src/HOL/Analysis/Interval_Integral.thy
author nipkow
Thu Apr 26 19:51:32 2018 +0200 (13 months ago)
changeset 68046 6aba668aea78
parent 67974 3f352a91b45a
child 68095 4fa3e63ecc7e
permissions -rw-r--r--
new simp modifier: reorient
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(*  Title:      HOL/Analysis/Interval_Integral.thy
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    Author:     Jeremy Avigad (CMU), Johannes Hölzl (TUM), Luke Serafin (CMU)
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Lebesgue integral over an interval (with endpoints possibly +-\<infinity>)
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*)
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theory Interval_Integral
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  imports Equivalence_Lebesgue_Henstock_Integration
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begin
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lemma continuous_on_vector_derivative:
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  "(\<And>x. x \<in> S \<Longrightarrow> (f has_vector_derivative f' x) (at x within S)) \<Longrightarrow> continuous_on S f"
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  by (auto simp: continuous_on_eq_continuous_within intro!: has_vector_derivative_continuous)
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lemma has_vector_derivative_weaken:
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  fixes x D and f g s t
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  assumes f: "(f has_vector_derivative D) (at x within t)"
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    and "x \<in> s" "s \<subseteq> t"
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    and "\<And>x. x \<in> s \<Longrightarrow> f x = g x"
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  shows "(g has_vector_derivative D) (at x within s)"
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proof -
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  have "(f has_vector_derivative D) (at x within s) \<longleftrightarrow> (g has_vector_derivative D) (at x within s)"
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    unfolding has_vector_derivative_def has_derivative_iff_norm
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    using assms by (intro conj_cong Lim_cong_within refl) auto
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  then show ?thesis
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    using has_vector_derivative_within_subset[OF f \<open>s \<subseteq> t\<close>] by simp
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qed
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definition "einterval a b = {x. a < ereal x \<and> ereal x < b}"
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lemma einterval_eq[simp]:
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  shows einterval_eq_Icc: "einterval (ereal a) (ereal b) = {a <..< b}"
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    and einterval_eq_Ici: "einterval (ereal a) \<infinity> = {a <..}"
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    and einterval_eq_Iic: "einterval (- \<infinity>) (ereal b) = {..< b}"
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    and einterval_eq_UNIV: "einterval (- \<infinity>) \<infinity> = UNIV"
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  by (auto simp: einterval_def)
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lemma einterval_same: "einterval a a = {}"
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  by (auto simp add: einterval_def)
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lemma einterval_iff: "x \<in> einterval a b \<longleftrightarrow> a < ereal x \<and> ereal x < b"
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  by (simp add: einterval_def)
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lemma einterval_nonempty: "a < b \<Longrightarrow> \<exists>c. c \<in> einterval a b"
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  by (cases a b rule: ereal2_cases, auto simp: einterval_def intro!: dense gt_ex lt_ex)
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lemma open_einterval[simp]: "open (einterval a b)"
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  by (cases a b rule: ereal2_cases)
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     (auto simp: einterval_def intro!: open_Collect_conj open_Collect_less continuous_intros)
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lemma borel_einterval[measurable]: "einterval a b \<in> sets borel"
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  unfolding einterval_def by measurable
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subsection\<open>Approximating a (possibly infinite) interval\<close>
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lemma filterlim_sup1: "(LIM x F. f x :> G1) \<Longrightarrow> (LIM x F. f x :> (sup G1 G2))"
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 unfolding filterlim_def by (auto intro: le_supI1)
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lemma ereal_incseq_approx:
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  fixes a b :: ereal
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  assumes "a < b"
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  obtains X :: "nat \<Rightarrow> real" where
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    "incseq X" "\<And>i. a < X i" "\<And>i. X i < b" "X \<longlonglongrightarrow> b"
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proof (cases b)
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  case PInf
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  with \<open>a < b\<close> have "a = -\<infinity> \<or> (\<exists>r. a = ereal r)"
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    by (cases a) auto
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  moreover have "(\<lambda>x. ereal (real (Suc x))) \<longlonglongrightarrow> \<infinity>"
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      apply (subst LIMSEQ_Suc_iff)
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      apply (simp add: Lim_PInfty)
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      using nat_ceiling_le_eq by blast
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  moreover have "\<And>r. (\<lambda>x. ereal (r + real (Suc x))) \<longlonglongrightarrow> \<infinity>"
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    apply (subst LIMSEQ_Suc_iff)
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    apply (subst Lim_PInfty)
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    apply (metis add.commute diff_le_eq nat_ceiling_le_eq ereal_less_eq(3))
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    done
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  ultimately show thesis
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    by (intro that[of "\<lambda>i. real_of_ereal a + Suc i"])
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       (auto simp: incseq_def PInf)
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next
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  case (real b')
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  define d where "d = b' - (if a = -\<infinity> then b' - 1 else real_of_ereal a)"
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  with \<open>a < b\<close> have a': "0 < d"
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    by (cases a) (auto simp: real)
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  moreover
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  have "\<And>i r. r < b' \<Longrightarrow> (b' - r) * 1 < (b' - r) * real (Suc (Suc i))"
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    by (intro mult_strict_left_mono) auto
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  with \<open>a < b\<close> a' have "\<And>i. a < ereal (b' - d / real (Suc (Suc i)))"
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    by (cases a) (auto simp: real d_def field_simps)
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  moreover have "(\<lambda>i. b' - d / Suc (Suc i)) \<longlonglongrightarrow> b'"
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    apply (subst filterlim_sequentially_Suc)
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    apply (subst filterlim_sequentially_Suc)
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    apply (rule tendsto_eq_intros)
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    apply (auto intro!: tendsto_divide_0[OF tendsto_const] filterlim_sup1
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                simp: at_infinity_eq_at_top_bot filterlim_real_sequentially)
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    done
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  ultimately show thesis
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    by (intro that[of "\<lambda>i. b' - d / Suc (Suc i)"])
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       (auto simp add: real incseq_def intro!: divide_left_mono)
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qed (insert \<open>a < b\<close>, auto)
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lemma ereal_decseq_approx:
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  fixes a b :: ereal
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  assumes "a < b"
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  obtains X :: "nat \<Rightarrow> real" where
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    "decseq X" "\<And>i. a < X i" "\<And>i. X i < b" "X \<longlonglongrightarrow> a"
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proof -
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  have "-b < -a" using \<open>a < b\<close> by simp
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  from ereal_incseq_approx[OF this] guess X .
