1758
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1759	definition "open A \<longleftrightarrow> open (ereal -` A)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1760	\<and> (\<infinity> \<in> A \<longrightarrow> (\<exists>x. {ereal x <..} \<subseteq> A))
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1761	\<and> (-\<infinity> \<in> A \<longrightarrow> (\<exists>x. {..<ereal x} \<subseteq> A))"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1762
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1763	lemma open_PInfty: "open A \<Longrightarrow> \<infinity> \<in> A \<Longrightarrow> (\<exists>x. {ereal x<..} \<subseteq> A)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1764	unfolding open_ereal_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1765
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1766	lemma open_MInfty: "open A \<Longrightarrow> -\<infinity> \<in> A \<Longrightarrow> (\<exists>x. {..<ereal x} \<subseteq> A)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1767	unfolding open_ereal_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1768
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1769	lemma open_PInfty2: assumes "open A" "\<infinity> \<in> A" obtains x where "{ereal x<..} \<subseteq> A"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1770	using open_PInfty[OF assms] by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1771
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1772	lemma open_MInfty2: assumes "open A" "-\<infinity> \<in> A" obtains x where "{..<ereal x} \<subseteq> A"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1773	using open_MInfty[OF assms] by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1774
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1775	lemma ereal_openE: assumes "open A" obtains x y where
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1776	"open (ereal -` A)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1777	"\<infinity> \<in> A \<Longrightarrow> {ereal x<..} \<subseteq> A"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1778	"-\<infinity> \<in> A \<Longrightarrow> {..<ereal y} \<subseteq> A"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1779	using assms open_ereal_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1780
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1781	instance
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1782	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1783	let ?U = "UNIV::ereal set"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1784	show "open ?U" unfolding open_ereal_def
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1785	by (auto intro!: exI[of _ 0])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1786	next
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1787	fix S T::"ereal set" assume "open S" and "open T"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1788	from `open S`[THEN ereal_openE] guess xS yS .
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1789	moreover from `open T`[THEN ereal_openE] guess xT yT .
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1790	ultimately have
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1791	"open (ereal -` (S \<inter> T))"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1792	"\<infinity> \<in> S \<inter> T \<Longrightarrow> {ereal (max xS xT) <..} \<subseteq> S \<inter> T"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1793	"-\<infinity> \<in> S \<inter> T \<Longrightarrow> {..< ereal (min yS yT)} \<subseteq> S \<inter> T"
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1794	by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1795	then show "open (S Int T)" unfolding open_ereal_def by blast
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1796	next
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1797	fix K :: "ereal set set" assume "\<forall>S\<in>K. open S"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1798	then have *: "\<forall>S. \<exists>x y. S \<in> K \<longrightarrow> open (ereal -` S) \<and>
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1799	(\<infinity> \<in> S \<longrightarrow> {ereal x <..} \<subseteq> S) \<and> (-\<infinity> \<in> S \<longrightarrow> {..< ereal y} \<subseteq> S)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1800	by (auto simp: open_ereal_def)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1801	then show "open (Union K)" unfolding open_ereal_def
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1802	proof (intro conjI impI)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1803	show "open (ereal -` \<Union>K)"
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	1804	using *[THEN choice] by (auto simp: vimage_Union)
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1805	qed ((metis UnionE Union_upper subset_trans *)+)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1806	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1807	end
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1808
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1809	lemma open_ereal: "open S \<Longrightarrow> open (ereal ` S)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1810	by (auto simp: inj_vimage_image_eq open_ereal_def)
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1811
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1812	lemma open_ereal_vimage: "open S \<Longrightarrow> open (ereal -` S)"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1813	unfolding open_ereal_def by auto
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1814
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1815	lemma open_ereal_lessThan[intro, simp]: "open {..< a :: ereal}"
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1816	proof -
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1817	have "\<And>x. ereal -` {..<ereal x} = {..< x}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1818	"ereal -` {..< \<infinity>} = UNIV" "ereal -` {..< -\<infinity>} = {}" by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1819	then show ?thesis by (cases a) (auto simp: open_ereal_def)
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1820	qed
d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1821
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1822	lemma open_ereal_greaterThan[intro, simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1823	"open {a :: ereal <..}"
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1824	proof -
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1825	have "\<And>x. ereal -` {ereal x<..} = {x<..}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1826	"ereal -` {\<infinity><..} = {}" "ereal -` {-\<infinity><..} = UNIV" by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1827	then show ?thesis by (cases a) (auto simp: open_ereal_def)
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1828	qed
d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1829
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1830	lemma ereal_open_greaterThanLessThan[intro, simp]: "open {a::ereal <..< b}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1831	unfolding greaterThanLessThan_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1832
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1833	lemma closed_ereal_atLeast[simp, intro]: "closed {a :: ereal ..}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1834	proof -
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1835	have "- {a ..} = {..< a}" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1836	then show "closed {a ..}"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1837	unfolding closed_def using open_ereal_lessThan by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1838	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1839
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1840	lemma closed_ereal_atMost[simp, intro]: "closed {.. b :: ereal}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1841	proof -
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1842	have "- {.. b} = {b <..}" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1843	then show "closed {.. b}"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1844	unfolding closed_def using open_ereal_greaterThan by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1845	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1846
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1847	lemma closed_ereal_atLeastAtMost[simp, intro]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1848	shows "closed {a :: ereal .. b}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1849	unfolding atLeastAtMost_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1850
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1851	lemma closed_ereal_singleton:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1852	"closed {a :: ereal}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1853	by (metis atLeastAtMost_singleton closed_ereal_atLeastAtMost)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1854
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1855	lemma ereal_open_cont_interval:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1856	fixes S :: "ereal set"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1857	assumes "open S" "x \<in> S" "\<bar>x\<bar> \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1858	obtains e where "e>0" "{x-e <..< x+e} \<subseteq> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1859	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1860	from `open S` have "open (ereal -` S)" by (rule ereal_openE)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1861	then obtain e where "0 < e" and e: "\<And>y. dist y (real x) < e \<Longrightarrow> ereal y \<in> S"
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	1862	using assms unfolding open_dist by force
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1863	show thesis
d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1864	proof (intro that subsetI)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1865	show "0 < ereal e" using `0 < e` by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1866	fix y assume "y \<in> {x - ereal e<..<x + ereal e}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1867	with assms obtain t where "y = ereal t" "dist t (real x) < e"
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	1868	apply (cases y) by (auto simp: dist_real_def)
28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	1869	then show "y \<in> S" using e[of t] by auto
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	1870	qed
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1871	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1872
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1873	lemma ereal_open_cont_interval2:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1874	fixes S :: "ereal set"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	1875	assumes "open S" "x \<in> S" and x: "\<bar>x\<bar> \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1876	obtains a b where "a < x" "x < b" "{a <..< b} \<subseteq> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1877	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1878	guess e using ereal_open_cont_interval[OF assms] .
