| author | wenzelm |
| Sat, 14 Jan 2012 12:36:43 +0100 | |
| changeset 46204 | df1369a42393 |
| parent 44928 | 7ef6505bde7f |
| child 46731 | 5302e932d1e5 |
| permissions | -rw-r--r-- |
| 42067 | 1 |
(* Title: HOL/Probability/Lebesgue_Measure.thy |
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Author: Johannes Hölzl, TU München |
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Author: Robert Himmelmann, TU München |
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*) |
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header {* Lebsegue measure *}
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theory Lebesgue_Measure |
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split Product_Measure into Binary_Product_Measure and Finite_Product_Measure
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imports Finite_Product_Measure |
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begin |
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subsection {* Standard Cubes *}
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definition cube :: "nat \<Rightarrow> 'a::ordered_euclidean_space set" where |
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"cube n \<equiv> {\<chi>\<chi> i. - real n .. \<chi>\<chi> i. real n}"
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lemma cube_closed[intro]: "closed (cube n)" |
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unfolding cube_def by auto |
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lemma cube_subset[intro]: "n \<le> N \<Longrightarrow> cube n \<subseteq> cube N" |
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by (fastforce simp: eucl_le[where 'a='a] cube_def) |
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lemma cube_subset_iff: |
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"cube n \<subseteq> cube N \<longleftrightarrow> n \<le> N" |
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proof |
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assume subset: "cube n \<subseteq> (cube N::'a set)" |
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then have "((\<chi>\<chi> i. real n)::'a) \<in> cube N" |
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using DIM_positive[where 'a='a] |
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by (fastforce simp: cube_def eucl_le[where 'a='a]) |
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then show "n \<le> N" |
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by (fastforce simp: cube_def eucl_le[where 'a='a]) |
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next |
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assume "n \<le> N" then show "cube n \<subseteq> (cube N::'a set)" by (rule cube_subset) |
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qed |
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lemma ball_subset_cube:"ball (0::'a::ordered_euclidean_space) (real n) \<subseteq> cube n" |
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unfolding cube_def subset_eq mem_interval apply safe unfolding euclidean_lambda_beta' |
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proof- fix x::'a and i assume as:"x\<in>ball 0 (real n)" "i<DIM('a)"
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thus "- real n \<le> x $$ i" "real n \<ge> x $$ i" |
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using component_le_norm[of x i] by(auto simp: dist_norm) |
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qed |
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lemma mem_big_cube: obtains n where "x \<in> cube n" |
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proof- from reals_Archimedean2[of "norm x"] guess n .. |
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thus ?thesis apply-apply(rule that[where n=n]) |
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apply(rule ball_subset_cube[unfolded subset_eq,rule_format]) |
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by (auto simp add:dist_norm) |
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qed |
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lemma cube_subset_Suc[intro]: "cube n \<subseteq> cube (Suc n)" |
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unfolding cube_def_raw subset_eq apply safe unfolding mem_interval by auto |
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subsection {* Lebesgue measure *}
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prefer p2e before e2p; use measure_unique_Int_stable_vimage;
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definition lebesgue :: "'a::ordered_euclidean_space measure_space" where |
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"lebesgue = \<lparr> space = UNIV, |
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sets = {A. \<forall>n. (indicator A :: 'a \<Rightarrow> real) integrable_on cube n},
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measure = \<lambda>A. SUP n. ereal (integral (cube n) (indicator A)) \<rparr>" |
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lemma space_lebesgue[simp]: "space lebesgue = UNIV" |
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unfolding lebesgue_def by simp |
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lemma lebesgueD: "A \<in> sets lebesgue \<Longrightarrow> (indicator A :: _ \<Rightarrow> real) integrable_on cube n" |
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unfolding lebesgue_def by simp |
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lemma lebesgueI: "(\<And>n. (indicator A :: _ \<Rightarrow> real) integrable_on cube n) \<Longrightarrow> A \<in> sets lebesgue" |
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unfolding lebesgue_def by simp |
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lemma absolutely_integrable_on_indicator[simp]: |
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fixes A :: "'a::ordered_euclidean_space set" |
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shows "((indicator A :: _ \<Rightarrow> real) absolutely_integrable_on X) \<longleftrightarrow> |
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(indicator A :: _ \<Rightarrow> real) integrable_on X" |
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unfolding absolutely_integrable_on_def by simp |
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lemma LIMSEQ_indicator_UN: |
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"(\<lambda>k. indicator (\<Union> i<k. A i) x) ----> (indicator (\<Union>i. A i) x :: real)" |
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proof cases |
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assume "\<exists>i. x \<in> A i" then guess i .. note i = this |
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then have *: "\<And>n. (indicator (\<Union> i<n + Suc i. A i) x :: real) = 1" |
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"(indicator (\<Union> i. A i) x :: real) = 1" by (auto simp: indicator_def) |
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show ?thesis |
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apply (rule LIMSEQ_offset[of _ "Suc i"]) unfolding * by auto |
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qed (auto simp: indicator_def) |
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lemma indicator_add: |
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"A \<inter> B = {} \<Longrightarrow> (indicator A x::_::monoid_add) + indicator B x = indicator (A \<union> B) x"
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unfolding indicator_def by auto |
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interpretation lebesgue: sigma_algebra lebesgue |
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proof (intro sigma_algebra_iff2[THEN iffD2] conjI allI ballI impI lebesgueI) |
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fix A n assume A: "A \<in> sets lebesgue" |
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have "indicator (space lebesgue - A) = (\<lambda>x. 1 - indicator A x :: real)" |
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by (auto simp: fun_eq_iff indicator_def) |
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then show "(indicator (space lebesgue - A) :: _ \<Rightarrow> real) integrable_on cube n" |
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using A by (auto intro!: integrable_sub dest: lebesgueD simp: cube_def) |
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next |
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fix n show "(indicator {} :: _\<Rightarrow>real) integrable_on cube n"
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by (auto simp: cube_def indicator_def_raw) |
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next |
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fix A :: "nat \<Rightarrow> 'a set" and n ::nat assume "range A \<subseteq> sets lebesgue" |
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then have A: "\<And>i. (indicator (A i) :: _ \<Rightarrow> real) integrable_on cube n" |
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by (auto dest: lebesgueD) |
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show "(indicator (\<Union>i. A i) :: _ \<Rightarrow> real) integrable_on cube n" (is "?g integrable_on _") |
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proof (intro dominated_convergence[where g="?g"] ballI) |
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fix k show "(indicator (\<Union>i<k. A i) :: _ \<Rightarrow> real) integrable_on cube n" |
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proof (induct k) |
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case (Suc k) |
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have *: "(\<Union> i<Suc k. A i) = (\<Union> i<k. A i) \<union> A k" |
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unfolding lessThan_Suc UN_insert by auto |
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have *: "(\<lambda>x. max (indicator (\<Union> i<k. A i) x) (indicator (A k) x) :: real) = |
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indicator (\<Union> i<Suc k. A i)" (is "(\<lambda>x. max (?f x) (?g x)) = _") |
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by (auto simp: fun_eq_iff * indicator_def) |
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show ?case |
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using absolutely_integrable_max[of ?f "cube n" ?g] A Suc by (simp add: *) |
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qed auto |
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qed (auto intro: LIMSEQ_indicator_UN simp: cube_def) |
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qed simp |
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interpretation lebesgue: measure_space lebesgue |
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proof |