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  then show thesis
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    apply (intro that[of "\<lambda>i. - X i"])
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    apply (auto simp add: decseq_def incseq_def reorient: uminus_ereal.simps)
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    apply (metis ereal_minus_less_minus ereal_uminus_uminus ereal_Lim_uminus)+
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    done
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qed
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lemma einterval_Icc_approximation:
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  fixes a b :: ereal
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  assumes "a < b"
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  obtains u l :: "nat \<Rightarrow> real" where
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    "einterval a b = (\<Union>i. {l i .. u i})"
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    "incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
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    "l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
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proof -
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  from dense[OF \<open>a < b\<close>] obtain c where "a < c" "c < b" by safe
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  from ereal_incseq_approx[OF \<open>c < b\<close>] guess u . note u = this
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  from ereal_decseq_approx[OF \<open>a < c\<close>] guess l . note l = this
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  { fix i from less_trans[OF \<open>l i < c\<close> \<open>c < u i\<close>] have "l i < u i" by simp }
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  have "einterval a b = (\<Union>i. {l i .. u i})"
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  proof (auto simp: einterval_iff)
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    fix x assume "a < ereal x" "ereal x < b"
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    have "eventually (\<lambda>i. ereal (l i) < ereal x) sequentially"
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      using l(4) \<open>a < ereal x\<close> by (rule order_tendstoD)
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    moreover
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    have "eventually (\<lambda>i. ereal x < ereal (u i)) sequentially"
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      using u(4) \<open>ereal x< b\<close> by (rule order_tendstoD)
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    ultimately have "eventually (\<lambda>i. l i < x \<and> x < u i) sequentially"
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      by eventually_elim auto
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    then show "\<exists>i. l i \<le> x \<and> x \<le> u i"
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      by (auto intro: less_imp_le simp: eventually_sequentially)
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  next
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    fix x i assume "l i \<le> x" "x \<le> u i"
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    with \<open>a < ereal (l i)\<close> \<open>ereal (u i) < b\<close>
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    show "a < ereal x" "ereal x < b"
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      by (auto reorient: ereal_less_eq(3))
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  qed
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  show thesis
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    by (intro that) fact+
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qed
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(* TODO: in this definition, it would be more natural if einterval a b included a and b when
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   they are real. *)
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definition interval_lebesgue_integral :: "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> 'a) \<Rightarrow> 'a::{banach, second_countable_topology}" where
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  "interval_lebesgue_integral M a b f =
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    (if a \<le> b then (LINT x:einterval a b|M. f x) else - (LINT x:einterval b a|M. f x))"
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syntax
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  "_ascii_interval_lebesgue_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real measure \<Rightarrow> real \<Rightarrow> real"
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  ("(5LINT _=_.._|_. _)" [0,60,60,61,100] 60)
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translations
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  "LINT x=a..b|M. f" == "CONST interval_lebesgue_integral M a b (\<lambda>x. f)"
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definition interval_lebesgue_integrable :: "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> 'a::{banach, second_countable_topology}) \<Rightarrow> bool" where
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  "interval_lebesgue_integrable M a b f =
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    (if a \<le> b then set_integrable M (einterval a b) f else set_integrable M (einterval b a) f)"
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syntax
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  "_ascii_interval_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real \<Rightarrow> real"
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  ("(4LBINT _=_.._. _)" [0,60,60,61] 60)
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translations
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  "LBINT x=a..b. f" == "CONST interval_lebesgue_integral CONST lborel a b (\<lambda>x. f)"
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subsection\<open>Basic properties of integration over an interval\<close>
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lemma interval_lebesgue_integral_cong:
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  "a \<le> b \<Longrightarrow> (\<And>x. x \<in> einterval a b \<Longrightarrow> f x = g x) \<Longrightarrow> einterval a b \<in> sets M \<Longrightarrow>
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    interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
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  by (auto intro: set_lebesgue_integral_cong simp: interval_lebesgue_integral_def)
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lemma interval_lebesgue_integral_cong_AE:
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  "f \<in> borel_measurable M \<Longrightarrow> g \<in> borel_measurable M \<Longrightarrow>
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    a \<le> b \<Longrightarrow> AE x \<in> einterval a b in M. f x = g x \<Longrightarrow> einterval a b \<in> sets M \<Longrightarrow>
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    interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
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  by (auto intro: set_lebesgue_integral_cong_AE simp: interval_lebesgue_integral_def)
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lemma interval_integrable_mirror:
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  shows "interval_lebesgue_integrable lborel a b (\<lambda>x. f (-x)) \<longleftrightarrow>
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    interval_lebesgue_integrable lborel (-b) (-a) f"
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proof -
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  have *: "indicator (einterval a b) (- x) = (indicator (einterval (-b) (-a)) x :: real)"
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    for a b :: ereal and x :: real
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    by (cases a b rule: ereal2_cases) (auto simp: einterval_def split: split_indicator)
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  show ?thesis
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    unfolding interval_lebesgue_integrable_def
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    using lborel_integrable_real_affine_iff[symmetric, of "-1" "\<lambda>x. indicator (einterval _ _) x *\<^sub>R f x" 0]
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    by (simp add: * set_integrable_def)
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qed
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lemma interval_lebesgue_integral_add [intro, simp]:
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  fixes M a b f
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  assumes "interval_lebesgue_integrable M a b f" "interval_lebesgue_integrable M a b g"
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  shows "interval_lebesgue_integrable M a b (\<lambda>x. f x + g x)" and
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    "interval_lebesgue_integral M a b (\<lambda>x. f x + g x) =
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   interval_lebesgue_integral M a b f + interval_lebesgue_integral M a b g"
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using assms by (auto simp add: interval_lebesgue_integral_def interval_lebesgue_integrable_def
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    field_simps)
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lemma interval_lebesgue_integral_diff [intro, simp]:
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  fixes M a b f
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  assumes "interval_lebesgue_integrable M a b f"
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    "interval_lebesgue_integrable M a b g"
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  shows "interval_lebesgue_integrable M a b (\<lambda>x. f x - g x)" and
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    "interval_lebesgue_integral M a b (\<lambda>x. f x - g x) =
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   interval_lebesgue_integral M a b f - interval_lebesgue_integral M a b g"
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using assms by (auto simp add: interval_lebesgue_integral_def interval_lebesgue_integrable_def
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    field_simps)
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lemma interval_lebesgue_integrable_mult_right [intro, simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
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  shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
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    interval_lebesgue_integrable M a b (\<lambda>x. c * f x)"
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  by (simp add: interval_lebesgue_integrable_def)
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lemma interval_lebesgue_integrable_mult_left [intro, simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
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  shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
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    interval_lebesgue_integrable M a b (\<lambda>x. f x * c)"
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  by (simp add: interval_lebesgue_integrable_def)
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lemma interval_lebesgue_integrable_divide [intro, simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, field, second_countable_topology}"
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  shows "(c \<noteq> 0 \<Longrightarrow> interval_lebesgue_integrable M a b f) \<Longrightarrow>
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    interval_lebesgue_integrable M a b (\<lambda>x. f x / c)"
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  by (simp add: interval_lebesgue_integrable_def)
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lemma interval_lebesgue_integral_mult_right [simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
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  shows "interval_lebesgue_integral M a b (\<lambda>x. c * f x) =
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    c * interval_lebesgue_integral M a b f"
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  by (simp add: interval_lebesgue_integral_def)
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lemma interval_lebesgue_integral_mult_left [simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, second_countable_topology}"
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  shows "interval_lebesgue_integral M a b (\<lambda>x. f x * c) =
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    interval_lebesgue_integral M a b f * c"
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  by (simp add: interval_lebesgue_integral_def)
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lemma interval_lebesgue_integral_divide [simp]:
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  fixes M a b c and f :: "real \<Rightarrow> 'a::{banach, real_normed_field, field, second_countable_topology}"
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  shows "interval_lebesgue_integral M a b (\<lambda>x. f x / c) =
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    interval_lebesgue_integral M a b f / c"
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  by (simp add: interval_lebesgue_integral_def)
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lemma interval_lebesgue_integral_uminus:
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   257
  "interval_lebesgue_integral M a b (\<lambda>x. - f x) = - interval_lebesgue_integral M a b f"
lp15@67974
   258
  by (auto simp add: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def)
hoelzl@59092
   259
hoelzl@59092
   260
lemma interval_lebesgue_integral_of_real:
hoelzl@59092
   261
  "interval_lebesgue_integral M a b (\<lambda>x. complex_of_real (f x)) =
hoelzl@59092
   262
    of_real (interval_lebesgue_integral M a b f)"
hoelzl@59092
   263
  unfolding interval_lebesgue_integral_def
hoelzl@59092
   264
  by (auto simp add: interval_lebesgue_integral_def set_integral_complex_of_real)
hoelzl@59092
   265
hoelzl@63329
   266
lemma interval_lebesgue_integral_le_eq:
hoelzl@59092
   267
  fixes a b f
hoelzl@59092
   268
  assumes "a \<le> b"
hoelzl@59092
   269
  shows "interval_lebesgue_integral M a b f = (LINT x : einterval a b | M. f x)"
hoelzl@59092
   270
using assms by (auto simp add: interval_lebesgue_integral_def)
hoelzl@59092
   271
hoelzl@63329
   272
lemma interval_lebesgue_integral_gt_eq:
hoelzl@59092
   273
  fixes a b f
hoelzl@59092
   274
  assumes "a > b"
hoelzl@59092
   275
  shows "interval_lebesgue_integral M a b f = -(LINT x : einterval b a | M. f x)"
hoelzl@59092
   276
using assms by (auto simp add: interval_lebesgue_integral_def less_imp_le einterval_def)
hoelzl@59092
   277
hoelzl@59092
   278
lemma interval_lebesgue_integral_gt_eq':
hoelzl@59092
   279
  fixes a b f
hoelzl@59092
   280
  assumes "a > b"
hoelzl@59092
   281
  shows "interval_lebesgue_integral M a b f = - interval_lebesgue_integral M b a f"
hoelzl@59092
   282
using assms by (auto simp add: interval_lebesgue_integral_def less_imp_le einterval_def)
hoelzl@59092
   283
hoelzl@59092
   284
lemma interval_integral_endpoints_same [simp]: "(LBINT x=a..a. f x) = 0"
lp15@67974
   285
  by (simp add: interval_lebesgue_integral_def set_lebesgue_integral_def einterval_same)
hoelzl@59092
   286
hoelzl@59092
   287
lemma interval_integral_endpoints_reverse: "(LBINT x=a..b. f x) = -(LBINT x=b..a. f x)"
lp15@67974
   288
  by (cases a b rule: linorder_cases) (auto simp: interval_lebesgue_integral_def set_lebesgue_integral_def einterval_same)
hoelzl@59092
   289
hoelzl@59092
   290
lemma interval_integrable_endpoints_reverse:
hoelzl@59092
   291
  "interval_lebesgue_integrable lborel a b f \<longleftrightarrow>
hoelzl@59092
   292
    interval_lebesgue_integrable lborel b a f"
hoelzl@59092
   293
  by (cases a b rule: linorder_cases) (auto simp: interval_lebesgue_integrable_def einterval_same)
hoelzl@59092
   294
hoelzl@59092
   295
lemma interval_integral_reflect:
hoelzl@59092
   296
  "(LBINT x=a..b. f x) = (LBINT x=-b..-a. f (-x))"
hoelzl@59092
   297
proof (induct a b rule: linorder_wlog)
hoelzl@59092
   298
  case (sym a b) then show ?case
hoelzl@59092
   299
    by (auto simp add: interval_lebesgue_integral_def interval_integrable_endpoints_reverse
nipkow@62390
   300
             split: if_split_asm)
hoelzl@59092
   301
next
lp15@67974
   302
  case (le a b) 
lp15@67974
   303
  have "LBINT x:{x. - x \<in> einterval a b}. f (- x) = LBINT x:einterval (- b) (- a). f (- x)"
lp15@67974
   304
    unfolding interval_lebesgue_integrable_def set_lebesgue_integral_def
lp15@67974
   305
    apply (rule Bochner_Integration.integral_cong [OF refl])
nipkow@68046
   306
    by (auto simp: einterval_iff ereal_uminus_le_reorder ereal_uminus_less_reorder not_less
nipkow@68046
   307
             reorient: uminus_ereal.simps
hoelzl@59092
   308
             split: split_indicator)
lp15@67974
   309
  then show ?case
lp15@67974
   310
    unfolding interval_lebesgue_integral_def 
lp15@67974
   311
    by (subst set_integral_reflect) (simp add: le)
hoelzl@59092
   312
qed
hoelzl@59092
   313
hoelzl@61897
   314