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1879	with that[of "x-e" "x+e"] ereal_between[OF x, of e]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1880	show thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1881	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1882
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1883	instance ereal :: t2_space
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1884	proof
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1885	fix x y :: ereal assume "x ~= y"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1886	let "?P x (y::ereal)" = "EX U V. open U & open V & x : U & y : V & U Int V = {}"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1887
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1888	{ fix x y :: ereal assume "x < y"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1889	from ereal_dense[OF this] obtain z where z: "x < z" "z < y" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1890	have "?P x y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1891	apply (rule exI[of _ "{..<z}"])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1892	apply (rule exI[of _ "{z<..}"])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1893	using z by auto }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1894	note * = this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1895
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1896	from `x ~= y`
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1897	show "EX U V. open U & open V & x : U & y : V & U Int V = {}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1898	proof (cases rule: linorder_cases)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1899	assume "x = y" with `x ~= y` show ?thesis by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1900	next assume "x < y" from *[OF this] show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1901	next assume "y < x" from *[OF this] show ?thesis by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1902	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1903	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1904
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1905	subsubsection {* Convergent sequences *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1906
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1907	lemma lim_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1908	"((\<lambda>n. ereal (f n)) ---> ereal x) net \<longleftrightarrow> (f ---> x) net" (is "?l = ?r")
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1909	proof (intro iffI topological_tendstoI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1910	fix S assume "?l" "open S" "x \<in> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1911	then show "eventually (\<lambda>x. f x \<in> S) net"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1912	using `?l`[THEN topological_tendstoD, OF open_ereal, OF `open S`]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1913	by (simp add: inj_image_mem_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1914	next
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1915	fix S assume "?r" "open S" "ereal x \<in> S"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1916	show "eventually (\<lambda>x. ereal (f x) \<in> S) net"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1917	using `?r`[THEN topological_tendstoD, OF open_ereal_vimage, OF `open S`]
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1918	using `ereal x \<in> S` by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1919	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1920
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1921	lemma lim_real_of_ereal[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1922	assumes lim: "(f ---> ereal x) net"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1923	shows "((\<lambda>x. real (f x)) ---> x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1924	proof (intro topological_tendstoI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1925	fix S assume "open S" "x \<in> S"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1926	then have S: "open S" "ereal x \<in> ereal ` S"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1927	by (simp_all add: inj_image_mem_iff)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1928	have "\<forall>x. f x \<in> ereal ` S \<longrightarrow> real (f x) \<in> S" by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1929	from this lim[THEN topological_tendstoD, OF open_ereal, OF S]
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1930	show "eventually (\<lambda>x. real (f x) \<in> S) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1931	by (rule eventually_mono)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1932	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1933
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1934	lemma Lim_PInfty: "f ----> \<infinity> <-> (ALL B. EX N. ALL n>=N. f n >= ereal B)" (is "?l = ?r")
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1935	proof
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1936	assume ?r
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1937	show ?l
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1938	apply(rule topological_tendstoI)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1939	unfolding eventually_sequentially
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1940	proof-
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1941	fix S :: "ereal set" assume "open S" "\<infinity> : S"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1942	from open_PInfty[OF this] guess B .. note B=this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1943	from `?r`[rule_format,of "B+1"] guess N .. note N=this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1944	show "EX N. ALL n>=N. f n : S" apply(rule_tac x=N in exI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1945	proof safe case goal1
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1946	have "ereal B < ereal (B + 1)" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1947	also have "... <= f n" using goal1 N by auto
44890 22f665a2e91c new fastforce replacing fastsimp - less confusing name nipkow parents: 44669 diff changeset	1948	finally show ?case using B by fastforce
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1949	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1950	qed
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1951	next
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1952	assume ?l
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1953	show ?r
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1954	proof fix B::real have "open {ereal B<..}" "\<infinity> : {ereal B<..}" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1955	from topological_tendstoD[OF `?l` this,unfolded eventually_sequentially]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1956	guess N .. note N=this
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1957	show "EX N. ALL n>=N. ereal B <= f n" apply(rule_tac x=N in exI) using N by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1958	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1959	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1960
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1961
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1962	lemma Lim_MInfty: "f ----> (-\<infinity>) <-> (ALL B. EX N. ALL n>=N. f n <= ereal B)" (is "?l = ?r")
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1963	proof
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1964	assume ?r
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1965	show ?l
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1966	apply(rule topological_tendstoI)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1967	unfolding eventually_sequentially
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1968	proof-
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1969	fix S :: "ereal set"
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	1970	assume "open S" "(-\<infinity>) : S"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1971	from open_MInfty[OF this] guess B .. note B=this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1972	from `?r`[rule_format,of "B-(1::real)"] guess N .. note N=this
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1973	show "EX N. ALL n>=N. f n : S" apply(rule_tac x=N in exI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1974	proof safe case goal1
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1975	have "ereal (B - 1) >= f n" using goal1 N by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1976	also have "... < ereal B" by auto
44890 22f665a2e91c new fastforce replacing fastsimp - less confusing name nipkow parents: 44669 diff changeset	1977	finally show ?case using B by fastforce
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1978	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1979	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1980	next assume ?l show ?r
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1981	proof fix B::real have "open {..<ereal B}" "(-\<infinity>) : {..<ereal B}" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1982	from topological_tendstoD[OF `?l` this,unfolded eventually_sequentially]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1983	guess N .. note N=this
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1984	show "EX N. ALL n>=N. ereal B >= f n" apply(rule_tac x=N in exI) using N by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1985	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1986	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1987
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1988