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have *: "indicator {} = (\<lambda>x. 0 :: real)" by (simp add: fun_eq_iff)
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show "positive lebesgue (measure lebesgue)" |
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proof (unfold positive_def, safe) |
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show "measure lebesgue {} = 0" by (simp add: integral_0 * lebesgue_def)
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fix A assume "A \<in> sets lebesgue" |
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then show "0 \<le> measure lebesgue A" |
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unfolding lebesgue_def |
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by (auto intro!: SUP_upper2 integral_nonneg) |
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qed |
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next |
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show "countably_additive lebesgue (measure lebesgue)" |
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proof (intro countably_additive_def[THEN iffD2] allI impI) |
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fix A :: "nat \<Rightarrow> 'b set" assume rA: "range A \<subseteq> sets lebesgue" "disjoint_family A" |
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then have A[simp, intro]: "\<And>i n. (indicator (A i) :: _ \<Rightarrow> real) integrable_on cube n" |
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by (auto dest: lebesgueD) |
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let "?m n i" = "integral (cube n) (indicator (A i) :: _\<Rightarrow>real)" |
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let "?M n I" = "integral (cube n) (indicator (\<Union>i\<in>I. A i) :: _\<Rightarrow>real)" |
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have nn[simp, intro]: "\<And>i n. 0 \<le> ?m n i" by (auto intro!: integral_nonneg) |
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assume "(\<Union>i. A i) \<in> sets lebesgue" |
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then have UN_A[simp, intro]: "\<And>i n. (indicator (\<Union>i. A i) :: _ \<Rightarrow> real) integrable_on cube n" |
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by (auto dest: lebesgueD) |
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show "(\<Sum>n. measure lebesgue (A n)) = measure lebesgue (\<Union>i. A i)" |
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proof (simp add: lebesgue_def, subst suminf_SUP_eq, safe intro!: incseq_SucI) |
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fix i n show "ereal (?m n i) \<le> ereal (?m (Suc n) i)" |
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using cube_subset[of n "Suc n"] by (auto intro!: integral_subset_le incseq_SucI) |
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next |
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fix i n show "0 \<le> ereal (?m n i)" |
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using rA unfolding lebesgue_def |
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by (auto intro!: SUP_upper2 integral_nonneg) |
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next |
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show "(SUP n. \<Sum>i. ereal (?m n i)) = (SUP n. ereal (?M n UNIV))" |
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proof (intro arg_cong[where f="SUPR UNIV"] ext sums_unique[symmetric] sums_ereal[THEN iffD2] sums_def[THEN iffD2]) |
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fix n |
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have "\<And>m. (UNION {..<m} A) \<in> sets lebesgue" using rA by auto
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from lebesgueD[OF this] |
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have "(\<lambda>m. ?M n {..< m}) ----> ?M n UNIV"
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(is "(\<lambda>m. integral _ (?A m)) ----> ?I") |
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by (intro dominated_convergence(2)[where f="?A" and h="\<lambda>x. 1::real"]) |
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(auto intro: LIMSEQ_indicator_UN simp: cube_def) |
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moreover |
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{ fix m have *: "(\<Sum>x<m. ?m n x) = ?M n {..< m}"
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proof (induct m) |
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case (Suc m) |
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have "(\<Union>i<m. A i) \<in> sets lebesgue" using rA by auto |
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then have "(indicator (\<Union>i<m. A i) :: _\<Rightarrow>real) integrable_on (cube n)" |
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by (auto dest!: lebesgueD) |
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moreover |
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have "(\<Union>i<m. A i) \<inter> A m = {}"
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using rA(2)[unfolded disjoint_family_on_def, THEN bspec, of m] |
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by auto |
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then have "\<And>x. indicator (\<Union>i<Suc m. A i) x = |
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indicator (\<Union>i<m. A i) x + (indicator (A m) x :: real)" |
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by (auto simp: indicator_add lessThan_Suc ac_simps) |
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ultimately show ?case |
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using Suc A by (simp add: integral_add[symmetric]) |
|
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qed auto } |
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ultimately show "(\<lambda>m. \<Sum>x = 0..<m. ?m n x) ----> ?M n UNIV" |
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by (simp add: atLeast0LessThan) |
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qed |
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qed |
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qed |
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qed |
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lemma has_integral_interval_cube: |
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fixes a b :: "'a::ordered_euclidean_space" |
|
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shows "(indicator {a .. b} has_integral
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content ({\<chi>\<chi> i. max (- real n) (a $$ i) .. \<chi>\<chi> i. min (real n) (b $$ i)} :: 'a set)) (cube n)"
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(is "(?I has_integral content ?R) (cube n)") |
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proof - |
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let "{?N .. ?P}" = ?R
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have [simp]: "(\<lambda>x. if x \<in> cube n then ?I x else 0) = indicator ?R" |
|
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by (auto simp: indicator_def cube_def fun_eq_iff eucl_le[where 'a='a]) |
|
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have "(?I has_integral content ?R) (cube n) \<longleftrightarrow> (indicator ?R has_integral content ?R) UNIV" |
|
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unfolding has_integral_restrict_univ[where s="cube n", symmetric] by simp |
|
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also have "\<dots> \<longleftrightarrow> ((\<lambda>x. 1) has_integral content ?R) ?R" |
|
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unfolding indicator_def_raw has_integral_restrict_univ .. |
|
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finally show ?thesis |
|
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using has_integral_const[of "1::real" "?N" "?P"] by simp |
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qed |
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lemma lebesgueI_borel[intro, simp]: |
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fixes s::"'a::ordered_euclidean_space set" |
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assumes "s \<in> sets borel" shows "s \<in> sets lebesgue" |
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proof - |
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let ?S = "range (\<lambda>(a, b). {a .. (b :: 'a\<Colon>ordered_euclidean_space)})"
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|
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have *:"?S \<subseteq> sets lebesgue" |
|
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proof (safe intro!: lebesgueI) |
|
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fix n :: nat and a b :: 'a |
|
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let ?N = "\<chi>\<chi> i. max (- real n) (a $$ i)" |
|
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let ?P = "\<chi>\<chi> i. min (real n) (b $$ i)" |
|
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show "(indicator {a..b} :: 'a\<Rightarrow>real) integrable_on cube n"
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|
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unfolding integrable_on_def |
|
213 |
using has_integral_interval_cube[of a b] by auto |
|
214 |
qed |
|
| 40859 | 215 |
have "s \<in> sigma_sets UNIV ?S" using assms |
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unfolding borel_eq_atLeastAtMost by (simp add: sigma_def) |
|
217 |
thus ?thesis |
|
218 |
using lebesgue.sigma_subset[of "\<lparr> space = UNIV, sets = ?S\<rparr>", simplified, OF *] |
|
219 |
by (auto simp: sigma_def) |
|
| 38656 | 220 |
qed |
221 |
||
| 40859 | 222 |
lemma lebesgueI_negligible[dest]: fixes s::"'a::ordered_euclidean_space set" |
223 |
assumes "negligible s" shows "s \<in> sets lebesgue" |
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| 41654 | 224 |
using assms by (force simp: cube_def integrable_on_def negligible_def intro!: lebesgueI) |
| 38656 | 225 |
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| 41654 | 226 |
lemma lmeasure_eq_0: |
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227 |
fixes S :: "'a::ordered_euclidean_space set" assumes "negligible S" shows "lebesgue.\<mu> S = 0" |
| 40859 | 228 |
proof - |
| 41654 | 229 |
have "\<And>n. integral (cube n) (indicator S :: 'a\<Rightarrow>real) = 0" |
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changeset
|
230 |
unfolding lebesgue_integral_def using assms |
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231 |
by (intro integral_unique some1_equality ex_ex1I) |
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232 |
(auto simp: cube_def negligible_def) |
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|
233 |
then show ?thesis by (auto simp: lebesgue_def) |
| 40859 | 234 |
qed |
235 |
||
236 |
lemma lmeasure_iff_LIMSEQ: |
|