lemma interval_lebesgue_integral_0_infty:
hoelzl@61897
   315
  "interval_lebesgue_integrable M 0 \<infinity> f \<longleftrightarrow> set_integrable M {0<..} f"
hoelzl@61897
   316
  "interval_lebesgue_integral M 0 \<infinity> f = (LINT x:{0<..}|M. f x)"
hoelzl@63329
   317
  unfolding zero_ereal_def
hoelzl@61897
   318
  by (auto simp: interval_lebesgue_integral_le_eq interval_lebesgue_integrable_def)
hoelzl@61897
   319
hoelzl@61897
   320
lemma interval_integral_to_infinity_eq: "(LINT x=ereal a..\<infinity> | M. f x) = (LINT x : {a<..} | M. f x)"
hoelzl@61897
   321
  unfolding interval_lebesgue_integral_def by auto
hoelzl@61897
   322
hoelzl@63329
   323
lemma interval_integrable_to_infinity_eq: "(interval_lebesgue_integrable M a \<infinity> f) =
hoelzl@61897
   324
  (set_integrable M {a<..} f)"
hoelzl@61897
   325
  unfolding interval_lebesgue_integrable_def by auto
hoelzl@61897
   326
lp15@67974
   327
subsection\<open>Basic properties of integration over an interval wrt lebesgue measure\<close>
hoelzl@59092
   328
hoelzl@59092
   329
lemma interval_integral_zero [simp]:
hoelzl@59092
   330
  fixes a b :: ereal
hoelzl@63329
   331
  shows"LBINT x=a..b. 0 = 0"
lp15@67974
   332
unfolding interval_lebesgue_integral_def set_lebesgue_integral_def einterval_eq
hoelzl@59092
   333
by simp
hoelzl@59092
   334
hoelzl@59092
   335
lemma interval_integral_const [intro, simp]:
hoelzl@59092
   336
  fixes a b c :: real
hoelzl@63329
   337
  shows "interval_lebesgue_integrable lborel a b (\<lambda>x. c)" and "LBINT x=a..b. c = c * (b - a)"
lp15@67974
   338
  unfolding interval_lebesgue_integral_def interval_lebesgue_integrable_def einterval_eq
lp15@67974
   339
  by (auto simp add: less_imp_le field_simps measure_def set_integrable_def set_lebesgue_integral_def)
hoelzl@59092
   340
hoelzl@59092
   341
lemma interval_integral_cong_AE:
hoelzl@59092
   342
  assumes [measurable]: "f \<in> borel_measurable borel" "g \<in> borel_measurable borel"
hoelzl@59092
   343
  assumes "AE x \<in> einterval (min a b) (max a b) in lborel. f x = g x"
hoelzl@59092
   344
  shows "interval_lebesgue_integral lborel a b f = interval_lebesgue_integral lborel a b g"
hoelzl@59092
   345
  using assms
hoelzl@59092
   346
proof (induct a b rule: linorder_wlog)
hoelzl@59092
   347
  case (sym a b) then show ?case
hoelzl@59092
   348
    by (simp add: min.commute max.commute interval_integral_endpoints_reverse[of a b])
hoelzl@59092
   349
next
hoelzl@59092
   350
  case (le a b) then show ?case
hoelzl@59092
   351
    by (auto simp: interval_lebesgue_integral_def max_def min_def
hoelzl@59092
   352
             intro!: set_lebesgue_integral_cong_AE)
hoelzl@59092
   353
qed
hoelzl@59092
   354
hoelzl@59092
   355
lemma interval_integral_cong:
hoelzl@63329
   356
  assumes "\<And>x. x \<in> einterval (min a b) (max a b) \<Longrightarrow> f x = g x"
hoelzl@59092
   357
  shows "interval_lebesgue_integral lborel a b f = interval_lebesgue_integral lborel a b g"
hoelzl@59092
   358
  using assms
hoelzl@59092
   359
proof (induct a b rule: linorder_wlog)
hoelzl@59092
   360
  case (sym a b) then show ?case
hoelzl@59092
   361
    by (simp add: min.commute max.commute interval_integral_endpoints_reverse[of a b])
hoelzl@59092
   362
next
hoelzl@59092
   363
  case (le a b) then show ?case
hoelzl@59092
   364
    by (auto simp: interval_lebesgue_integral_def max_def min_def
hoelzl@59092
   365
             intro!: set_lebesgue_integral_cong)
hoelzl@59092
   366
qed
hoelzl@59092
   367
hoelzl@59092
   368
lemma interval_lebesgue_integrable_cong_AE:
hoelzl@59092
   369
    "f \<in> borel_measurable lborel \<Longrightarrow> g \<in> borel_measurable lborel \<Longrightarrow>
hoelzl@59092
   370
    AE x \<in> einterval (min a b) (max a b) in lborel. f x = g x \<Longrightarrow>
hoelzl@59092
   371
    interval_lebesgue_integrable lborel a b f = interval_lebesgue_integrable lborel a b g"
hoelzl@59092
   372
  apply (simp add: interval_lebesgue_integrable_def )
hoelzl@59092
   373
  apply (intro conjI impI set_integrable_cong_AE)
hoelzl@59092
   374
  apply (auto simp: min_def max_def)
hoelzl@59092
   375
  done
hoelzl@59092
   376
hoelzl@59092
   377
lemma interval_integrable_abs_iff:
hoelzl@59092
   378
  fixes f :: "real \<Rightarrow> real"
hoelzl@59092
   379
  shows  "f \<in> borel_measurable lborel \<Longrightarrow>
hoelzl@59092
   380
    interval_lebesgue_integrable lborel a b (\<lambda>x. \<bar>f x\<bar>) = interval_lebesgue_integrable lborel a b f"
hoelzl@59092
   381
  unfolding interval_lebesgue_integrable_def
hoelzl@59092
   382
  by (subst (1 2) set_integrable_abs_iff') simp_all
hoelzl@59092
   383
hoelzl@59092
   384
lemma interval_integral_Icc:
hoelzl@59092
   385
  fixes a b :: real
hoelzl@59092
   386
  shows "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a..b}. f x)"
hoelzl@59092
   387
  by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
hoelzl@59092
   388
           simp add: interval_lebesgue_integral_def)
hoelzl@59092
   389
hoelzl@59092
   390
lemma interval_integral_Icc':
hoelzl@59092
   391
  "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {x. a \<le> ereal x \<and> ereal x \<le> b}. f x)"
lp15@61609
   392
  by (auto intro!: set_integral_discrete_difference[where X="{real_of_ereal a, real_of_ereal b}"]
hoelzl@59092
   393
           simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   394
hoelzl@59092
   395
lemma interval_integral_Ioc:
hoelzl@59092
   396
  "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a<..b}. f x)"
hoelzl@59092
   397
  by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
hoelzl@59092
   398
           simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   399
hoelzl@59092
   400
(* TODO: other versions as well? *) (* Yes: I need the Icc' version. *)
hoelzl@59092
   401
lemma interval_integral_Ioc':
hoelzl@59092
   402
  "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {x. a < ereal x \<and> ereal x \<le> b}. f x)"
lp15@61609
   403
  by (auto intro!: set_integral_discrete_difference[where X="{real_of_ereal a, real_of_ereal b}"]
hoelzl@59092
   404
           simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   405
hoelzl@59092
   406
lemma interval_integral_Ico:
hoelzl@59092
   407
  "a \<le> b \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {a..<b}. f x)"
hoelzl@59092
   408
  by (auto intro!: set_integral_discrete_difference[where X="{a, b}"]
hoelzl@59092
   409
           simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   410
hoelzl@59092
   411
lemma interval_integral_Ioi:
hoelzl@61882
   412
  "\<bar>a\<bar> < \<infinity> \<Longrightarrow> (LBINT x=a..\<infinity>. f x) = (LBINT x : {real_of_ereal a <..}. f x)"
hoelzl@59092
   413
  by (auto simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   414
hoelzl@59092
   415
lemma interval_integral_Ioo:
hoelzl@61882
   416
  "a \<le> b \<Longrightarrow> \<bar>a\<bar> < \<infinity> ==> \<bar>b\<bar> < \<infinity> \<Longrightarrow> (LBINT x=a..b. f x) = (LBINT x : {real_of_ereal a <..< real_of_ereal b}. f x)"
hoelzl@59092
   417
  by (auto simp add: interval_lebesgue_integral_def einterval_iff)
hoelzl@59092
   418
hoelzl@59092
   419
lemma interval_integral_discrete_difference:
hoelzl@59092
   420
  fixes f :: "real \<Rightarrow> 'b::{banach, second_countable_topology}" and a b :: ereal
hoelzl@59092
   421
  assumes "countable X"
hoelzl@59092
   422
  and eq: "\<And>x. a \<le> b \<Longrightarrow> a < x \<Longrightarrow> x < b \<Longrightarrow> x \<notin> X \<Longrightarrow> f x = g x"
hoelzl@59092
   423
  and anti_eq: "\<And>x. b \<le> a \<Longrightarrow> b < x \<Longrightarrow> x < a \<Longrightarrow> x \<notin> X \<Longrightarrow> f x = g x"
hoelzl@59092
   424
  assumes "\<And>x. x \<in> X \<Longrightarrow> emeasure M {x} = 0" "\<And>x. x \<in> X \<Longrightarrow> {x} \<in> sets M"
hoelzl@59092
   425
  shows "interval_lebesgue_integral M a b f = interval_lebesgue_integral M a b g"
lp15@67974
   426
  unfolding interval_lebesgue_integral_def set_lebesgue_integral_def
hoelzl@59092
   427
  apply (intro if_cong refl arg_cong[where f="\<lambda>x. - x"] integral_discrete_difference[of X] assms)
hoelzl@59092
   428
  apply (auto simp: eq anti_eq einterval_iff split: split_indicator)
hoelzl@59092
   429
  done
hoelzl@59092
   430
hoelzl@63329
   431
lemma interval_integral_sum:
hoelzl@59092
   432
  fixes a b c :: ereal
hoelzl@63329
   433
  assumes integrable: "interval_lebesgue_integrable lborel (min a (min b c)) (max a (max b c)) f"
hoelzl@59092
   434
  shows "(LBINT x=a..b. f x) + (LBINT x=b..c. f x) = (LBINT x=a..c. f x)"
hoelzl@59092
   435
proof -
hoelzl@59092
   436
  let ?I = "\<lambda>a b. LBINT x=a..b. f x"
hoelzl@59092
   437
  { fix a b c :: ereal assume "interval_lebesgue_integrable lborel a c f" "a \<le> b" "b \<le> c"