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1989	lemma Lim_bounded_PInfty: assumes lim:"f ----> l" and "!!n. f n <= ereal B" shows "l ~= \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1990	proof(rule ccontr,unfold not_not) let ?B = "B + 1" assume as:"l=\<infinity>"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1991	from lim[unfolded this Lim_PInfty,rule_format,of "?B"]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1992	guess N .. note N=this[rule_format,OF le_refl]
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1993	hence "ereal ?B <= ereal B" using assms(2)[of N] by(rule order_trans)
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1994	hence "ereal ?B < ereal ?B" apply (rule le_less_trans) by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1995	thus False by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1996	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1997
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	1998
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	1999	lemma Lim_bounded_MInfty: assumes lim:"f ----> l" and "!!n. f n >= ereal B" shows "l ~= (-\<infinity>)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2000	proof(rule ccontr,unfold not_not) let ?B = "B - 1" assume as:"l=(-\<infinity>)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2001	from lim[unfolded this Lim_MInfty,rule_format,of "?B"]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2002	guess N .. note N=this[rule_format,OF le_refl]
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2003	hence "ereal B <= ereal ?B" using assms(2)[of N] order_trans[of "ereal B" "f N" "ereal(B - 1)"] by blast
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2004	thus False by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2005	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2006
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2007
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2008	lemma tendsto_explicit:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2009	"f ----> f0 <-> (ALL S. open S --> f0 : S --> (EX N. ALL n>=N. f n : S))"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2010	unfolding tendsto_def eventually_sequentially by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2011
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2012
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2013	lemma tendsto_obtains_N:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2014	assumes "f ----> f0"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2015	assumes "open S" "f0 : S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2016	obtains N where "ALL n>=N. f n : S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2017	using tendsto_explicit[of f f0] assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2018
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2019
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2020	lemma tail_same_limit:
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2021	fixes X Y N
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2022	assumes "X ----> L" "ALL n>=N. X n = Y n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2023	shows "Y ----> L"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2024	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2025	{ fix S assume "open S" and "L:S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2026	from this obtain N1 where "ALL n>=N1. X n : S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2027	using assms unfolding tendsto_def eventually_sequentially by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2028	hence "ALL n>=max N N1. Y n : S" using assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2029	hence "EX N. ALL n>=N. Y n : S" apply(rule_tac x="max N N1" in exI) by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2030	}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2031	thus ?thesis using tendsto_explicit by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2032	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2033
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2034
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2035	lemma Lim_bounded_PInfty2:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2036	assumes lim:"f ----> l" and "ALL n>=N. f n <= ereal B"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2037	shows "l ~= \<infinity>"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2038	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2039	def g == "(%n. if n>=N then f n else ereal B)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2040	hence "g ----> l" using tail_same_limit[of f l N g] lim by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2041	moreover have "!!n. g n <= ereal B" using g_def assms by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2042	ultimately show ?thesis using Lim_bounded_PInfty by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2043	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2044
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2045	lemma Lim_bounded_ereal:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2046	assumes lim:"f ----> (l :: ereal)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2047	and "ALL n>=M. f n <= C"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2048	shows "l<=C"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2049	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2050	{ assume "l=(-\<infinity>)" hence ?thesis by auto }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2051	moreover
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2052	{ assume "~(l=(-\<infinity>))"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2053	{ assume "C=\<infinity>" hence ?thesis by auto }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2054	moreover
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2055	{ assume "C=(-\<infinity>)" hence "ALL n>=M. f n = (-\<infinity>)" using assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2056	hence "l=(-\<infinity>)" using assms
41980 28b51effc5ed split Extended_Reals into parts for Library and Multivariate_Analysis hoelzl parents: 41979 diff changeset	2057	tendsto_unique[OF trivial_limit_sequentially] tail_same_limit[of "\<lambda>n. -\<infinity>" "-\<infinity>" M f, OF tendsto_const] by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2058	hence ?thesis by auto }
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2059	moreover
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2060	{ assume "EX B. C = ereal B"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2061	from this obtain B where B_def: "C=ereal B" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2062	hence "~(l=\<infinity>)" using Lim_bounded_PInfty2 assms by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2063	from this obtain m where m_def: "ereal m=l" using `~(l=(-\<infinity>))` by (cases l) auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2064	from this obtain N where N_def: "ALL n>=N. f n : {ereal(m - 1) <..< ereal(m+1)}"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2065	apply (subst tendsto_obtains_N[of f l "{ereal(m - 1) <..< ereal(m+1)}"]) using assms by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2066	{ fix n assume "n>=N"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2067	hence "EX r. ereal r = f n" using N_def by (cases "f n") auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2068	} from this obtain g where g_def: "ALL n>=N. ereal (g n) = f n" by metis
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2069	hence "(%n. ereal (g n)) ----> l" using tail_same_limit[of f l N] assms by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2070	hence *: "(%n. g n) ----> m" using m_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2071	{ fix n assume "n>=max N M"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2072	hence "ereal (g n) <= ereal B" using assms g_def B_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2073	hence "g n <= B" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2074	} hence "EX N. ALL n>=N. g n <= B" by blast
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2075	hence "m<=B" using * LIMSEQ_le_const2[of g m B] by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2076	hence ?thesis using m_def B_def by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2077	} ultimately have ?thesis by (cases C) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2078	} ultimately show ?thesis by blast
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2079	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2080
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2081	lemma real_of_ereal_mult[simp]:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2082	fixes a b :: ereal shows "real (a * b) = real a * real b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2083	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2084
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2085	lemma real_of_ereal_eq_0:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2086	fixes x :: ereal shows "real x = 0 \<longleftrightarrow> x = \<infinity> \<or> x = -\<infinity> \<or> x = 0"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2087	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2088
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2089	lemma tendsto_ereal_realD:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2090	fixes f :: "'a \<Rightarrow> ereal"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2091	assumes "x \<noteq> 0" and tendsto: "((\<lambda>x. ereal (real (f x))) ---> x) net"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2092	shows "(f ---> x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2093	proof (intro topological_tendstoI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2094	fix S assume S: "open S" "x \<in> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2095	with `x \<noteq> 0` have "open (S - {0})" "x \<in> S - {0}" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2096	from tendsto[THEN topological_tendstoD, OF this]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2097	show "eventually (\<lambda>x. f x \<in> S) net"