237 |
assumes "A \<in> sets lebesgue" "0 \<le> m" |
|
| 43920 | 238 |
shows "lebesgue.\<mu> A = ereal m \<longleftrightarrow> (\<lambda>n. integral (cube n) (indicator A :: _ \<Rightarrow> real)) ----> m" |
|
41689
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the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
239 |
proof (simp add: lebesgue_def, intro SUP_eq_LIMSEQ) |
| 41654 | 240 |
show "mono (\<lambda>n. integral (cube n) (indicator A::_=>real))" |
241 |
using cube_subset assms by (intro monoI integral_subset_le) (auto dest!: lebesgueD) |
|
|
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|
242 |
qed |
| 38656 | 243 |
|
| 41654 | 244 |
lemma has_integral_indicator_UNIV: |
245 |
fixes s A :: "'a::ordered_euclidean_space set" and x :: real |
|
246 |
shows "((indicator (s \<inter> A) :: 'a\<Rightarrow>real) has_integral x) UNIV = ((indicator s :: _\<Rightarrow>real) has_integral x) A" |
|
247 |
proof - |
|
248 |
have "(\<lambda>x. if x \<in> A then indicator s x else 0) = (indicator (s \<inter> A) :: _\<Rightarrow>real)" |
|
249 |
by (auto simp: fun_eq_iff indicator_def) |
|
250 |
then show ?thesis |
|
251 |
unfolding has_integral_restrict_univ[where s=A, symmetric] by simp |
|
| 40859 | 252 |
qed |
| 38656 | 253 |
|
| 41654 | 254 |
lemma |
255 |
fixes s a :: "'a::ordered_euclidean_space set" |
|
256 |
shows integral_indicator_UNIV: |
|
257 |
"integral UNIV (indicator (s \<inter> A) :: 'a\<Rightarrow>real) = integral A (indicator s :: _\<Rightarrow>real)" |
|
258 |
and integrable_indicator_UNIV: |
|
259 |
"(indicator (s \<inter> A) :: 'a\<Rightarrow>real) integrable_on UNIV \<longleftrightarrow> (indicator s :: 'a\<Rightarrow>real) integrable_on A" |
|
260 |
unfolding integral_def integrable_on_def has_integral_indicator_UNIV by auto |
|
261 |
||
262 |
lemma lmeasure_finite_has_integral: |
|
263 |
fixes s :: "'a::ordered_euclidean_space set" |
|
| 43920 | 264 |
assumes "s \<in> sets lebesgue" "lebesgue.\<mu> s = ereal m" "0 \<le> m" |
| 41654 | 265 |
shows "(indicator s has_integral m) UNIV" |
266 |
proof - |
|
267 |
let ?I = "indicator :: 'a set \<Rightarrow> 'a \<Rightarrow> real" |
|
268 |
have **: "(?I s) integrable_on UNIV \<and> (\<lambda>k. integral UNIV (?I (s \<inter> cube k))) ----> integral UNIV (?I s)" |
|
269 |
proof (intro monotone_convergence_increasing allI ballI) |
|
270 |
have LIMSEQ: "(\<lambda>n. integral (cube n) (?I s)) ----> m" |
|
271 |
using assms(2) unfolding lmeasure_iff_LIMSEQ[OF assms(1, 3)] . |
|
272 |
{ fix n have "integral (cube n) (?I s) \<le> m"
|
|
273 |
using cube_subset assms |
|
274 |
by (intro incseq_le[where L=m] LIMSEQ incseq_def[THEN iffD2] integral_subset_le allI impI) |
|
275 |
(auto dest!: lebesgueD) } |
|
276 |
moreover |
|
277 |
{ fix n have "0 \<le> integral (cube n) (?I s)"
|
|
278 |
using assms by (auto dest!: lebesgueD intro!: integral_nonneg) } |
|
279 |
ultimately |
|
280 |
show "bounded {integral UNIV (?I (s \<inter> cube k)) |k. True}"
|
|
281 |
unfolding bounded_def |
|
282 |
apply (rule_tac exI[of _ 0]) |
|
283 |
apply (rule_tac exI[of _ m]) |
|
284 |
by (auto simp: dist_real_def integral_indicator_UNIV) |
|
285 |
fix k show "?I (s \<inter> cube k) integrable_on UNIV" |
|
286 |
unfolding integrable_indicator_UNIV using assms by (auto dest!: lebesgueD) |
|
287 |
fix x show "?I (s \<inter> cube k) x \<le> ?I (s \<inter> cube (Suc k)) x" |
|
288 |
using cube_subset[of k "Suc k"] by (auto simp: indicator_def) |
|
289 |
next |
|
290 |
fix x :: 'a |
|
291 |
from mem_big_cube obtain k where k: "x \<in> cube k" . |
|
292 |
{ fix n have "?I (s \<inter> cube (n + k)) x = ?I s x"
|
|
293 |
using k cube_subset[of k "n + k"] by (auto simp: indicator_def) } |
|
294 |
note * = this |
|
295 |
show "(\<lambda>k. ?I (s \<inter> cube k) x) ----> ?I s x" |
|
296 |
by (rule LIMSEQ_offset[where k=k]) (auto simp: *) |
|
297 |
qed |
|
298 |
note ** = conjunctD2[OF this] |
|
299 |
have m: "m = integral UNIV (?I s)" |
|
300 |
apply (intro LIMSEQ_unique[OF _ **(2)]) |
|
301 |
using assms(2) unfolding lmeasure_iff_LIMSEQ[OF assms(1,3)] integral_indicator_UNIV . |
|
302 |
show ?thesis |
|
303 |
unfolding m by (intro integrable_integral **) |
|
| 38656 | 304 |
qed |
305 |
||
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
306 |
lemma lmeasure_finite_integrable: assumes s: "s \<in> sets lebesgue" and "lebesgue.\<mu> s \<noteq> \<infinity>" |
| 41654 | 307 |
shows "(indicator s :: _ \<Rightarrow> real) integrable_on UNIV" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
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41661
diff
changeset
|
308 |
proof (cases "lebesgue.\<mu> s") |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
309 |
case (real m) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
310 |
with lmeasure_finite_has_integral[OF `s \<in> sets lebesgue` this] |
|
cdf7693bbe08
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parents:
41831
diff
changeset
|
311 |
lebesgue.positive_measure[OF s] |
| 41654 | 312 |
show ?thesis unfolding integrable_on_def by auto |
|
41981
cdf7693bbe08
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hoelzl
parents:
41831
diff
changeset
|
313 |
qed (insert assms lebesgue.positive_measure[OF s], auto) |
| 38656 | 314 |
|
| 41654 | 315 |
lemma has_integral_lebesgue: assumes "((indicator s :: _\<Rightarrow>real) has_integral m) UNIV" |
316 |
shows "s \<in> sets lebesgue" |
|
317 |
proof (intro lebesgueI) |
|
318 |
let ?I = "indicator :: 'a set \<Rightarrow> 'a \<Rightarrow> real" |
|
319 |
fix n show "(?I s) integrable_on cube n" unfolding cube_def |
|
320 |
proof (intro integrable_on_subinterval) |
|
321 |
show "(?I s) integrable_on UNIV" |
|
322 |
unfolding integrable_on_def using assms by auto |
|
323 |
qed auto |
|
| 38656 | 324 |
qed |
325 |
||
| 41654 | 326 |
lemma has_integral_lmeasure: assumes "((indicator s :: _\<Rightarrow>real) has_integral m) UNIV" |
| 43920 | 327 |
shows "lebesgue.\<mu> s = ereal m" |
| 41654 | 328 |
proof (intro lmeasure_iff_LIMSEQ[THEN iffD2]) |
329 |
let ?I = "indicator :: 'a set \<Rightarrow> 'a \<Rightarrow> real" |
|
330 |
show "s \<in> sets lebesgue" using has_integral_lebesgue[OF assms] . |
|
331 |
show "0 \<le> m" using assms by (rule has_integral_nonneg) auto |
|
332 |
have "(\<lambda>n. integral UNIV (?I (s \<inter> cube n))) ----> integral UNIV (?I s)" |
|
333 |
proof (intro dominated_convergence(2) ballI) |
|
334 |
show "(?I s) integrable_on UNIV" unfolding integrable_on_def using assms by auto |
|
335 |
fix n show "?I (s \<inter> cube n) integrable_on UNIV" |
|
336 |
unfolding integrable_indicator_UNIV using `s \<in> sets lebesgue` by (auto dest: lebesgueD) |
|
337 |
fix x show "norm (?I (s \<inter> cube n) x) \<le> ?I s x" by (auto simp: indicator_def) |
|
338 |
next |
|
339 |
fix x :: 'a |
|
340 |
from mem_big_cube obtain k where k: "x \<in> cube k" . |
|
341 |
{ fix n have "?I (s \<inter> cube (n + k)) x = ?I s x"
|
|
342 |
using k cube_subset[of k "n + k"] by (auto simp: indicator_def) } |
|
343 |
note * = this |
|
344 |
show "(\<lambda>k. ?I (s \<inter> cube k) x) ----> ?I s x" |
|
345 |
by (rule LIMSEQ_offset[where k=k]) (auto simp: *) |
|
346 |
qed |
|
347 |
then show "(\<lambda>n. integral (cube n) (?I s)) ----> m" |
|
348 |
unfolding integral_unique[OF assms] integral_indicator_UNIV by simp |
|
349 |
qed |
|
350 |
||
351 |
lemma has_integral_iff_lmeasure: |
|
| 43920 | 352 |
"(indicator A has_integral m) UNIV \<longleftrightarrow> (A \<in> sets lebesgue \<and> 0 \<le> m \<and> lebesgue.\<mu> A = ereal m)" |
| 40859 | 353 |
proof |
| 41654 | 354 |
assume "(indicator A has_integral m) UNIV" |
355 |
with has_integral_lmeasure[OF this] has_integral_lebesgue[OF this] |
|
| 43920 | 356 |
show "A \<in> sets lebesgue \<and> 0 \<le> m \<and> lebesgue.\<mu> A = ereal m" |
| 41654 | 357 |
by (auto intro: has_integral_nonneg) |
| 40859 | 358 |
next |
| 43920 | 359 |
assume "A \<in> sets lebesgue \<and> 0 \<le> m \<and> lebesgue.\<mu> A = ereal m" |
| 41654 | 360 |
then show "(indicator A has_integral m) UNIV" by (intro lmeasure_finite_has_integral) auto |
| 38656 | 361 |
qed |
362 |
||
| 41654 | 363 |
lemma lmeasure_eq_integral: assumes "(indicator s::_\<Rightarrow>real) integrable_on UNIV" |
| 43920 | 364 |
shows "lebesgue.\<mu> s = ereal (integral UNIV (indicator s))" |
| 41654 | 365 |
using assms unfolding integrable_on_def |
366 |
proof safe |
|
367 |
fix y :: real assume "(indicator s has_integral y) UNIV" |
|
368 |
from this[unfolded has_integral_iff_lmeasure] integral_unique[OF this] |
|
| 43920 | 369 |
show "lebesgue.\<mu> s = ereal (integral UNIV (indicator s))" by simp |
| 40859 | 370 |
qed |
| 38656 | 371 |
|
372 |
lemma lebesgue_simple_function_indicator: |
|
| 43920 | 373 |
fixes f::"'a::ordered_euclidean_space \<Rightarrow> ereal" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
374 |
assumes f:"simple_function lebesgue f" |
| 38656 | 375 |
shows "f = (\<lambda>x. (\<Sum>y \<in> f ` UNIV. y * indicator (f -` {y}) x))"
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
376 |
by (rule, subst lebesgue.simple_function_indicator_representation[OF f]) auto |
| 38656 | 377 |
|
| 41654 | 378 |
lemma integral_eq_lmeasure: |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
379 |
"(indicator s::_\<Rightarrow>real) integrable_on UNIV \<Longrightarrow> integral UNIV (indicator s) = real (lebesgue.\<mu> s)" |
| 41654 | 380 |
by (subst lmeasure_eq_integral) (auto intro!: integral_nonneg) |
| 38656 | 381 |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
382 |
lemma lmeasure_finite: assumes "(indicator s::_\<Rightarrow>real) integrable_on UNIV" shows "lebesgue.\<mu> s \<noteq> \<infinity>" |
| 41654 | 383 |
using lmeasure_eq_integral[OF assms] by auto |
| 38656 | 384 |
|
| 40859 | 385 |
lemma negligible_iff_lebesgue_null_sets: |
386 |
"negligible A \<longleftrightarrow> A \<in> lebesgue.null_sets" |
|
387 |
proof |
|
388 |
assume "negligible A" |
|
389 |
from this[THEN lebesgueI_negligible] this[THEN lmeasure_eq_0] |
|
390 |
show "A \<in> lebesgue.null_sets" by auto |
|
391 |
next |
|
392 |
assume A: "A \<in> lebesgue.null_sets" |
|
| 41654 | 393 |
then have *:"((indicator A) has_integral (0::real)) UNIV" using lmeasure_finite_has_integral[of A] by auto |
394 |
show "negligible A" unfolding negligible_def |
|
395 |
proof (intro allI) |
|
396 |
fix a b :: 'a |
|
397 |
have integrable: "(indicator A :: _\<Rightarrow>real) integrable_on {a..b}"
|
|
398 |
by (intro integrable_on_subinterval has_integral_integrable) (auto intro: *) |
|
399 |
then have "integral {a..b} (indicator A) \<le> (integral UNIV (indicator A) :: real)"
|
|
400 |
using * by (auto intro!: integral_subset_le has_integral_integrable) |
|
401 |
moreover have "(0::real) \<le> integral {a..b} (indicator A)"
|
|
402 |
using integrable by (auto intro!: integral_nonneg) |
|
403 |
ultimately have "integral {a..b} (indicator A) = (0::real)"
|
|
404 |
using integral_unique[OF *] by auto |
|