hoelzl@59092
   438
    then have ord: "a \<le> b" "b \<le> c" "a \<le> c" and f': "set_integrable lborel (einterval a c) f"
hoelzl@59092
   439
      by (auto simp: interval_lebesgue_integrable_def)
hoelzl@59092
   440
    then have f: "set_borel_measurable borel (einterval a c) f"
lp15@67974
   441
      unfolding set_integrable_def set_borel_measurable_def
hoelzl@59092
   442
      by (drule_tac borel_measurable_integrable) simp
hoelzl@59092
   443
    have "(LBINT x:einterval a c. f x) = (LBINT x:einterval a b \<union> einterval b c. f x)"
hoelzl@59092
   444
    proof (rule set_integral_cong_set)
hoelzl@59092
   445
      show "AE x in lborel. (x \<in> einterval a b \<union> einterval b c) = (x \<in> einterval a c)"
lp15@61609
   446
        using AE_lborel_singleton[of "real_of_ereal b"] ord
hoelzl@59092
   447
        by (cases a b c rule: ereal3_cases) (auto simp: einterval_iff)
lp15@67974
   448
      show "set_borel_measurable lborel (einterval a c) f" "set_borel_measurable lborel (einterval a b \<union> einterval b c) f"
lp15@67974
   449
        unfolding set_borel_measurable_def
lp15@67974
   450
        using ord by (auto simp: einterval_iff intro!: set_borel_measurable_subset[OF f, unfolded set_borel_measurable_def])
lp15@67974
   451
    qed
hoelzl@59092
   452
    also have "\<dots> = (LBINT x:einterval a b. f x) + (LBINT x:einterval b c. f x)"
hoelzl@59092
   453
      using ord
hoelzl@59092
   454
      by (intro set_integral_Un_AE) (auto intro!: set_integrable_subset[OF f'] simp: einterval_iff not_less)
hoelzl@59092
   455
    finally have "?I a b + ?I b c = ?I a c"
hoelzl@59092
   456
      using ord by (simp add: interval_lebesgue_integral_def)
hoelzl@59092
   457
  } note 1 = this
hoelzl@59092
   458
  { fix a b c :: ereal assume "interval_lebesgue_integrable lborel a c f" "a \<le> b" "b \<le> c"
hoelzl@59092
   459
    from 1[OF this] have "?I b c + ?I a b = ?I a c"
hoelzl@59092
   460
      by (metis add.commute)
hoelzl@59092
   461
  } note 2 = this
hoelzl@59092
   462
  have 3: "\<And>a b. b \<le> a \<Longrightarrow> (LBINT x=a..b. f x) = - (LBINT x=b..a. f x)"
hoelzl@59092
   463
    by (rule interval_integral_endpoints_reverse)
hoelzl@59092
   464
  show ?thesis
hoelzl@59092
   465
    using integrable
hoelzl@59092
   466
    by (cases a b b c a c rule: linorder_le_cases[case_product linorder_le_cases linorder_cases])
hoelzl@59092
   467
       (simp_all add: min_absorb1 min_absorb2 max_absorb1 max_absorb2 field_simps 1 2 3)
hoelzl@59092
   468
qed
hoelzl@59092
   469
hoelzl@59092
   470
lemma interval_integrable_isCont:
hoelzl@59092
   471
  fixes a b and f :: "real \<Rightarrow> 'a::{banach, second_countable_topology}"
hoelzl@59092
   472
  shows "(\<And>x. min a b \<le> x \<Longrightarrow> x \<le> max a b \<Longrightarrow> isCont f x) \<Longrightarrow>
hoelzl@59092
   473
    interval_lebesgue_integrable lborel a b f"
hoelzl@59092
   474
proof (induct a b rule: linorder_wlog)
hoelzl@59092
   475
  case (le a b) then show ?case
lp15@67974
   476
    unfolding interval_lebesgue_integrable_def set_integrable_def
hoelzl@59092
   477
    by (auto simp: interval_lebesgue_integrable_def
lp15@67974
   478
        intro!: set_integrable_subset[unfolded set_integrable_def, OF borel_integrable_compact[of "{a .. b}"]]
lp15@67974
   479
        continuous_at_imp_continuous_on)
hoelzl@59092
   480
qed (auto intro: interval_integrable_endpoints_reverse[THEN iffD1])
hoelzl@59092
   481
hoelzl@59092
   482
lemma interval_integrable_continuous_on:
hoelzl@59092
   483
  fixes a b :: real and f
hoelzl@59092
   484
  assumes "a \<le> b" and "continuous_on {a..b} f"
hoelzl@59092
   485
  shows "interval_lebesgue_integrable lborel a b f"
hoelzl@59092
   486
using assms unfolding interval_lebesgue_integrable_def apply simp
hoelzl@59092
   487
  by (rule set_integrable_subset, rule borel_integrable_atLeastAtMost' [of a b], auto)
hoelzl@59092
   488
hoelzl@63329
   489
lemma interval_integral_eq_integral:
hoelzl@59092
   490
  fixes f :: "real \<Rightarrow> 'a::euclidean_space"
hoelzl@59092
   491
  shows "a \<le> b \<Longrightarrow> set_integrable lborel {a..b} f \<Longrightarrow> LBINT x=a..b. f x = integral {a..b} f"
hoelzl@59092
   492
  by (subst interval_integral_Icc, simp) (rule set_borel_integral_eq_integral)
hoelzl@59092
   493
hoelzl@63329
   494
lemma interval_integral_eq_integral':
hoelzl@59092
   495
  fixes f :: "real \<Rightarrow> 'a::euclidean_space"
hoelzl@59092
   496
  shows "a \<le> b \<Longrightarrow> set_integrable lborel (einterval a b) f \<Longrightarrow> LBINT x=a..b. f x = integral (einterval a b) f"
hoelzl@59092
   497
  by (subst interval_lebesgue_integral_le_eq, simp) (rule set_borel_integral_eq_integral)
hoelzl@63329
   498
lp15@67974
   499
lp15@67974
   500
subsection\<open>General limit approximation arguments\<close>
hoelzl@59092
   501
hoelzl@59092
   502
lemma interval_integral_Icc_approx_nonneg:
hoelzl@59092
   503
  fixes a b :: ereal
hoelzl@59092
   504
  assumes "a < b"
hoelzl@59092
   505
  fixes u l :: "nat \<Rightarrow> real"
hoelzl@59092
   506
  assumes  approx: "einterval a b = (\<Union>i. {l i .. u i})"
hoelzl@59092
   507
    "incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
wenzelm@61969
   508
    "l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
hoelzl@59092
   509
  fixes f :: "real \<Rightarrow> real"
hoelzl@59092
   510
  assumes f_integrable: "\<And>i. set_integrable lborel {l i..u i} f"
hoelzl@59092
   511
  assumes f_nonneg: "AE x in lborel. a < ereal x \<longrightarrow> ereal x < b \<longrightarrow> 0 \<le> f x"
hoelzl@59092
   512
  assumes f_measurable: "set_borel_measurable lborel (einterval a b) f"
wenzelm@61969
   513
  assumes lbint_lim: "(\<lambda>i. LBINT x=l i.. u i. f x) \<longlonglongrightarrow> C"
hoelzl@63329
   514
  shows
hoelzl@59092
   515
    "set_integrable lborel (einterval a b) f"
hoelzl@59092
   516
    "(LBINT x=a..b. f x) = C"
hoelzl@59092
   517
proof -
lp15@67974
   518
  have 1 [unfolded set_integrable_def]: "\<And>i. set_integrable lborel {l i..u i} f" by (rule f_integrable)
hoelzl@59092
   519
  have 2: "AE x in lborel. mono (\<lambda>n. indicator {l n..u n} x *\<^sub>R f x)"
hoelzl@59092
   520
  proof -
hoelzl@59092
   521
     from f_nonneg have "AE x in lborel. \<forall>i. l i \<le> x \<longrightarrow> x \<le> u i \<longrightarrow> 0 \<le> f x"
hoelzl@59092
   522
      by eventually_elim
hoelzl@59092
   523
         (metis approx(5) approx(6) dual_order.strict_trans1 ereal_less_eq(3) le_less_trans)
hoelzl@59092
   524
    then show ?thesis
hoelzl@59092
   525
      apply eventually_elim
hoelzl@59092
   526
      apply (auto simp: mono_def split: split_indicator)
hoelzl@59092
   527
      apply (metis approx(3) decseqD order_trans)
hoelzl@59092
   528
      apply (metis approx(2) incseqD order_trans)
hoelzl@59092
   529
      done
hoelzl@59092
   530
  qed
wenzelm@61969
   531
  have 3: "AE x in lborel. (\<lambda>i. indicator {l i..u i} x *\<^sub>R f x) \<longlonglongrightarrow> indicator (einterval a b) x *\<^sub>R f x"
hoelzl@59092
   532
  proof -
hoelzl@59092
   533
    { fix x i assume "l i \<le> x" "x \<le> u i"
hoelzl@59092
   534
      then have "eventually (\<lambda>i. l i \<le> x \<and> x \<le> u i) sequentially"
hoelzl@59092
   535
        apply (auto simp: eventually_sequentially intro!: exI[of _ i])
hoelzl@59092
   536
        apply (metis approx(3) decseqD order_trans)
hoelzl@59092
   537
        apply (metis approx(2) incseqD order_trans)
hoelzl@59092
   538
        done
hoelzl@59092
   539
      then have "eventually (\<lambda>i. f x * indicator {l i..u i} x = f x) sequentially"
hoelzl@59092
   540
        by eventually_elim auto }
hoelzl@59092
   541
    then show ?thesis
hoelzl@59092
   542
      unfolding approx(1) by (auto intro!: AE_I2 Lim_eventually split: split_indicator)
hoelzl@59092
   543
  qed
wenzelm@61969
   544
  have 4: "(\<lambda>i. \<integral> x. indicator {l i..u i} x *\<^sub>R f x \<partial>lborel) \<longlonglongrightarrow> C"
lp15@67974
   545
    using lbint_lim by (simp add: interval_integral_Icc [unfolded set_lebesgue_integral_def] approx less_imp_le)
lp15@67974
   546
  have 5: "(\<lambda>x. indicat_real (einterval a b) x *\<^sub>R f x) \<in> borel_measurable lborel"
lp15@67974
   547
    using f_measurable set_borel_measurable_def by blast
hoelzl@59092
   548
  have "(LBINT x=a..b. f x) = lebesgue_integral lborel (\<lambda>x. indicator (einterval a b) x *\<^sub>R f x)"
lp15@67974
   549
    using assms by (simp add: interval_lebesgue_integral_def set_lebesgue_integral_def less_imp_le)
lp15@67974
   550
  also have "... = C"
lp15@67974
   551
    by (rule integral_monotone_convergence [OF 1 2 3 4 5])
hoelzl@59092
   552
  finally show "(LBINT x=a..b. f x) = C" .