44142 8e27e0177518 avoid warnings about duplicate rules huffman parents: 43943 diff changeset	2098	by (rule eventually_rev_mp) (auto simp: ereal_real)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2099	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2100
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2101	lemma tendsto_ereal_realI:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2102	fixes f :: "'a \<Rightarrow> ereal"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2103	assumes x: "\<bar>x\<bar> \<noteq> \<infinity>" and tendsto: "(f ---> x) net"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2104	shows "((\<lambda>x. ereal (real (f x))) ---> x) net"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2105	proof (intro topological_tendstoI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2106	fix S assume "open S" "x \<in> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2107	with x have "open (S - {\<infinity>, -\<infinity>})" "x \<in> S - {\<infinity>, -\<infinity>}" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2108	from tendsto[THEN topological_tendstoD, OF this]
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2109	show "eventually (\<lambda>x. ereal (real (f x)) \<in> S) net"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2110	by (elim eventually_elim1) (auto simp: ereal_real)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2111	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2112
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2113	lemma ereal_mult_cancel_left:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2114	fixes a b c :: ereal shows "a * b = a * c \<longleftrightarrow>
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2115	((\<bar>a\<bar> = \<infinity> \<and> 0 < b * c) \<or> a = 0 \<or> b = c)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2116	by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2117	(simp_all add: zero_less_mult_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2118
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2119	lemma ereal_inj_affinity:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2120	fixes m t :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2121	assumes "\<bar>m\<bar> \<noteq> \<infinity>" "m \<noteq> 0" "\<bar>t\<bar> \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2122	shows "inj_on (\<lambda>x. m * x + t) A"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2123	using assms
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2124	by (cases rule: ereal2_cases[of m t])
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2125	(auto intro!: inj_onI simp: ereal_add_cancel_right ereal_mult_cancel_left)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2126
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2127	lemma ereal_PInfty_eq_plus[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2128	fixes a b :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2129	shows "\<infinity> = a + b \<longleftrightarrow> a = \<infinity> \<or> b = \<infinity>"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2130	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2131
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2132	lemma ereal_MInfty_eq_plus[simp]:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2133	fixes a b :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2134	shows "-\<infinity> = a + b \<longleftrightarrow> (a = -\<infinity> \<and> b \<noteq> \<infinity>) \<or> (b = -\<infinity> \<and> a \<noteq> \<infinity>)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2135	by (cases rule: ereal2_cases[of a b]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2136
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2137	lemma ereal_less_divide_pos:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2138	fixes x y :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2139	shows "x > 0 \<Longrightarrow> x \<noteq> \<infinity> \<Longrightarrow> y < z / x \<longleftrightarrow> x * y < z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2140	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2141
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2142	lemma ereal_divide_less_pos:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2143	fixes x y z :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2144	shows "x > 0 \<Longrightarrow> x \<noteq> \<infinity> \<Longrightarrow> y / x < z \<longleftrightarrow> y < x * z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2145	by (cases rule: ereal3_cases[of x y z]) (auto simp: field_simps)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2146
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2147	lemma ereal_divide_eq:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2148	fixes a b c :: ereal
ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2149	shows "b \<noteq> 0 \<Longrightarrow> \<bar>b\<bar> \<noteq> \<infinity> \<Longrightarrow> a / b = c \<longleftrightarrow> a = b * c"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2150	by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2151	(simp_all add: field_simps)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2152
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2153	lemma ereal_inverse_not_MInfty[simp]: "inverse (a::ereal) \<noteq> -\<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2154	by (cases a) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2155
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2156	lemma ereal_mult_m1[simp]: "x * ereal (-1) = -x"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2157	by (cases x) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2158
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2159	lemma ereal_LimI_finite:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2160	fixes x :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2161	assumes "\<bar>x\<bar> \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2162	assumes "!!r. 0 < r ==> EX N. ALL n>=N. u n < x + r & x < u n + r"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2163	shows "u ----> x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2164	proof (rule topological_tendstoI, unfold eventually_sequentially)
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2165	obtain rx where rx_def: "x=ereal rx" using assms by (cases x) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2166	fix S assume "open S" "x : S"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2167	then have "open (ereal -` S)" unfolding open_ereal_def by auto
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2168	with `x \<in> S` obtain r where "0 < r" and dist: "!!y. dist y rx < r ==> ereal y \<in> S"
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	2169	unfolding open_real_def rx_def by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2170	then obtain n where
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2171	upper: "!!N. n <= N ==> u N < x + ereal r" and
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2172	lower: "!!N. n <= N ==> x < u N + ereal r" using assms(2)[of "ereal r"] by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2173	show "EX N. ALL n>=N. u n : S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2174	proof (safe intro!: exI[of _ n])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2175	fix N assume "n <= N"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2176	from upper[OF this] lower[OF this] assms `0 < r`
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2177	have "u N ~: {\<infinity>,(-\<infinity>)}" by auto
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2178	from this obtain ra where ra_def: "(u N) = ereal ra" by (cases "u N") auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2179	hence "rx < ra + r" and "ra < rx + r"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2180	using rx_def assms `0 < r` lower[OF `n <= N`] upper[OF `n <= N`] by auto
41975 d47eabd80e59 simplified definition of open_extreal hoelzl parents: 41974 diff changeset	2181	hence "dist (real (u N)) rx < r"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2182	using rx_def ra_def
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2183	by (auto simp: dist_real_def abs_diff_less_iff field_simps)
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2184	from dist[OF this] show "u N : S" using `u N ~: {\<infinity>, -\<infinity>}`
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2185	by (auto simp: ereal_real split: split_if_asm)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2186	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2187	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2188
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2189	lemma ereal_LimI_finite_iff:
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2190	fixes x :: ereal
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2191	assumes "\<bar>x\<bar> \<noteq> \<infinity>"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2192	shows "u ----> x <-> (ALL r. 0 < r --> (EX N. ALL n>=N. u n < x + r & x < u n + r))"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2193	(is "?lhs <-> ?rhs")
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2194	proof
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2195	assume lim: "u ----> x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2196	{ fix r assume "(r::ereal)>0"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2197	from this obtain N where N_def: "ALL n>=N. u n : {x - r <..< x + r}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2198	apply (subst tendsto_obtains_N[of u x "{x - r <..< x + r}"])