405 |
then show "(indicator A has_integral (0::real)) {a..b}"
|
|
406 |
using integrable_integral[OF integrable] by simp |
|
407 |
qed |
|
408 |
qed |
|
409 |
||
410 |
lemma integral_const[simp]: |
|
411 |
fixes a b :: "'a::ordered_euclidean_space" |
|
412 |
shows "integral {a .. b} (\<lambda>x. c) = content {a .. b} *\<^sub>R c"
|
|
413 |
by (rule integral_unique) (rule has_integral_const) |
|
414 |
||
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
415 |
lemma lmeasure_UNIV[intro]: "lebesgue.\<mu> (UNIV::'a::ordered_euclidean_space set) = \<infinity>" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
416 |
proof (simp add: lebesgue_def, intro SUP_PInfty bexI) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
417 |
fix n :: nat |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
418 |
have "indicator UNIV = (\<lambda>x::'a. 1 :: real)" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
419 |
moreover |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
420 |
{ have "real n \<le> (2 * real n) ^ DIM('a)"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
421 |
proof (cases n) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
422 |
case 0 then show ?thesis by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
423 |
next |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
424 |
case (Suc n') |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
425 |
have "real n \<le> (2 * real n)^1" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
426 |
also have "(2 * real n)^1 \<le> (2 * real n) ^ DIM('a)"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
427 |
using Suc DIM_positive[where 'a='a] by (intro power_increasing) (auto simp: real_of_nat_Suc) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
428 |
finally show ?thesis . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
429 |
qed } |
| 43920 | 430 |
ultimately show "ereal (real n) \<le> ereal (integral (cube n) (indicator UNIV::'a\<Rightarrow>real))" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
431 |
using integral_const DIM_positive[where 'a='a] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
432 |
by (auto simp: cube_def content_closed_interval_cases setprod_constant) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
433 |
qed simp |
| 40859 | 434 |
|
435 |
lemma |
|
436 |
fixes a b ::"'a::ordered_euclidean_space" |
|
| 43920 | 437 |
shows lmeasure_atLeastAtMost[simp]: "lebesgue.\<mu> {a..b} = ereal (content {a..b})"
|
| 41654 | 438 |
proof - |
439 |
have "(indicator (UNIV \<inter> {a..b})::_\<Rightarrow>real) integrable_on UNIV"
|
|
440 |
unfolding integrable_indicator_UNIV by (simp add: integrable_const indicator_def_raw) |
|
441 |
from lmeasure_eq_integral[OF this] show ?thesis unfolding integral_indicator_UNIV |
|
442 |
by (simp add: indicator_def_raw) |
|
| 40859 | 443 |
qed |
444 |
||
445 |
lemma atLeastAtMost_singleton_euclidean[simp]: |
|
446 |
fixes a :: "'a::ordered_euclidean_space" shows "{a .. a} = {a}"
|
|
447 |
by (force simp: eucl_le[where 'a='a] euclidean_eq[where 'a='a]) |
|
448 |
||
449 |
lemma content_singleton[simp]: "content {a} = 0"
|
|
450 |
proof - |
|
451 |
have "content {a .. a} = 0"
|
|
452 |
by (subst content_closed_interval) auto |
|
453 |
then show ?thesis by simp |
|
454 |
qed |
|
455 |
||
456 |
lemma lmeasure_singleton[simp]: |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
457 |
fixes a :: "'a::ordered_euclidean_space" shows "lebesgue.\<mu> {a} = 0"
|
| 41654 | 458 |
using lmeasure_atLeastAtMost[of a a] by simp |
| 40859 | 459 |
|
460 |
declare content_real[simp] |
|
461 |
||
462 |
lemma |
|
463 |
fixes a b :: real |
|
464 |
shows lmeasure_real_greaterThanAtMost[simp]: |
|
| 43920 | 465 |
"lebesgue.\<mu> {a <.. b} = ereal (if a \<le> b then b - a else 0)"
|
| 40859 | 466 |
proof cases |
467 |
assume "a < b" |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
468 |
then have "lebesgue.\<mu> {a <.. b} = lebesgue.\<mu> {a .. b} - lebesgue.\<mu> {a}"
|
| 41654 | 469 |
by (subst lebesgue.measure_Diff[symmetric]) |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
470 |
(auto intro!: arg_cong[where f=lebesgue.\<mu>]) |
| 40859 | 471 |
then show ?thesis by auto |
472 |
qed auto |
|
473 |
||
474 |
lemma |
|
475 |
fixes a b :: real |
|
476 |
shows lmeasure_real_atLeastLessThan[simp]: |
|
| 43920 | 477 |
"lebesgue.\<mu> {a ..< b} = ereal (if a \<le> b then b - a else 0)"
|
| 40859 | 478 |
proof cases |
479 |
assume "a < b" |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
480 |
then have "lebesgue.\<mu> {a ..< b} = lebesgue.\<mu> {a .. b} - lebesgue.\<mu> {b}"
|
| 41654 | 481 |
by (subst lebesgue.measure_Diff[symmetric]) |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
482 |
(auto intro!: arg_cong[where f=lebesgue.\<mu>]) |
| 41654 | 483 |
then show ?thesis by auto |
484 |
qed auto |
|
485 |
||
486 |
lemma |
|
487 |
fixes a b :: real |
|
488 |
shows lmeasure_real_greaterThanLessThan[simp]: |
|
| 43920 | 489 |
"lebesgue.\<mu> {a <..< b} = ereal (if a \<le> b then b - a else 0)"
|
| 41654 | 490 |
proof cases |
491 |
assume "a < b" |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
492 |
then have "lebesgue.\<mu> {a <..< b} = lebesgue.\<mu> {a <.. b} - lebesgue.\<mu> {b}"
|
| 41654 | 493 |
by (subst lebesgue.measure_Diff[symmetric]) |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
494 |
(auto intro!: arg_cong[where f=lebesgue.\<mu>]) |
| 40859 | 495 |
then show ?thesis by auto |
496 |
qed auto |
|
497 |
||
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
498 |
subsection {* Lebesgue-Borel measure *}
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
499 |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
500 |
definition "lborel = lebesgue \<lparr> sets := sets borel \<rparr>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
501 |
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
502 |
lemma |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
503 |
shows space_lborel[simp]: "space lborel = UNIV" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
504 |
and sets_lborel[simp]: "sets lborel = sets borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
505 |
and measure_lborel[simp]: "measure lborel = lebesgue.\<mu>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
506 |
and measurable_lborel[simp]: "measurable lborel = measurable borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
507 |
by (simp_all add: measurable_def_raw lborel_def) |
| 40859 | 508 |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
509 |
interpretation lborel: measure_space "lborel :: ('a::ordered_euclidean_space) measure_space"
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
510 |
where "space lborel = UNIV" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
511 |
and "sets lborel = sets borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
512 |
and "measure lborel = lebesgue.\<mu>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
513 |
and "measurable lborel = measurable borel" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
514 |
proof (rule lebesgue.measure_space_subalgebra) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
515 |
have "sigma_algebra (lborel::'a measure_space) \<longleftrightarrow> sigma_algebra (borel::'a algebra)" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
516 |
unfolding sigma_algebra_iff2 lborel_def by simp |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
517 |
then show "sigma_algebra (lborel::'a measure_space)" by simp default |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
518 |
qed auto |
| 40859 | 519 |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
520 |
interpretation lborel: sigma_finite_measure lborel |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
521 |
where "space lborel = UNIV" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
522 |
and "sets lborel = sets borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
523 |
and "measure lborel = lebesgue.\<mu>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
524 |
and "measurable lborel = measurable borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
525 |
proof - |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
526 |
show "sigma_finite_measure lborel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
527 |
proof (default, intro conjI exI[of _ "\<lambda>n. cube n"]) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
528 |
show "range cube \<subseteq> sets lborel" by (auto intro: borel_closed) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
529 |
{ fix x have "\<exists>n. x\<in>cube n" using mem_big_cube by auto }
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
530 |
thus "(\<Union>i. cube i) = space lborel" by auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
531 |
show "\<forall>i. measure lborel (cube i) \<noteq> \<infinity>" by (simp add: cube_def) |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
532 |
qed |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
533 |
qed simp_all |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
534 |
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
535 |
interpretation lebesgue: sigma_finite_measure lebesgue |
| 40859 | 536 |
proof |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
537 |
from lborel.sigma_finite guess A .. |
| 40859 | 538 |
moreover then have "range A \<subseteq> sets lebesgue" using lebesgueI_borel by blast |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
539 |
ultimately show "\<exists>A::nat \<Rightarrow> 'b set. range A \<subseteq> sets lebesgue \<and> (\<Union>i. A i) = space lebesgue \<and> (\<forall>i. lebesgue.\<mu> (A i) \<noteq> \<infinity>)" |
| 40859 | 540 |
by auto |
541 |
qed |
|
542 |
||
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
543 |
subsection {* Lebesgue integrable implies Gauge integrable *}
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
544 |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
545 |
lemma has_integral_cmult_real: |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
546 |
fixes c :: real |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
547 |
assumes "c \<noteq> 0 \<Longrightarrow> (f has_integral x) A" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
548 |
shows "((\<lambda>x. c * f x) has_integral c * x) A" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
549 |
proof cases |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
550 |
assume "c \<noteq> 0" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
551 |
from has_integral_cmul[OF assms[OF this], of c] show ?thesis |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
552 |
unfolding real_scaleR_def . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
553 |
qed simp |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
554 |
|
| 40859 | 555 |
lemma simple_function_has_integral: |
| 43920 | 556 |
fixes f::"'a::ordered_euclidean_space \<Rightarrow> ereal" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