hoelzl@63329
   553
  show "set_integrable lborel (einterval a b) f"
lp15@67974
   554
    unfolding set_integrable_def
hoelzl@59092
   555
    by (rule integrable_monotone_convergence[OF 1 2 3 4 5])
hoelzl@59092
   556
qed
hoelzl@59092
   557
hoelzl@59092
   558
lemma interval_integral_Icc_approx_integrable:
hoelzl@59092
   559
  fixes u l :: "nat \<Rightarrow> real" and a b :: ereal
hoelzl@59092
   560
  fixes f :: "real \<Rightarrow> 'a::{banach, second_countable_topology}"
hoelzl@59092
   561
  assumes "a < b"
hoelzl@59092
   562
  assumes  approx: "einterval a b = (\<Union>i. {l i .. u i})"
hoelzl@59092
   563
    "incseq u" "decseq l" "\<And>i. l i < u i" "\<And>i. a < l i" "\<And>i. u i < b"
wenzelm@61969
   564
    "l \<longlonglongrightarrow> a" "u \<longlonglongrightarrow> b"
hoelzl@59092
   565
  assumes f_integrable: "set_integrable lborel (einterval a b) f"
wenzelm@61969
   566
  shows "(\<lambda>i. LBINT x=l i.. u i. f x) \<longlonglongrightarrow> (LBINT x=a..b. f x)"
hoelzl@59092
   567
proof -
wenzelm@61969
   568
  have "(\<lambda>i. LBINT x:{l i.. u i}. f x) \<longlonglongrightarrow> (LBINT x:einterval a b. f x)"
lp15@67974
   569
    unfolding set_lebesgue_integral_def
hoelzl@59092
   570
  proof (rule integral_dominated_convergence)
hoelzl@59092
   571
    show "integrable lborel (\<lambda>x. norm (indicator (einterval a b) x *\<^sub>R f x))"
lp15@67974
   572
      using f_integrable integrable_norm set_integrable_def by blast
lp15@67974
   573
    show "(\<lambda>x. indicat_real (einterval a b) x *\<^sub>R f x) \<in> borel_measurable lborel"
lp15@67974
   574
      using f_integrable by (simp add: set_integrable_def)
lp15@67974
   575
    then show "\<And>i. (\<lambda>x. indicat_real {l i..u i} x *\<^sub>R f x) \<in> borel_measurable lborel"
lp15@67974
   576
      by (rule set_borel_measurable_subset [unfolded set_borel_measurable_def]) (auto simp: approx)
hoelzl@59092
   577
    show "\<And>i. AE x in lborel. norm (indicator {l i..u i} x *\<^sub>R f x) \<le> norm (indicator (einterval a b) x *\<^sub>R f x)"
hoelzl@59092
   578
      by (intro AE_I2) (auto simp: approx split: split_indicator)
wenzelm@61969
   579
    show "AE x in lborel. (\<lambda>i. indicator {l i..u i} x *\<^sub>R f x) \<longlonglongrightarrow> indicator (einterval a b) x *\<^sub>R f x"
hoelzl@59092
   580
    proof (intro AE_I2 tendsto_intros Lim_eventually)
hoelzl@59092
   581
      fix x
hoelzl@63329
   582
      { fix i assume "l i \<le> x" "x \<le> u i"
wenzelm@61808
   583
        with \<open>incseq u\<close>[THEN incseqD, of i] \<open>decseq l\<close>[THEN decseqD, of i]
hoelzl@59092
   584
        have "eventually (\<lambda>i. l i \<le> x \<and> x \<le> u i) sequentially"
hoelzl@59092
   585
          by (auto simp: eventually_sequentially decseq_def incseq_def intro: order_trans) }
hoelzl@59092
   586
      then show "eventually (\<lambda>xa. indicator {l xa..u xa} x = (indicator (einterval a b) x::real)) sequentially"
wenzelm@61969
   587
        using approx order_tendstoD(2)[OF \<open>l \<longlonglongrightarrow> a\<close>, of x] order_tendstoD(1)[OF \<open>u \<longlonglongrightarrow> b\<close>, of x]
hoelzl@59092
   588
        by (auto split: split_indicator)
hoelzl@59092
   589
    qed
hoelzl@59092
   590
  qed
wenzelm@61808
   591
  with \<open>a < b\<close> \<open>\<And>i. l i < u i\<close> show ?thesis
hoelzl@59092
   592
    by (simp add: interval_lebesgue_integral_le_eq[symmetric] interval_integral_Icc less_imp_le)
hoelzl@59092
   593
qed
hoelzl@59092
   594
lp15@67974
   595
subsection\<open>A slightly stronger Fundamental Theorem of Calculus\<close>
lp15@67974
   596
lp15@67974
   597
text\<open>Three versions: first, for finite intervals, and then two versions for
lp15@67974
   598
    arbitrary intervals.\<close>
lp15@67974
   599
hoelzl@59092
   600
(*
hoelzl@59092
   601
  TODO: make the older versions corollaries of these (using continuous_at_imp_continuous_on, etc.)
hoelzl@59092
   602
*)
hoelzl@59092
   603
hoelzl@59092
   604
(*
hoelzl@59092
   605
TODO: many proofs below require inferences like
hoelzl@59092
   606
hoelzl@59092
   607
  a < ereal x \<Longrightarrow> x < y \<Longrightarrow> a < ereal y
hoelzl@59092
   608
hoelzl@59092
   609
where x and y are real. These should be better automated.