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2199	using lim ereal_between[of x r] assms `r>0` by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2200	hence "EX N. ALL n>=N. u n < x + r & x < u n + r"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2201	using ereal_minus_less[of r x] by (cases r) auto
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2202	} then show "?rhs" by auto
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2203	next
3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2204	assume ?rhs then show "u ----> x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2205	using ereal_LimI_finite[of x] assms by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2206	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2207
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2208
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2209	subsubsection {* @{text Liminf} and @{text Limsup} *}
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2210
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2211	definition
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2212	"Liminf net f = (GREATEST l. \<forall>y<l. eventually (\<lambda>x. y < f x) net)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2213
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2214	definition
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2215	"Limsup net f = (LEAST l. \<forall>y>l. eventually (\<lambda>x. f x < y) net)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2216
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2217	lemma Liminf_Sup:
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2218	fixes f :: "'a => 'b::complete_linorder"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2219	shows "Liminf net f = Sup {l. \<forall>y<l. eventually (\<lambda>x. y < f x) net}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2220	by (auto intro!: Greatest_equality complete_lattice_class.Sup_upper simp: less_Sup_iff Liminf_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2221
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2222	lemma Limsup_Inf:
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2223	fixes f :: "'a => 'b::complete_linorder"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2224	shows "Limsup net f = Inf {l. \<forall>y>l. eventually (\<lambda>x. f x < y) net}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2225	by (auto intro!: Least_equality complete_lattice_class.Inf_lower simp: Inf_less_iff Limsup_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2226
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2227	lemma ereal_SupI:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2228	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2229	assumes "\<And>y. y \<in> A \<Longrightarrow> y \<le> x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2230	assumes "\<And>y. (\<And>z. z \<in> A \<Longrightarrow> z \<le> y) \<Longrightarrow> x \<le> y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2231	shows "Sup A = x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2232	unfolding Sup_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2233	using assms by (auto intro!: Least_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2234
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2235	lemma ereal_InfI:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2236	fixes x :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2237	assumes "\<And>i. i \<in> A \<Longrightarrow> x \<le> i"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2238	assumes "\<And>y. (\<And>i. i \<in> A \<Longrightarrow> y \<le> i) \<Longrightarrow> y \<le> x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2239	shows "Inf A = x"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2240	unfolding Inf_ereal_def
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2241	using assms by (auto intro!: Greatest_equality)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2242
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2243	lemma Limsup_const:
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2244	fixes c :: "'a::complete_linorder"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2245	assumes ntriv: "\<not> trivial_limit net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2246	shows "Limsup net (\<lambda>x. c) = c"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2247	unfolding Limsup_Inf
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2248	proof (safe intro!: antisym complete_lattice_class.Inf_greatest complete_lattice_class.Inf_lower)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2249	fix x assume *: "\<forall>y>x. eventually (\<lambda>_. c < y) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2250	show "c \<le> x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2251	proof (rule ccontr)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2252	assume "\<not> c \<le> x" then have "x < c" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2253	then show False using ntriv * by (auto simp: trivial_limit_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2254	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2255	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2256
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2257	lemma Liminf_const:
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2258	fixes c :: "'a::complete_linorder"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2259	assumes ntriv: "\<not> trivial_limit net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2260	shows "Liminf net (\<lambda>x. c) = c"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2261	unfolding Liminf_Sup
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2262	proof (safe intro!: antisym complete_lattice_class.Sup_least complete_lattice_class.Sup_upper)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2263	fix x assume *: "\<forall>y<x. eventually (\<lambda>_. y < c) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2264	show "x \<le> c"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2265	proof (rule ccontr)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2266	assume "\<not> x \<le> c" then have "c < x" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2267	then show False using ntriv * by (auto simp: trivial_limit_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2268	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2269	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2270
44170 510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2271	definition (in order) mono_set:
510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2272	"mono_set S \<longleftrightarrow> (\<forall>x y. x \<le> y \<longrightarrow> x \<in> S \<longrightarrow> y \<in> S)"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2273
44170 510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2274	lemma (in order) mono_greaterThan [intro, simp]: "mono_set {B<..}" unfolding mono_set by auto
510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2275	lemma (in order) mono_atLeast [intro, simp]: "mono_set {B..}" unfolding mono_set by auto
510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2276	lemma (in order) mono_UNIV [intro, simp]: "mono_set UNIV" unfolding mono_set by auto
510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2277	lemma (in order) mono_empty [intro, simp]: "mono_set {}" unfolding mono_set by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2278
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2279	lemma (in complete_linorder) mono_set_iff:
481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2280	fixes S :: "'a set"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2281	defines "a \<equiv> Inf S"
44170 510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2282	shows "mono_set S \<longleftrightarrow> (S = {a <..} \<or> S = {a..})" (is "_ = ?c")
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2283	proof
44170 510ac30f44c0 make Multivariate_Analysis work with separate set type huffman parents: 44142 diff changeset	2284	assume "mono_set S"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2285	then have mono: "\<And>x y. x \<le> y \<Longrightarrow> x \<in> S \<Longrightarrow> y \<in> S" by (auto simp: mono_set)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2286	show ?c
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2287	proof cases
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2288	assume "a \<in> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2289	show ?c
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2290	using mono[OF _ `a \<in> S`]
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2291	by (auto intro: Inf_lower simp: a_def)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2292	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2293	assume "a \<notin> S"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2294	have "S = {a <..}"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2295	proof safe
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2296	fix x assume "x \<in> S"
43941 481566bc20e4 ereal is a complete_linorder instance haftmann parents: 43933 diff changeset	2297	then have "a \<le> x" unfolding a_def by (rule Inf_lower)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2298	then show "a < x" using `x \<in> S` `a \<notin> S` by (cases "a = x") auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2299	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2300	fix x assume "a < x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2301	then obtain y where "y < x" "y \<in> S" unfolding a_def Inf_less_iff ..