557 |
assumes f:"simple_function lebesgue f" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
558 |
and f':"range f \<subseteq> {0..<\<infinity>}"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
559 |
and om:"\<And>x. x \<in> range f \<Longrightarrow> lebesgue.\<mu> (f -` {x} \<inter> UNIV) = \<infinity> \<Longrightarrow> x = 0"
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
560 |
shows "((\<lambda>x. real (f x)) has_integral (real (integral\<^isup>S lebesgue f))) UNIV" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
561 |
unfolding simple_integral_def space_lebesgue |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
562 |
proof (subst lebesgue_simple_function_indicator) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
563 |
let "?M x" = "lebesgue.\<mu> (f -` {x} \<inter> UNIV)"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
564 |
let "?F x" = "indicator (f -` {x})"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
565 |
{ fix x y assume "y \<in> range f"
|
| 43920 | 566 |
from subsetD[OF f' this] have "y * ?F y x = ereal (real y * ?F y x)" |
567 |
by (cases rule: ereal2_cases[of y "?F y x"]) |
|
568 |
(auto simp: indicator_def one_ereal_def split: split_if_asm) } |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
569 |
moreover |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
570 |
{ fix x assume x: "x\<in>range f"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
571 |
have "x * ?M x = real x * real (?M x)" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
572 |
proof cases |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
573 |
assume "x \<noteq> 0" with om[OF x] have "?M x \<noteq> \<infinity>" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
574 |
with subsetD[OF f' x] f[THEN lebesgue.simple_functionD(2)] show ?thesis |
| 43920 | 575 |
by (cases rule: ereal2_cases[of x "?M x"]) auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
576 |
qed simp } |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
577 |
ultimately |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
578 |
have "((\<lambda>x. real (\<Sum>y\<in>range f. y * ?F y x)) has_integral real (\<Sum>x\<in>range f. x * ?M x)) UNIV \<longleftrightarrow> |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
579 |
((\<lambda>x. \<Sum>y\<in>range f. real y * ?F y x) has_integral (\<Sum>x\<in>range f. real x * real (?M x))) UNIV" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
580 |
by simp |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
581 |
also have \<dots> |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
582 |
proof (intro has_integral_setsum has_integral_cmult_real lmeasure_finite_has_integral |
| 43920 | 583 |
real_of_ereal_pos lebesgue.positive_measure ballI) |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
584 |
show *: "finite (range f)" "\<And>y. f -` {y} \<in> sets lebesgue" "\<And>y. f -` {y} \<inter> UNIV \<in> sets lebesgue"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
585 |
using lebesgue.simple_functionD[OF f] by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
586 |
fix y assume "real y \<noteq> 0" "y \<in> range f" |
| 43920 | 587 |
with * om[OF this(2)] show "lebesgue.\<mu> (f -` {y}) = ereal (real (?M y))"
|
588 |
by (auto simp: ereal_real) |
|
| 41654 | 589 |
qed |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
590 |
finally show "((\<lambda>x. real (\<Sum>y\<in>range f. y * ?F y x)) has_integral real (\<Sum>x\<in>range f. x * ?M x)) UNIV" . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
591 |
qed fact |
| 40859 | 592 |
|
593 |
lemma bounded_realI: assumes "\<forall>x\<in>s. abs (x::real) \<le> B" shows "bounded s" |
|
594 |
unfolding bounded_def dist_real_def apply(rule_tac x=0 in exI) |
|
595 |
using assms by auto |
|
596 |
||
597 |
lemma simple_function_has_integral': |
|
| 43920 | 598 |
fixes f::"'a::ordered_euclidean_space \<Rightarrow> ereal" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
599 |
assumes f: "simple_function lebesgue f" "\<And>x. 0 \<le> f x" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
600 |
and i: "integral\<^isup>S lebesgue f \<noteq> \<infinity>" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
601 |
shows "((\<lambda>x. real (f x)) has_integral (real (integral\<^isup>S lebesgue f))) UNIV" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
602 |
proof - |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
603 |
let ?f = "\<lambda>x. if x \<in> f -` {\<infinity>} then 0 else f x"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
604 |
note f(1)[THEN lebesgue.simple_functionD(2)] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
605 |
then have [simp, intro]: "\<And>X. f -` X \<in> sets lebesgue" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
606 |
have f': "simple_function lebesgue ?f" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
607 |
using f by (intro lebesgue.simple_function_If_set) auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
608 |
have rng: "range ?f \<subseteq> {0..<\<infinity>}" using f by auto
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
609 |
have "AE x in lebesgue. f x = ?f x" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
610 |
using lebesgue.simple_integral_PInf[OF f i] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
611 |
by (intro lebesgue.AE_I[where N="f -` {\<infinity>} \<inter> space lebesgue"]) auto
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
612 |
from f(1) f' this have eq: "integral\<^isup>S lebesgue f = integral\<^isup>S lebesgue ?f" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
613 |
by (rule lebesgue.simple_integral_cong_AE) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
614 |
have real_eq: "\<And>x. real (f x) = real (?f x)" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
615 |
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
616 |
show ?thesis |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
617 |
unfolding eq real_eq |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
618 |
proof (rule simple_function_has_integral[OF f' rng]) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
619 |
fix x assume x: "x \<in> range ?f" and inf: "lebesgue.\<mu> (?f -` {x} \<inter> UNIV) = \<infinity>"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
620 |
have "x * lebesgue.\<mu> (?f -` {x} \<inter> UNIV) = (\<integral>\<^isup>S y. x * indicator (?f -` {x}) y \<partial>lebesgue)"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
621 |
using f'[THEN lebesgue.simple_functionD(2)] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
622 |
by (simp add: lebesgue.simple_integral_cmult_indicator) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
623 |
also have "\<dots> \<le> integral\<^isup>S lebesgue f" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
624 |
using f'[THEN lebesgue.simple_functionD(2)] f |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
625 |
by (intro lebesgue.simple_integral_mono lebesgue.simple_function_mult lebesgue.simple_function_indicator) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
626 |
(auto split: split_indicator) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
627 |
finally show "x = 0" unfolding inf using i subsetD[OF rng x] by (auto split: split_if_asm) |
| 40859 | 628 |
qed |
629 |
qed |
|
630 |
||
631 |
lemma positive_integral_has_integral: |
|
| 43920 | 632 |
fixes f :: "'a::ordered_euclidean_space \<Rightarrow> ereal" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
633 |
assumes f: "f \<in> borel_measurable lebesgue" "range f \<subseteq> {0..<\<infinity>}" "integral\<^isup>P lebesgue f \<noteq> \<infinity>"
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
634 |
shows "((\<lambda>x. real (f x)) has_integral (real (integral\<^isup>P lebesgue f))) UNIV" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
635 |
proof - |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
636 |
from lebesgue.borel_measurable_implies_simple_function_sequence'[OF f(1)] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
637 |
guess u . note u = this |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
638 |
have SUP_eq: "\<And>x. (SUP i. u i x) = f x" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
639 |
using u(4) f(2)[THEN subsetD] by (auto split: split_max) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
640 |
let "?u i x" = "real (u i x)" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
641 |
note u_eq = lebesgue.positive_integral_eq_simple_integral[OF u(1,5), symmetric] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
642 |
{ fix i
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
643 |
note u_eq |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
644 |
also have "integral\<^isup>P lebesgue (u i) \<le> (\<integral>\<^isup>+x. max 0 (f x) \<partial>lebesgue)" |
|
44928
7ef6505bde7f
renamed Complete_Lattices lemmas, removed legacy names
hoelzl
parents:
44890
diff
changeset
|
645 |
by (intro lebesgue.positive_integral_mono) (auto intro: SUP_upper simp: u(4)[symmetric]) |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
646 |
finally have "integral\<^isup>S lebesgue (u i) \<noteq> \<infinity>" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
647 |
unfolding positive_integral_max_0 using f by auto } |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
648 |
note u_fin = this |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
649 |
then have u_int: "\<And>i. (?u i has_integral real (integral\<^isup>S lebesgue (u i))) UNIV" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
650 |
by (rule simple_function_has_integral'[OF u(1,5)]) |
| 43920 | 651 |
have "\<forall>x. \<exists>r\<ge>0. f x = ereal r" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
652 |
proof |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
653 |
fix x from f(2) have "0 \<le> f x" "f x \<noteq> \<infinity>" by (auto simp: subset_eq) |
| 43920 | 654 |
then show "\<exists>r\<ge>0. f x = ereal r" by (cases "f x") auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
655 |
qed |
| 43920 | 656 |
from choice[OF this] obtain f' where f': "f = (\<lambda>x. ereal (f' x))" "\<And>x. 0 \<le> f' x" by auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
657 |
|
| 43920 | 658 |
have "\<forall>i. \<exists>r. \<forall>x. 0 \<le> r x \<and> u i x = ereal (r x)" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
659 |
proof |
| 43920 | 660 |
fix i show "\<exists>r. \<forall>x. 0 \<le> r x \<and> u i x = ereal (r x)" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
661 |
proof (intro choice allI) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
662 |
fix i x have "u i x \<noteq> \<infinity>" using u(3)[of i] by (auto simp: image_iff) metis |
| 43920 | 663 |
then show "\<exists>r\<ge>0. u i x = ereal r" using u(5)[of i x] by (cases "u i x") auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