hoelzl@59092
   610
*)
hoelzl@59092
   611
hoelzl@59092
   612
lemma interval_integral_FTC_finite:
hoelzl@59092
   613
  fixes f F :: "real \<Rightarrow> 'a::euclidean_space" and a b :: real
hoelzl@59092
   614
  assumes f: "continuous_on {min a b..max a b} f"
hoelzl@63329
   615
  assumes F: "\<And>x. min a b \<le> x \<Longrightarrow> x \<le> max a b \<Longrightarrow> (F has_vector_derivative (f x)) (at x within
hoelzl@63329
   616
    {min a b..max a b})"
hoelzl@59092
   617
  shows "(LBINT x=a..b. f x) = F b - F a"
lp15@67974
   618
proof (cases "a \<le> b")
lp15@67974
   619
  case True
lp15@67974
   620
  have "(LBINT x=a..b. f x) = (LBINT x. indicat_real {a..b} x *\<^sub>R f x)"
lp15@67974
   621
    by (simp add: True interval_integral_Icc set_lebesgue_integral_def)
lp15@67974
   622
  also have "... = F b - F a"
lp15@67974
   623
  proof (rule integral_FTC_atLeastAtMost [OF True])
lp15@67974
   624
    show "continuous_on {a..b} f"
lp15@67974
   625
      using True f by linarith
lp15@67974
   626
    show "\<And>x. \<lbrakk>a \<le> x; x \<le> b\<rbrakk> \<Longrightarrow> (F has_vector_derivative f x) (at x within {a..b})"
lp15@67974
   627
      by (metis F True max.commute max_absorb1 min_def)
lp15@67974
   628
  qed
lp15@67974
   629
  finally show ?thesis .
lp15@67974
   630
next
lp15@67974
   631
  case False
lp15@67974
   632
  then have "b \<le> a"
lp15@67974
   633
    by simp
lp15@67974
   634
  have "- interval_lebesgue_integral lborel (ereal b) (ereal a) f = - (LBINT x. indicat_real {b..a} x *\<^sub>R f x)"
lp15@67974
   635
    by (simp add: \<open>b \<le> a\<close> interval_integral_Icc set_lebesgue_integral_def)
lp15@67974
   636
  also have "... = F b - F a"
lp15@67974
   637
  proof (subst integral_FTC_atLeastAtMost [OF \<open>b \<le> a\<close>])
lp15@67974
   638
    show "continuous_on {b..a} f"
lp15@67974
   639
      using False f by linarith
lp15@67974
   640
    show "\<And>x. \<lbrakk>b \<le> x; x \<le> a\<rbrakk>
lp15@67974
   641
         \<Longrightarrow> (F has_vector_derivative f x) (at x within {b..a})"
lp15@67974
   642
      by (metis F False max_def min_def)
lp15@67974
   643
  qed auto
lp15@67974
   644
  finally show ?thesis
lp15@67974
   645
    by (metis interval_integral_endpoints_reverse)
lp15@67974
   646
qed
lp15@67974
   647
lp15@67974
   648
hoelzl@59092
   649
hoelzl@59092
   650
lemma interval_integral_FTC_nonneg:
hoelzl@59092
   651
  fixes f F :: "real \<Rightarrow> real" and a b :: ereal
hoelzl@59092
   652
  assumes "a < b"
hoelzl@63329
   653
  assumes F: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV F x :> f x"
hoelzl@63329
   654
  assumes f: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f x"
hoelzl@59092
   655
  assumes f_nonneg: "AE x in lborel. a < ereal x \<longrightarrow> ereal x < b \<longrightarrow> 0 \<le> f x"
wenzelm@61973
   656
  assumes A: "((F \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
wenzelm@61973
   657
  assumes B: "((F \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
hoelzl@59092
   658
  shows
hoelzl@63329
   659
    "set_integrable lborel (einterval a b) f"
hoelzl@59092
   660
    "(LBINT x=a..b. f x) = B - A"
hoelzl@59092
   661
proof -
wenzelm@61808
   662
  from einterval_Icc_approximation[OF \<open>a < b\<close>] guess u l . note approx = this
hoelzl@59092
   663
  have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
hoelzl@59092
   664
    by (rule order_less_le_trans, rule approx, force)
hoelzl@59092
   665
  have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
hoelzl@59092
   666
    by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
hoelzl@59092
   667
  have FTCi: "\<And>i. (LBINT x=l i..u i. f x) = F (u i) - F (l i)"
hoelzl@59092
   668
    using assms approx apply (intro interval_integral_FTC_finite)
hoelzl@59092
   669
    apply (auto simp add: less_imp_le min_def max_def
hoelzl@59092
   670
      has_field_derivative_iff_has_vector_derivative[symmetric])
hoelzl@59092
   671
    apply (rule continuous_at_imp_continuous_on, auto intro!: f)
hoelzl@59092
   672
    by (rule DERIV_subset [OF F], auto)
hoelzl@59092
   673
  have 1: "\<And>i. set_integrable lborel {l i..u i} f"
hoelzl@59092
   674
  proof -
hoelzl@59092
   675
    fix i show "set_integrable lborel {l i .. u i} f"
lp15@67974
   676
      using \<open>a < l i\<close> \<open>u i < b\<close> unfolding set_integrable_def
hoelzl@59092
   677
      by (intro borel_integrable_compact f continuous_at_imp_continuous_on compact_Icc ballI)
nipkow@68046
   678
         (auto reorient: ereal_less_eq)
hoelzl@59092
   679
  qed
hoelzl@59092
   680
  have 2: "set_borel_measurable lborel (einterval a b) f"
lp15@67974
   681
    unfolding set_borel_measurable_def
lp15@66164
   682
    by (auto simp del: real_scaleR_def intro!: borel_measurable_continuous_on_indicator
hoelzl@59092
   683
             simp: continuous_on_eq_continuous_at einterval_iff f)
wenzelm@61969
   684
  have 3: "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> B - A"
hoelzl@59092
   685
    apply (subst FTCi)
hoelzl@59092
   686
    apply (intro tendsto_intros)
hoelzl@59092
   687
    using B approx unfolding tendsto_at_iff_sequentially comp_def
hoelzl@59092
   688
    using tendsto_at_iff_sequentially[where 'a=real]
hoelzl@59092
   689
    apply (elim allE[of _ "\<lambda>i. ereal (u i)"], auto)
hoelzl@59092
   690
    using A approx unfolding tendsto_at_iff_sequentially comp_def
hoelzl@59092
   691
    by (elim allE[of _ "\<lambda>i. ereal (l i)"], auto)
hoelzl@59092
   692
  show "(LBINT x=a..b. f x) = B - A"
wenzelm@61808
   693
    by (rule interval_integral_Icc_approx_nonneg [OF \<open>a < b\<close> approx 1 f_nonneg 2 3])
hoelzl@63329
   694
  show "set_integrable lborel (einterval a b) f"
wenzelm@61808
   695
    by (rule interval_integral_Icc_approx_nonneg [OF \<open>a < b\<close> approx 1 f_nonneg 2 3])
hoelzl@59092
   696
qed
hoelzl@59092
   697
hoelzl@59092
   698
lemma interval_integral_FTC_integrable:
hoelzl@59092
   699
  fixes f F :: "real \<Rightarrow> 'a::euclidean_space" and a b :: ereal
hoelzl@59092
   700
  assumes "a < b"
hoelzl@63329
   701
  assumes F: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> (F has_vector_derivative f x) (at x)"
hoelzl@63329
   702
  assumes f: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f x"
hoelzl@59092
   703
  assumes f_integrable: "set_integrable lborel (einterval a b) f"
wenzelm@61973
   704
  assumes A: "((F \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
wenzelm@61973
   705
  assumes B: "((F \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
hoelzl@59092
   706
  shows "(LBINT x=a..b. f x) = B - A"
hoelzl@59092
   707
proof -
wenzelm@61808
   708
  from einterval_Icc_approximation[OF \<open>a < b\<close>] guess u l . note approx = this
hoelzl@59092
   709
  have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
hoelzl@59092
   710
    by (rule order_less_le_trans, rule approx, force)
hoelzl@59092
   711
  have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
hoelzl@59092
   712
    by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
hoelzl@59092
   713
  have FTCi: "\<And>i. (LBINT x=l i..u i. f x) = F (u i) - F (l i)"
hoelzl@59092
   714
    using assms approx
hoelzl@59092
   715
    by (auto simp add: less_imp_le min_def max_def
hoelzl@59092
   716
             intro!: f continuous_at_imp_continuous_on interval_integral_FTC_finite
hoelzl@59092
   717
             intro: has_vector_derivative_at_within)
wenzelm@61969
   718
  have "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> B - A"
hoelzl@59092
   719
    apply (subst FTCi)
hoelzl@59092
   720
    apply (intro tendsto_intros)
hoelzl@59092
   721
    using B approx unfolding tendsto_at_iff_sequentially comp_def
hoelzl@59092
   722
    apply (elim allE[of _ "\<lambda>i. ereal (u i)"], auto)
hoelzl@59092
   723
    using A approx unfolding tendsto_at_iff_sequentially comp_def
hoelzl@59092
   724
    by (elim allE[of _ "\<lambda>i. ereal (l i)"], auto)
wenzelm@61969
   725
  moreover have "(\<lambda>i. LBINT x=l i..u i. f x) \<longlonglongrightarrow> (LBINT x=a..b. f x)"
wenzelm@61808
   726
    by (rule interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx f_integrable])
hoelzl@59092
   727
  ultimately show ?thesis
hoelzl@59092
   728
    by (elim LIMSEQ_unique)
hoelzl@59092
   729
qed
hoelzl@59092
   730
hoelzl@63329
   731
(*
hoelzl@59092
   732
  The second Fundamental Theorem of Calculus and existence of antiderivatives on an
hoelzl@59092
   733
  einterval.