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2302	with mono[of y x] show "x \<in> S" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2303	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2304	then show ?c ..
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2305	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2306	qed auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2307
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2308	lemma lim_imp_Liminf:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2309	fixes f :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2310	assumes ntriv: "\<not> trivial_limit net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2311	assumes lim: "(f ---> f0) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2312	shows "Liminf net f = f0"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2313	unfolding Liminf_Sup
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2314	proof (safe intro!: ereal_SupI)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2315	fix y assume *: "\<forall>y'<y. eventually (\<lambda>x. y' < f x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2316	show "y \<le> f0"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2317	proof (rule ereal_le_ereal)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2318	fix B assume "B < y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2319	{ assume "f0 < B"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2320	then have "eventually (\<lambda>x. f x < B \<and> B < f x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2321	using topological_tendstoD[OF lim, of "{..<B}"] *[rule_format, OF `B < y`]
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2322	by (auto intro: eventually_conj)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2323	also have "(\<lambda>x. f x < B \<and> B < f x) = (\<lambda>x. False)" by (auto simp: fun_eq_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2324	finally have False using ntriv[unfolded trivial_limit_def] by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2325	} then show "B \<le> f0" by (metis linorder_le_less_linear)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2326	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2327	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2328	fix y assume *: "\<forall>z. z \<in> {l. \<forall>y<l. eventually (\<lambda>x. y < f x) net} \<longrightarrow> z \<le> y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2329	show "f0 \<le> y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2330	proof (safe intro!: *[rule_format])
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2331	fix y assume "y < f0" then show "eventually (\<lambda>x. y < f x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2332	using lim[THEN topological_tendstoD, of "{y <..}"] by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2333	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2334	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2335
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2336	lemma ereal_Liminf_le_Limsup:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2337	fixes f :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2338	assumes ntriv: "\<not> trivial_limit net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2339	shows "Liminf net f \<le> Limsup net f"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2340	unfolding Limsup_Inf Liminf_Sup
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2341	proof (safe intro!: complete_lattice_class.Inf_greatest complete_lattice_class.Sup_least)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2342	fix u v assume *: "\<forall>y<u. eventually (\<lambda>x. y < f x) net" "\<forall>y>v. eventually (\<lambda>x. f x < y) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2343	show "u \<le> v"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2344	proof (rule ccontr)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2345	assume "\<not> u \<le> v"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2346	then obtain t where "t < u" "v < t"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2347	using ereal_dense[of v u] by (auto simp: not_le)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2348	then have "eventually (\<lambda>x. t < f x \<and> f x < t) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2349	using * by (auto intro: eventually_conj)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2350	also have "(\<lambda>x. t < f x \<and> f x < t) = (\<lambda>x. False)" by (auto simp: fun_eq_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2351	finally show False using ntriv by (auto simp: trivial_limit_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2352	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2353	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2354
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2355	lemma Liminf_mono:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2356	fixes f g :: "'a => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2357	assumes ev: "eventually (\<lambda>x. f x \<le> g x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2358	shows "Liminf net f \<le> Liminf net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2359	unfolding Liminf_Sup
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2360	proof (safe intro!: Sup_mono bexI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2361	fix a y assume "\<forall>y<a. eventually (\<lambda>x. y < f x) net" and "y < a"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2362	then have "eventually (\<lambda>x. y < f x) net" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2363	then show "eventually (\<lambda>x. y < g x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2364	by (rule eventually_rev_mp) (rule eventually_mono[OF _ ev], auto)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2365	qed simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2366
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2367	lemma Liminf_eq:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2368	fixes f g :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2369	assumes "eventually (\<lambda>x. f x = g x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2370	shows "Liminf net f = Liminf net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2371	by (intro antisym Liminf_mono eventually_mono[OF _ assms]) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2372
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2373	lemma Liminf_mono_all:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2374	fixes f g :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2375	assumes "\<And>x. f x \<le> g x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2376	shows "Liminf net f \<le> Liminf net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2377	using assms by (intro Liminf_mono always_eventually) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2378
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2379	lemma Limsup_mono:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2380	fixes f g :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2381	assumes ev: "eventually (\<lambda>x. f x \<le> g x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2382	shows "Limsup net f \<le> Limsup net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2383	unfolding Limsup_Inf
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2384	proof (safe intro!: Inf_mono bexI)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2385	fix a y assume "\<forall>y>a. eventually (\<lambda>x. g x < y) net" and "a < y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2386	then have "eventually (\<lambda>x. g x < y) net" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2387	then show "eventually (\<lambda>x. f x < y) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2388	by (rule eventually_rev_mp) (rule eventually_mono[OF _ ev], auto)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2389	qed simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2390
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2391	lemma Limsup_mono_all:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2392	fixes f g :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2393	assumes "\<And>x. f x \<le> g x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2394	shows "Limsup net f \<le> Limsup net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2395	using assms by (intro Limsup_mono always_eventually) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2396
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2397	lemma Limsup_eq:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2398	fixes f g :: "'a \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2399	assumes "eventually (\<lambda>x. f x = g x) net"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2400	shows "Limsup net f = Limsup net g"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2401	by (intro antisym Limsup_mono eventually_mono[OF _ assms]) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2402
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2403	abbreviation "liminf \<equiv> Liminf sequentially"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2404
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2405	abbreviation "limsup \<equiv> Limsup sequentially"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2406
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2407	lemma liminf_SUPR_INFI:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2408	fixes f :: "nat \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2409	shows "liminf f = (SUP n. INF m:{n..}. f m)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2410	unfolding Liminf_Sup eventually_sequentially
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2411	proof (safe intro!: antisym complete_lattice_class.Sup_least)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2412	fix x assume *: "\<forall>y<x. \<exists>N. \<forall>n\<ge>N. y < f n" show "x \<le> (SUP n. INF m:{n..}. f m)"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2413	proof (rule ereal_le_ereal)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2414	fix y assume "y < x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2415	with * obtain N where "\<And>n. N \<le> n \<Longrightarrow> y < f n" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2416	then have "y \<le> (INF m:{N..}. f m)" by (force simp: le_INF_iff)
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2417	also have "\<dots> \<le> (SUP n. INF m:{n..}. f m)" by (intro SUP_upper) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2418	finally show "y \<le> (SUP n. INF m:{n..}. f m)" .