664 |
qed |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
665 |
qed |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
666 |
from choice[OF this] obtain u' where |
| 43920 | 667 |
u': "u = (\<lambda>i x. ereal (u' i x))" "\<And>i x. 0 \<le> u' i x" by (auto simp: fun_eq_iff) |
| 40859 | 668 |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
669 |
have convergent: "f' integrable_on UNIV \<and> |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
670 |
(\<lambda>k. integral UNIV (u' k)) ----> integral UNIV f'" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
671 |
proof (intro monotone_convergence_increasing allI ballI) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
672 |
show int: "\<And>k. (u' k) integrable_on UNIV" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
673 |
using u_int unfolding integrable_on_def u' by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
674 |
show "\<And>k x. u' k x \<le> u' (Suc k) x" using u(2,3,5) |
| 43920 | 675 |
by (auto simp: incseq_Suc_iff le_fun_def image_iff u' intro!: real_of_ereal_positive_mono) |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
676 |
show "\<And>x. (\<lambda>k. u' k x) ----> f' x" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
677 |
using SUP_eq u(2) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
678 |
by (intro SUP_eq_LIMSEQ[THEN iffD1]) (auto simp: u' f' incseq_mono incseq_Suc_iff le_fun_def) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
679 |
show "bounded {integral UNIV (u' k)|k. True}"
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
680 |
proof (safe intro!: bounded_realI) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
681 |
fix k |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
682 |
have "\<bar>integral UNIV (u' k)\<bar> = integral UNIV (u' k)" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
683 |
by (intro abs_of_nonneg integral_nonneg int ballI u') |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
684 |
also have "\<dots> = real (integral\<^isup>S lebesgue (u k))" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
685 |
using u_int[THEN integral_unique] by (simp add: u') |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
686 |
also have "\<dots> = real (integral\<^isup>P lebesgue (u k))" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
687 |
using lebesgue.positive_integral_eq_simple_integral[OF u(1,5)] by simp |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
688 |
also have "\<dots> \<le> real (integral\<^isup>P lebesgue f)" using f |
| 43920 | 689 |
by (auto intro!: real_of_ereal_positive_mono lebesgue.positive_integral_positive |
|
44928
7ef6505bde7f
renamed Complete_Lattices lemmas, removed legacy names
hoelzl
parents:
44890
diff
changeset
|
690 |
lebesgue.positive_integral_mono SUP_upper simp: SUP_eq[symmetric]) |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
691 |
finally show "\<bar>integral UNIV (u' k)\<bar> \<le> real (integral\<^isup>P lebesgue f)" . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
692 |
qed |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
693 |
qed |
| 40859 | 694 |
|
| 43920 | 695 |
have "integral\<^isup>P lebesgue f = ereal (integral UNIV f')" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
696 |
proof (rule tendsto_unique[OF trivial_limit_sequentially]) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
697 |
have "(\<lambda>i. integral\<^isup>S lebesgue (u i)) ----> (SUP i. integral\<^isup>P lebesgue (u i))" |
| 43920 | 698 |
unfolding u_eq by (intro LIMSEQ_ereal_SUPR lebesgue.incseq_positive_integral u) |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
699 |
also note lebesgue.positive_integral_monotone_convergence_SUP |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
700 |
[OF u(2) lebesgue.borel_measurable_simple_function[OF u(1)] u(5), symmetric] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
701 |
finally show "(\<lambda>k. integral\<^isup>S lebesgue (u k)) ----> integral\<^isup>P lebesgue f" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
702 |
unfolding SUP_eq . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
703 |
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
704 |
{ fix k
|
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
705 |
have "0 \<le> integral\<^isup>S lebesgue (u k)" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
706 |
using u by (auto intro!: lebesgue.simple_integral_positive) |
| 43920 | 707 |
then have "integral\<^isup>S lebesgue (u k) = ereal (real (integral\<^isup>S lebesgue (u k)))" |
708 |
using u_fin by (auto simp: ereal_real) } |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
709 |
note * = this |
| 43920 | 710 |
show "(\<lambda>k. integral\<^isup>S lebesgue (u k)) ----> ereal (integral UNIV f')" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
711 |
using convergent using u_int[THEN integral_unique, symmetric] |
| 43920 | 712 |
by (subst *) (simp add: lim_ereal u') |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
713 |
qed |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
714 |
then show ?thesis using convergent by (simp add: f' integrable_integral) |
| 40859 | 715 |
qed |
716 |
||
717 |
lemma lebesgue_integral_has_integral: |
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
718 |
fixes f :: "'a::ordered_euclidean_space \<Rightarrow> real" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
719 |
assumes f: "integrable lebesgue f" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
720 |
shows "(f has_integral (integral\<^isup>L lebesgue f)) UNIV" |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
721 |
proof - |
| 43920 | 722 |
let ?n = "\<lambda>x. real (ereal (max 0 (- f x)))" and ?p = "\<lambda>x. real (ereal (max 0 (f x)))" |
723 |
have *: "f = (\<lambda>x. ?p x - ?n x)" by (auto simp del: ereal_max) |
|
724 |
{ fix f have "(\<integral>\<^isup>+ x. ereal (f x) \<partial>lebesgue) = (\<integral>\<^isup>+ x. ereal (max 0 (f x)) \<partial>lebesgue)"
|
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
725 |
by (intro lebesgue.positive_integral_cong_pos) (auto split: split_max) } |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
726 |
note eq = this |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
727 |
show ?thesis |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
728 |
unfolding lebesgue_integral_def |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
729 |
apply (subst *) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
730 |
apply (rule has_integral_sub) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
731 |
unfolding eq[of f] eq[of "\<lambda>x. - f x"] |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
732 |
apply (safe intro!: positive_integral_has_integral) |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
733 |
using integrableD[OF f] |
| 43920 | 734 |
by (auto simp: zero_ereal_def[symmetric] positive_integral_max_0 split: split_max |
735 |
intro!: lebesgue.measurable_If lebesgue.borel_measurable_ereal) |
|
| 40859 | 736 |
qed |
737 |
||
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
738 |
lemma lebesgue_positive_integral_eq_borel: |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
739 |
assumes f: "f \<in> borel_measurable borel" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
740 |
shows "integral\<^isup>P lebesgue f = integral\<^isup>P lborel f" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
741 |
proof - |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
742 |
from f have "integral\<^isup>P lebesgue (\<lambda>x. max 0 (f x)) = integral\<^isup>P lborel (\<lambda>x. max 0 (f x))" |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
743 |
by (auto intro!: lebesgue.positive_integral_subalgebra[symmetric]) default |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
744 |
then show ?thesis unfolding positive_integral_max_0 . |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
745 |
qed |
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
746 |
|
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
747 |
lemma lebesgue_integral_eq_borel: |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
748 |
assumes "f \<in> borel_measurable borel" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
749 |
shows "integrable lebesgue f \<longleftrightarrow> integrable lborel f" (is ?P) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
750 |
and "integral\<^isup>L lebesgue f = integral\<^isup>L lborel f" (is ?I) |
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
751 |
proof - |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
752 |
have *: "sigma_algebra lborel" by default |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
753 |
have "sets lborel \<subseteq> sets lebesgue" by auto |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
754 |
from lebesgue.integral_subalgebra[of f lborel, OF _ this _ _ *] assms |
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
755 |
show ?P ?I by auto |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
756 |
qed |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
757 |
|
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
758 |
lemma borel_integral_has_integral: |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
759 |
fixes f::"'a::ordered_euclidean_space => real" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
760 |
assumes f:"integrable lborel f" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
761 |
shows "(f has_integral (integral\<^isup>L lborel f)) UNIV" |
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
762 |
proof - |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
763 |
have borel: "f \<in> borel_measurable borel" |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
764 |
using f unfolding integrable_def by auto |
|
41546
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
765 |
from f show ?thesis |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
766 |
using lebesgue_integral_has_integral[of f] |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
767 |
unfolding lebesgue_integral_eq_borel[OF borel] by simp |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
768 |
qed |
|
2a12c23b7a34
integral on lebesgue measure is extension of integral on borel measure
hoelzl
parents:
41097
diff
changeset
|
769 |
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
770 |
subsection {* Equivalence between product spaces and euclidean spaces *}
|
| 40859 | 771 |
|
772 |
definition e2p :: "'a::ordered_euclidean_space \<Rightarrow> (nat \<Rightarrow> real)" where |
|
773 |
"e2p x = (\<lambda>i\<in>{..<DIM('a)}. x$$i)"
|
|
774 |
||
775 |
definition p2e :: "(nat \<Rightarrow> real) \<Rightarrow> 'a::ordered_euclidean_space" where |
|
776 |
"p2e x = (\<chi>\<chi> i. x i)" |
|
777 |
||
| 41095 | 778 |
lemma e2p_p2e[simp]: |
779 |
"x \<in> extensional {..<DIM('a)} \<Longrightarrow> e2p (p2e x::'a::ordered_euclidean_space) = x"