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2419	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2420	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2421	show "(SUP n. INF m:{n..}. f m) \<le> Sup {l. \<forall>y<l. \<exists>N. \<forall>n\<ge>N. y < f n}"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2422	proof (unfold SUP_def, safe intro!: Sup_mono bexI)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2423	fix y n assume "y < INFI {n..} f"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2424	from less_INF_D[OF this] show "\<exists>N. \<forall>n\<ge>N. y < f n" by (intro exI[of _ n]) auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2425	qed (rule order_refl)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2426	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2427
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2428	lemma tail_same_limsup:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2429	fixes X Y :: "nat => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2430	assumes "\<And>n. N \<le> n \<Longrightarrow> X n = Y n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2431	shows "limsup X = limsup Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2432	using Limsup_eq[of X Y sequentially] eventually_sequentially assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2433
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2434	lemma tail_same_liminf:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2435	fixes X Y :: "nat => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2436	assumes "\<And>n. N \<le> n \<Longrightarrow> X n = Y n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2437	shows "liminf X = liminf Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2438	using Liminf_eq[of X Y sequentially] eventually_sequentially assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2439
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2440	lemma liminf_mono:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2441	fixes X Y :: "nat \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2442	assumes "\<And>n. N \<le> n \<Longrightarrow> X n <= Y n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2443	shows "liminf X \<le> liminf Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2444	using Liminf_mono[of X Y sequentially] eventually_sequentially assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2445
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2446	lemma limsup_mono:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2447	fixes X Y :: "nat => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2448	assumes "\<And>n. N \<le> n \<Longrightarrow> X n <= Y n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2449	shows "limsup X \<le> limsup Y"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2450	using Limsup_mono[of X Y sequentially] eventually_sequentially assms by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2451
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2452	lemma
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2453	fixes X :: "nat \<Rightarrow> ereal"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2454	shows ereal_incseq_uminus[simp]: "incseq (\<lambda>i. - X i) = decseq X"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2455	and ereal_decseq_uminus[simp]: "decseq (\<lambda>i. - X i) = incseq X"
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2456	unfolding incseq_def decseq_def by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2457
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2458	lemma liminf_bounded:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2459	fixes X Y :: "nat \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2460	assumes "\<And>n. N \<le> n \<Longrightarrow> C \<le> X n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2461	shows "C \<le> liminf X"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2462	using liminf_mono[of N "\<lambda>n. C" X] assms Liminf_const[of sequentially C] by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2463
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2464	lemma limsup_bounded:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2465	fixes X Y :: "nat => ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2466	assumes "\<And>n. N \<le> n \<Longrightarrow> X n <= C"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2467	shows "limsup X \<le> C"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2468	using limsup_mono[of N X "\<lambda>n. C"] assms Limsup_const[of sequentially C] by simp
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2469
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2470	lemma liminf_bounded_iff:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2471	fixes x :: "nat \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2472	shows "C \<le> liminf x \<longleftrightarrow> (\<forall>B<C. \<exists>N. \<forall>n\<ge>N. B < x n)" (is "?lhs <-> ?rhs")
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2473	proof safe
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2474	fix B assume "B < C" "C \<le> liminf x"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2475	then have "B < liminf x" by auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2476	then obtain N where "B < (INF m:{N..}. x m)"
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2477	unfolding liminf_SUPR_INFI SUP_def less_Sup_iff by auto
7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2478	from less_INF_D[OF this] show "\<exists>N. \<forall>n\<ge>N. B < x n" by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2479	next
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2480	assume *: "\<forall>B<C. \<exists>N. \<forall>n\<ge>N. B < x n"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2481	{ fix B assume "B<C"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2482	then obtain N where "\<forall>n\<ge>N. B < x n" using `?rhs` by auto
44928 7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2483	hence "B \<le> (INF m:{N..}. x m)" by (intro INF_greatest) auto
7ef6505bde7f renamed Complete_Lattices lemmas, removed legacy names hoelzl parents: 44918 diff changeset	2484	also have "... \<le> liminf x" unfolding liminf_SUPR_INFI by (intro SUP_upper) simp
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2485	finally have "B \<le> liminf x" .