|
|
780 |
by (auto simp: fun_eq_iff extensional_def p2e_def e2p_def) |
|
| 40859 | 781 |
|
| 41095 | 782 |
lemma p2e_e2p[simp]: |
783 |
"p2e (e2p x) = (x::'a::ordered_euclidean_space)" |
|
784 |
by (auto simp: euclidean_eq[where 'a='a] p2e_def e2p_def) |
|
| 40859 | 785 |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
786 |
interpretation lborel_product: product_sigma_finite "\<lambda>x. lborel::real measure_space" |
| 40859 | 787 |
by default |
788 |
||
| 41831 | 789 |
interpretation lborel_space: finite_product_sigma_finite "\<lambda>x. lborel::real measure_space" "{..<n}" for n :: nat
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
790 |
where "space lborel = UNIV" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
791 |
and "sets lborel = sets borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
792 |
and "measure lborel = lebesgue.\<mu>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
793 |
and "measurable lborel = measurable borel" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
794 |
proof - |
| 41831 | 795 |
show "finite_product_sigma_finite (\<lambda>x. lborel::real measure_space) {..<n}"
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
796 |
by default simp |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
797 |
qed simp_all |
| 40859 | 798 |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
799 |
lemma sets_product_borel: |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
800 |
assumes [intro]: "finite I" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
801 |
shows "sets (\<Pi>\<^isub>M i\<in>I. |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
802 |
\<lparr> space = UNIV::real set, sets = range lessThan, measure = lebesgue.\<mu> \<rparr>) = |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
803 |
sets (\<Pi>\<^isub>M i\<in>I. lborel)" (is "sets ?G = _") |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
804 |
proof - |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
805 |
have "sets ?G = sets (\<Pi>\<^isub>M i\<in>I. |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
806 |
sigma \<lparr> space = UNIV::real set, sets = range lessThan, measure = lebesgue.\<mu> \<rparr>)" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
807 |
by (subst sigma_product_algebra_sigma_eq[of I "\<lambda>_ i. {..<real i}" ])
|
| 44666 | 808 |
(auto intro!: measurable_sigma_sigma incseq_SucI reals_Archimedean2 |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
809 |
simp: product_algebra_def) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
810 |
then show ?thesis |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
811 |
unfolding lborel_def borel_eq_lessThan lebesgue_def sigma_def by simp |
| 40859 | 812 |
qed |
813 |
||
| 41661 | 814 |
lemma measurable_e2p: |
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
815 |
"e2p \<in> measurable (borel::'a::ordered_euclidean_space algebra) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
816 |
(\<Pi>\<^isub>M i\<in>{..<DIM('a)}. (lborel :: real measure_space))"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
817 |
(is "_ \<in> measurable ?E ?P") |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
818 |
proof - |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
819 |
let ?B = "\<lparr> space = UNIV::real set, sets = range lessThan, measure = lebesgue.\<mu> \<rparr>" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
820 |
let ?G = "product_algebra_generator {..<DIM('a)} (\<lambda>_. ?B)"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
821 |
have "e2p \<in> measurable ?E (sigma ?G)" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
822 |
proof (rule borel.measurable_sigma) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
823 |
show "e2p \<in> space ?E \<rightarrow> space ?G" by (auto simp: e2p_def) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
824 |
fix A assume "A \<in> sets ?G" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
825 |
then obtain E where A: "A = (\<Pi>\<^isub>E i\<in>{..<DIM('a)}. E i)"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
826 |
and "E \<in> {..<DIM('a)} \<rightarrow> (range lessThan)"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
827 |
by (auto elim!: product_algebraE simp: ) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
828 |
then have "\<forall>i\<in>{..<DIM('a)}. \<exists>xs. E i = {..< xs}" by auto
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
829 |
from this[THEN bchoice] guess xs .. |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
830 |
then have A_eq: "A = (\<Pi>\<^isub>E i\<in>{..<DIM('a)}. {..< xs i})"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
831 |
using A by auto |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
832 |
have "e2p -` A = {..< (\<chi>\<chi> i. xs i) :: 'a}"
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
833 |
using DIM_positive by (auto simp add: Pi_iff set_eq_iff e2p_def A_eq |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
834 |
euclidean_eq[where 'a='a] eucl_less[where 'a='a]) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
835 |
then show "e2p -` A \<inter> space ?E \<in> sets ?E" by simp |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
836 |
qed (auto simp: product_algebra_generator_def) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
837 |
with sets_product_borel[of "{..<DIM('a)}"] show ?thesis
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
838 |
unfolding measurable_def product_algebra_def by simp |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
839 |
qed |
| 41661 | 840 |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
841 |
lemma measurable_p2e: |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
842 |
"p2e \<in> measurable (\<Pi>\<^isub>M i\<in>{..<DIM('a)}. (lborel :: real measure_space))
|
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
843 |
(borel :: 'a::ordered_euclidean_space algebra)" |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
844 |
(is "p2e \<in> measurable ?P _") |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
845 |
unfolding borel_eq_lessThan |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
846 |
proof (intro lborel_space.measurable_sigma) |
|
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
847 |
let ?E = "\<lparr> space = UNIV :: 'a set, sets = range lessThan \<rparr>" |
| 41095 | 848 |
show "p2e \<in> space ?P \<rightarrow> space ?E" by simp |
849 |
fix A assume "A \<in> sets ?E" |
|
850 |
then obtain x where "A = {..<x}" by auto
|
|
851 |
then have "p2e -` A \<inter> space ?P = (\<Pi>\<^isub>E i\<in>{..<DIM('a)}. {..< x $$ i})"
|
|
852 |
using DIM_positive |
|
853 |
by (auto simp: Pi_iff set_eq_iff p2e_def |
|
854 |
euclidean_eq[where 'a='a] eucl_less[where 'a='a]) |
|
855 |
then show "p2e -` A \<inter> space ?P \<in> sets ?P" by auto |
|
|
41689
3e39b0e730d6
the measure valuation is again part of the measure_space type, instead of an explicit parameter to the locale;
hoelzl
parents:
41661
diff
changeset
|
856 |
qed simp |
| 41095 | 857 |
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
858 |
lemma Int_stable_cuboids: |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
859 |
fixes x::"'a::ordered_euclidean_space" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
860 |
shows "Int_stable \<lparr>space = UNIV, sets = range (\<lambda>(a, b::'a). {a..b})\<rparr>"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
861 |
by (auto simp: inter_interval Int_stable_def) |
| 40859 | 862 |
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
863 |
lemma lborel_eq_lborel_space: |
| 40859 | 864 |
fixes A :: "('a::ordered_euclidean_space) set"
|
865 |
assumes "A \<in> sets borel" |
|
| 41831 | 866 |
shows "lborel.\<mu> A = lborel_space.\<mu> DIM('a) (p2e -` A \<inter> (space (lborel_space.P DIM('a))))"
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
867 |
(is "_ = measure ?P (?T A)") |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
868 |
proof (rule measure_unique_Int_stable_vimage) |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
869 |
show "measure_space ?P" by default |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
870 |
show "measure_space lborel" by default |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
871 |
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
872 |
let ?E = "\<lparr> space = UNIV :: 'a set, sets = range (\<lambda>(a,b). {a..b}) \<rparr>"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
873 |
show "Int_stable ?E" using Int_stable_cuboids . |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
874 |
show "range cube \<subseteq> sets ?E" unfolding cube_def_raw by auto |
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
875 |
show "incseq cube" using cube_subset_Suc by (auto intro!: incseq_SucI) |
|
44890
22f665a2e91c
new fastforce replacing fastsimp - less confusing name
nipkow
parents:
44666
diff
changeset
|
876 |
{ fix x have "\<exists>n. x \<in> cube n" using mem_big_cube[of x] by fastforce }
|
|
41981
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
877 |
then show "(\<Union>i. cube i) = space ?E" by auto |
|
cdf7693bbe08
reworked Probability theory: measures are not type restricted to positive extended reals
hoelzl
parents:
41831
diff
changeset
|
878 |
{ fix i show "lborel.\<mu> (cube i) \<noteq> \<infinity>" unfolding cube_def by auto }
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
879 |
show "A \<in> sets (sigma ?E)" "sets (sigma ?E) = sets lborel" "space ?E = space lborel" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
880 |
using assms by (simp_all add: borel_eq_atLeastAtMost) |
| 40859 | 881 |
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
882 |
show "p2e \<in> measurable ?P (lborel :: 'a measure_space)" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
883 |
using measurable_p2e unfolding measurable_def by simp |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
884 |
{ fix X assume "X \<in> sets ?E"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
885 |
then obtain a b where X[simp]: "X = {a .. b}" by auto
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
886 |
have *: "?T X = (\<Pi>\<^isub>E i\<in>{..<DIM('a)}. {a $$ i .. b $$ i})"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
887 |
by (auto simp: Pi_iff eucl_le[where 'a='a] p2e_def) |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
888 |
show "lborel.\<mu> X = measure ?P (?T X)" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
889 |
proof cases |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
890 |
assume "X \<noteq> {}"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
891 |
then have "a \<le> b" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
892 |
by (simp add: interval_ne_empty eucl_le[where 'a='a]) |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
893 |
then have "lborel.\<mu> X = (\<Prod>x<DIM('a). lborel.\<mu> {a $$ x .. b $$ x})"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