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2486	} then show "?lhs" by (metis * leD liminf_bounded linorder_le_less_linear)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2487	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2488
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2489	lemma liminf_subseq_mono:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2490	fixes X :: "nat \<Rightarrow> ereal"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2491	assumes "subseq r"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2492	shows "liminf X \<le> liminf (X \<circ> r) "
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2493	proof-
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2494	have "\<And>n. (INF m:{n..}. X m) \<le> (INF m:{n..}. (X \<circ> r) m)"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2495	proof (safe intro!: INF_mono)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2496	fix n m :: nat assume "n \<le> m" then show "\<exists>ma\<in>{n..}. X ma \<le> (X \<circ> r) m"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2497	using seq_suble[OF `subseq r`, of m] by (intro bexI[of _ "r m"]) auto
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2498	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2499	then show ?thesis by (auto intro!: SUP_mono simp: liminf_SUPR_INFI comp_def)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2500	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2501
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2502	lemma ereal_real': assumes "\<bar>x\<bar> \<noteq> \<infinity>" shows "ereal (real x) = x"
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2503	using assms by auto
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2504
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2505	lemma ereal_le_ereal_bounded:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2506	fixes x y z :: ereal
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2507	assumes "z \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2508	assumes *: "\<And>B. z < B \<Longrightarrow> B < x \<Longrightarrow> B \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2509	shows "x \<le> y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2510	proof (rule ereal_le_ereal)
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2511	fix B assume "B < x"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2512	show "B \<le> y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2513	proof cases
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2514	assume "z < B" from *[OF this `B < x`] show "B \<le> y" .
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2515	next
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2516	assume "\<not> z < B" with `z \<le> y` show "B \<le> y" by auto
41976 3fdbc7d5b525 use abs_extreal hoelzl parents: 41975 diff changeset	2517	qed
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2518	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2519
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2520	lemma fixes x y :: ereal
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2521	shows Sup_atMost[simp]: "Sup {.. y} = y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2522	and Sup_lessThan[simp]: "Sup {..< y} = y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2523	and Sup_atLeastAtMost[simp]: "x \<le> y \<Longrightarrow> Sup { x .. y} = y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2524	and Sup_greaterThanAtMost[simp]: "x < y \<Longrightarrow> Sup { x <.. y} = y"
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2525	and Sup_atLeastLessThan[simp]: "x < y \<Longrightarrow> Sup { x ..< y} = y"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2526	by (auto simp: Sup_ereal_def intro!: Least_equality
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2527	intro: ereal_le_ereal ereal_le_ereal_bounded[of x])
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2528
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2529	lemma Sup_greaterThanlessThan[simp]:
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2530	fixes x y :: ereal assumes "x < y" shows "Sup { x <..< y} = y"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2531	unfolding Sup_ereal_def
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2532	proof (intro Least_equality ereal_le_ereal_bounded[of _ _ y])
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2533	fix z assume z: "\<forall>u\<in>{x<..<y}. u \<le> z"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2534	from ereal_dense[OF `x < y`] guess w .. note w = this
41978 656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2535	with z[THEN bspec, of w] show "x \<le> z" by auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2536	qed auto
656298577a33 add infinite sums and power on extreal hoelzl parents: 41977 diff changeset	2537
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2538	lemma real_ereal_id: "real o ereal = id"
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2539	proof-
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2540	{ fix x have "(real o ereal) x = id x" by auto }
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2541	from this show ?thesis using ext by blast
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2542	qed
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2543
43923 ab93d0190a5d add ereal to typeclass infinity hoelzl parents: 43920 diff changeset	2544	lemma open_image_ereal: "open(UNIV-{ \<infinity> , (-\<infinity> :: ereal)})"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2545	by (metis range_ereal open_ereal open_UNIV)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2546
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2547	lemma ereal_le_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2548	fixes a b c :: ereal shows "c * (a + b) \<le> c * a + c * b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2549	by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2550	(auto simp add: field_simps not_le mult_le_0_iff mult_less_0_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2551
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2552	lemma ereal_pos_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2553	fixes a b c :: ereal assumes "0 \<le> c" "c \<noteq> \<infinity>" shows "c * (a + b) = c * a + c * b"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2554	using assms by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2555	(auto simp add: field_simps not_le mult_le_0_iff mult_less_0_iff)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2556
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2557	lemma ereal_pos_le_distrib:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2558	fixes a b c :: ereal
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2559	assumes "c>=0"
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2560	shows "c * (a + b) <= c * a + c * b"
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2561	using assms by (cases rule: ereal3_cases[of a b c])
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2562	(auto simp add: field_simps)
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2563
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2564	lemma ereal_max_mono:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2565	"[\| (a::ereal) <= b; c <= d \|] ==> max a c <= max b d"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2566	by (metis sup_ereal_def sup_mono)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2567
15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2568
43920 cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2569	lemma ereal_max_least:
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2570	"[\| (a::ereal) <= x; c <= x \|] ==> max a c <= x"
cedb5cb948fd Rename extreal => ereal hoelzl parents: 43138 diff changeset	2571	by (metis sup_ereal_def sup_least)
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2572
43933 6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2573	subsubsection {* Tests for code generator *}
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2574
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2575	(* A small list of simple arithmetic expressions *)
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2576
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2577	value [code] "- \<infinity> :: ereal"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2578	value [code] "\<bar>-\<infinity>\<bar> :: ereal"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2579	value [code] "4 + 5 / 4 - ereal 2 :: ereal"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2580	value [code] "ereal 3 < \<infinity>"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2581	value [code] "real (\<infinity>::ereal) = 0"
6cc1875cf35d add code generator setup and tests for ereal hoelzl parents: 43924 diff changeset	2582
41973 15927c040731 add Extended_Reals from AFP/Lower_Semicontinuous hoelzl parents: diff changeset	2583	end

author	bulwahn
	Tue, 10 Jan 2012 15:48:10 +0100
changeset 46171	19f68d7671f0
parent 45934	9321cd2572fe
child 47082	737d7bc8e50f
permissions	-rw-r--r--