894 |
by (auto simp: content_closed_interval eucl_le[where 'a='a] |
| 43920 | 895 |
intro!: setprod_ereal[symmetric]) |
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
896 |
also have "\<dots> = measure ?P (?T X)" |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
897 |
unfolding * by (subst lborel_space.measure_times) auto |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
898 |
finally show ?thesis . |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
899 |
qed simp } |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
900 |
qed |
| 40859 | 901 |
|
| 41831 | 902 |
lemma measure_preserving_p2e: |
903 |
"p2e \<in> measure_preserving (\<Pi>\<^isub>M i\<in>{..<DIM('a)}. (lborel :: real measure_space))
|
|
904 |
(lborel::'a::ordered_euclidean_space measure_space)" (is "_ \<in> measure_preserving ?P ?E") |
|
905 |
proof |
|
906 |
show "p2e \<in> measurable ?P ?E" |
|
907 |
using measurable_p2e by (simp add: measurable_def) |
|
908 |
fix A :: "'a set" assume "A \<in> sets lborel" |
|
909 |
then show "lborel_space.\<mu> DIM('a) (p2e -` A \<inter> (space (lborel_space.P DIM('a)))) = lborel.\<mu> A"
|
|
910 |
by (intro lborel_eq_lborel_space[symmetric]) simp |
|
911 |
qed |
|
912 |
||
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
913 |
lemma lebesgue_eq_lborel_space_in_borel: |
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
914 |
fixes A :: "('a::ordered_euclidean_space) set"
|
|
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
915 |
assumes A: "A \<in> sets borel" |
| 41831 | 916 |
shows "lebesgue.\<mu> A = lborel_space.\<mu> DIM('a) (p2e -` A \<inter> (space (lborel_space.P DIM('a))))"
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
917 |
using lborel_eq_lborel_space[OF A] by simp |
| 40859 | 918 |
|
919 |
lemma borel_fubini_positiv_integral: |
|
| 43920 | 920 |
fixes f :: "'a::ordered_euclidean_space \<Rightarrow> ereal" |
| 40859 | 921 |
assumes f: "f \<in> borel_measurable borel" |
| 41831 | 922 |
shows "integral\<^isup>P lborel f = \<integral>\<^isup>+x. f (p2e x) \<partial>(lborel_space.P DIM('a))"
|
923 |
proof (rule lborel_space.positive_integral_vimage[OF _ measure_preserving_p2e _]) |
|
924 |
show "f \<in> borel_measurable lborel" |
|
925 |
using f by (simp_all add: measurable_def) |
|
926 |
qed default |
|
| 40859 | 927 |
|
|
41704
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
928 |
lemma borel_fubini_integrable: |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
929 |
fixes f :: "'a::ordered_euclidean_space \<Rightarrow> real" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
930 |
shows "integrable lborel f \<longleftrightarrow> |
| 41831 | 931 |
integrable (lborel_space.P DIM('a)) (\<lambda>x. f (p2e x))"
|
|
41704
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
932 |
(is "_ \<longleftrightarrow> integrable ?B ?f") |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
933 |
proof |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
934 |
assume "integrable lborel f" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
935 |
moreover then have f: "f \<in> borel_measurable borel" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
936 |
by auto |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
937 |
moreover with measurable_p2e |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
938 |
have "f \<circ> p2e \<in> borel_measurable ?B" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
939 |
by (rule measurable_comp) |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
940 |
ultimately show "integrable ?B ?f" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
941 |
by (simp add: comp_def borel_fubini_positiv_integral integrable_def) |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
942 |
next |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
943 |
assume "integrable ?B ?f" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
944 |
moreover then |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
945 |
have "?f \<circ> e2p \<in> borel_measurable (borel::'a algebra)" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
946 |
by (auto intro!: measurable_e2p measurable_comp) |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
947 |
then have "f \<in> borel_measurable borel" |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
948 |
by (simp cong: measurable_cong) |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
949 |
ultimately show "integrable lborel f" |
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
950 |
by (simp add: borel_fubini_positiv_integral integrable_def) |
|
41704
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
951 |
qed |
|
8c539202f854
add borel_fubini_integrable; remove unused bijectivity rules for measureable functions
hoelzl
parents:
41689
diff
changeset
|
952 |
|
| 40859 | 953 |
lemma borel_fubini: |
954 |
fixes f :: "'a::ordered_euclidean_space \<Rightarrow> real" |
|
955 |
assumes f: "f \<in> borel_measurable borel" |
|
| 41831 | 956 |
shows "integral\<^isup>L lborel f = \<integral>x. f (p2e x) \<partial>(lborel_space.P DIM('a))"
|
|
41706
a207a858d1f6
prefer p2e before e2p; use measure_unique_Int_stable_vimage;
hoelzl
parents:
41704
diff
changeset
|
957 |
using f by (simp add: borel_fubini_positiv_integral lebesgue_integral_def) |
| 38656 | 958 |
|
| 42164 | 959 |
|
960 |
lemma Int_stable_atLeastAtMost: |
|
961 |
"Int_stable \<lparr>space = UNIV, sets = range (\<lambda>(a,b). {a::'a::ordered_euclidean_space .. b}) \<rparr>"
|
|
962 |
proof (simp add: Int_stable_def image_iff, intro allI) |
|
963 |
fix a1 b1 a2 b2 :: 'a |
|
964 |
have "\<forall>i<DIM('a). \<exists>a b. {a1$$i..b1$$i} \<inter> {a2$$i..b2$$i} = {a..b}" by auto
|
|
965 |
then have "\<exists>a b. \<forall>i<DIM('a). {a1$$i..b1$$i} \<inter> {a2$$i..b2$$i} = {a i..b i}"
|
|
966 |
unfolding choice_iff' . |
|
967 |
then guess a b by safe |
|
968 |
then have "{a1..b1} \<inter> {a2..b2} = {(\<chi>\<chi> i. a i) .. (\<chi>\<chi> i. b i)}"
|
|
969 |
by (simp add: set_eq_iff eucl_le[where 'a='a] all_conj_distrib[symmetric]) blast |
|
970 |
then show "\<exists>a' b'. {a1..b1} \<inter> {a2..b2} = {a'..b'}" by blast
|
|
971 |
qed |
|
972 |
||
973 |
lemma (in sigma_algebra) borel_measurable_sets: |
|
974 |
assumes "f \<in> measurable borel M" "A \<in> sets M" |
|
975 |
shows "f -` A \<in> sets borel" |
|
976 |
using measurable_sets[OF assms] by simp |
|
977 |
||
978 |
lemma (in sigma_algebra) measurable_identity[intro,simp]: |
|
979 |
"(\<lambda>x. x) \<in> measurable M M" |
|
980 |
unfolding measurable_def by auto |
|
981 |
||
982 |
lemma lebesgue_real_affine: |
|
983 |
fixes X :: "real set" |
|
984 |
assumes "X \<in> sets borel" and "c \<noteq> 0" |
|
| 43920 | 985 |
shows "measure lebesgue X = ereal \<bar>c\<bar> * measure lebesgue ((\<lambda>x. t + c * x) -` X)" |
| 42164 | 986 |
(is "_ = ?\<nu> X") |
987 |
proof - |
|
988 |
let ?E = "\<lparr>space = UNIV, sets = range (\<lambda>(a,b). {a::real .. b})\<rparr> :: real algebra"
|
|
989 |
let "?M \<nu>" = "\<lparr>space = space ?E, sets = sets (sigma ?E), measure = \<nu>\<rparr> :: real measure_space" |
|
990 |
have *: "?M (measure lebesgue) = lborel" |
|
991 |
unfolding borel_eq_atLeastAtMost[symmetric] |
|
992 |
by (simp add: lborel_def lebesgue_def) |
|
993 |
have **: "?M ?\<nu> = lborel \<lparr> measure := ?\<nu> \<rparr>" |
|
994 |
unfolding borel_eq_atLeastAtMost[symmetric] |
|
995 |
by (simp add: lborel_def lebesgue_def) |
|
996 |
show ?thesis |
|
997 |
proof (rule measure_unique_Int_stable[where X=X, OF Int_stable_atLeastAtMost], unfold * **) |
|
998 |
show "X \<in> sets (sigma ?E)" |
|
999 |
unfolding borel_eq_atLeastAtMost[symmetric] by fact |
|
|
44890
22f665a2e91c
new fastforce replacing fastsimp - less confusing name
nipkow
parents:
44666
diff
changeset
|
1000 |
have "\<And>x. \<exists>xa. x \<in> cube xa" apply(rule_tac x=x in mem_big_cube) by fastforce |
| 42164 | 1001 |
then show "(\<Union>i. cube i) = space ?E" by auto |
1002 |
show "incseq cube" by (intro incseq_SucI cube_subset_Suc) |
|
1003 |
show "range cube \<subseteq> sets ?E" |
|
1004 |
unfolding cube_def_raw by auto |
|
1005 |
show "\<And>i. measure lebesgue (cube i) \<noteq> \<infinity>" |
|
1006 |
by (simp add: cube_def) |
|
1007 |
show "measure_space lborel" by default |
|
1008 |
then interpret sigma_algebra "lborel\<lparr>measure := ?\<nu>\<rparr>" |
|
1009 |
by (auto simp add: measure_space_def) |
|
1010 |
show "measure_space (lborel\<lparr>measure := ?\<nu>\<rparr>)" |
|
1011 |
proof |
|
1012 |
show "positive (lborel\<lparr>measure := ?\<nu>\<rparr>) (measure (lborel\<lparr>measure := ?\<nu>\<rparr>))" |
|
| 43920 | 1013 |
by (auto simp: positive_def intro!: ereal_0_le_mult borel.borel_measurable_sets) |
| 42164 | 1014 |
show "countably_additive (lborel\<lparr>measure := ?\<nu>\<rparr>) (measure (lborel\<lparr>measure := ?\<nu>\<rparr>))" |
1015 |
proof (simp add: countably_additive_def, safe) |
|
1016 |
fix A :: "nat \<Rightarrow> real set" assume A: "range A \<subseteq> sets borel" "disjoint_family A" |
|
1017 |
then have Ai: "\<And>i. A i \<in> sets borel" by auto |
|
1018 |
have "(\<Sum>n. measure lebesgue ((\<lambda>x. t + c * x) -` A n)) = measure lebesgue (\<Union>n. (\<lambda>x. t + c * x) -` A n)" |
|
1019 |
proof (intro lborel.measure_countably_additive) |
|
1020 |
{ fix n have "(\<lambda>x. t + c * x) -` A n \<inter> space borel \<in> sets borel"
|
|
1021 |
using A borel.measurable_ident unfolding id_def |
|
1022 |
by (intro measurable_sets[where A=borel] borel.borel_measurable_add[OF _ borel.borel_measurable_times]) auto } |
|
1023 |
then show "range (\<lambda>i. (\<lambda>x. t + c * x) -` A i) \<subseteq> sets borel" by auto |
|
1024 |
from `disjoint_family A` |
|
1025 |
show "disjoint_family (\<lambda>i. (\<lambda>x. t + c * x) -` A i)" |
|
1026 |
by (rule disjoint_family_on_bisimulation) auto |
|
1027 |
qed |
|
1028 |
with Ai show "(\<Sum>n. ?\<nu> (A n)) = ?\<nu> (UNION UNIV A)" |
|
| 43920 | 1029 |
by (subst suminf_cmult_ereal) |
| 42164 | 1030 |
(auto simp: vimage_UN borel.borel_measurable_sets) |
1031 |
qed |
|
1032 |
qed |
|
1033 |
fix X assume "X \<in> sets ?E" |
|
1034 |
then obtain a b where [simp]: "X = {a .. b}" by auto
|
|
1035 |
show "measure lebesgue X = ?\<nu> X" |
|
1036 |
proof cases |
|
1037 |
assume "0 < c" |
|
1038 |
then have "(\<lambda>x. t + c * x) -` {a..b} = {(a - t) / c .. (b - t) / c}"
|
|
1039 |
by (auto simp: field_simps) |
|
1040 |
with `0 < c` show ?thesis |
|
1041 |
by (cases "a \<le> b") (auto simp: field_simps) |
|
1042 |
next |
|
1043 |
assume "\<not> 0 < c" with `c \<noteq> 0` have "c < 0" by auto |
|
1044 |
then have *: "(\<lambda>x. t + c * x) -` {a..b} = {(b - t) / c .. (a - t) / c}"
|
|
1045 |
by (auto simp: field_simps) |
|
1046 |
with `c < 0` show ?thesis |
|
1047 |
by (cases "a \<le> b") (auto simp: field_simps) |
|
1048 |
qed |
|
1049 |
qed |
|
1050 |
qed |
|
1051 |
||
| 38656 | 1052 |
end |