hoelzl@59092
   734
*)
hoelzl@59092
   735
hoelzl@59092
   736
lemma interval_integral_FTC2:
hoelzl@59092
   737
  fixes a b c :: real and f :: "real \<Rightarrow> 'a::euclidean_space"
hoelzl@59092
   738
  assumes "a \<le> c" "c \<le> b"
hoelzl@59092
   739
  and contf: "continuous_on {a..b} f"
hoelzl@59092
   740
  fixes x :: real
hoelzl@59092
   741
  assumes "a \<le> x" and "x \<le> b"
hoelzl@59092
   742
  shows "((\<lambda>u. LBINT y=c..u. f y) has_vector_derivative (f x)) (at x within {a..b})"
hoelzl@59092
   743
proof -
hoelzl@59092
   744
  let ?F = "(\<lambda>u. LBINT y=a..u. f y)"
hoelzl@59092
   745
  have intf: "set_integrable lborel {a..b} f"
hoelzl@59092
   746
    by (rule borel_integrable_atLeastAtMost', rule contf)
hoelzl@59092
   747
  have "((\<lambda>u. integral {a..u} f) has_vector_derivative f x) (at x within {a..b})"
hoelzl@59092
   748
    apply (intro integral_has_vector_derivative)
wenzelm@61808
   749
    using \<open>a \<le> x\<close> \<open>x \<le> b\<close> by (intro continuous_on_subset [OF contf], auto)
hoelzl@59092
   750
  then have "((\<lambda>u. integral {a..u} f) has_vector_derivative (f x)) (at x within {a..b})"
hoelzl@59092
   751
    by simp
hoelzl@59092
   752
  then have "(?F has_vector_derivative (f x)) (at x within {a..b})"
hoelzl@59092
   753
    by (rule has_vector_derivative_weaken)
hoelzl@59092
   754
       (auto intro!: assms interval_integral_eq_integral[symmetric] set_integrable_subset [OF intf])
hoelzl@59092
   755
  then have "((\<lambda>x. (LBINT y=c..a. f y) + ?F x) has_vector_derivative (f x)) (at x within {a..b})"
hoelzl@59092
   756
    by (auto intro!: derivative_eq_intros)
hoelzl@59092
   757
  then show ?thesis
hoelzl@59092
   758
  proof (rule has_vector_derivative_weaken)
hoelzl@59092
   759
    fix u assume "u \<in> {a .. b}"
hoelzl@59092
   760
    then show "(LBINT y=c..a. f y) + (LBINT y=a..u. f y) = (LBINT y=c..u. f y)"
hoelzl@59092
   761
      using assms
hoelzl@59092
   762
      apply (intro interval_integral_sum)
hoelzl@59092
   763
      apply (auto simp add: interval_lebesgue_integrable_def simp del: real_scaleR_def)
hoelzl@59092
   764
      by (rule set_integrable_subset [OF intf], auto simp add: min_def max_def)
hoelzl@59092
   765
  qed (insert assms, auto)
hoelzl@59092
   766
qed
hoelzl@59092
   767
hoelzl@63329
   768
lemma einterval_antiderivative:
hoelzl@59092
   769
  fixes a b :: ereal and f :: "real \<Rightarrow> 'a::euclidean_space"
hoelzl@59092
   770
  assumes "a < b" and contf: "\<And>x :: real. a < x \<Longrightarrow> x < b \<Longrightarrow> isCont f x"
hoelzl@59092
   771
  shows "\<exists>F. \<forall>x :: real. a < x \<longrightarrow> x < b \<longrightarrow> (F has_vector_derivative f x) (at x)"
hoelzl@59092
   772
proof -
hoelzl@63329
   773
  from einterval_nonempty [OF \<open>a < b\<close>] obtain c :: real where [simp]: "a < c" "c < b"
hoelzl@59092
   774
    by (auto simp add: einterval_def)
hoelzl@59092
   775
  let ?F = "(\<lambda>u. LBINT y=c..u. f y)"
hoelzl@59092
   776
  show ?thesis
hoelzl@59092
   777
  proof (rule exI, clarsimp)
hoelzl@59092
   778
    fix x :: real
hoelzl@59092
   779
    assume [simp]: "a < x" "x < b"
hoelzl@59092
   780
    have 1: "a < min c x" by simp
hoelzl@63329
   781
    from einterval_nonempty [OF 1] obtain d :: real where [simp]: "a < d" "d < c" "d < x"
hoelzl@59092
   782
      by (auto simp add: einterval_def)
hoelzl@59092
   783
    have 2: "max c x < b" by simp
hoelzl@63329
   784
    from einterval_nonempty [OF 2] obtain e :: real where [simp]: "c < e" "x < e" "e < b"
hoelzl@59092
   785
      by (auto simp add: einterval_def)
hoelzl@59092
   786
    show "(?F has_vector_derivative f x) (at x)"
hoelzl@59092
   787
      (* TODO: factor out the next three lines to has_field_derivative_within_open *)
hoelzl@59092
   788
      unfolding has_vector_derivative_def
hoelzl@59092
   789
      apply (subst has_derivative_within_open [of _ "{d<..<e}", symmetric], auto)
hoelzl@59092
   790
      apply (subst has_vector_derivative_def [symmetric])
hoelzl@59092
   791
      apply (rule has_vector_derivative_within_subset [of _ _ _ "{d..e}"])
hoelzl@59092
   792
      apply (rule interval_integral_FTC2, auto simp add: less_imp_le)
hoelzl@59092
   793
      apply (rule continuous_at_imp_continuous_on)
hoelzl@59092
   794
      apply (auto intro!: contf)
wenzelm@61808
   795
      apply (rule order_less_le_trans, rule \<open>a < d\<close>, auto)
hoelzl@59092
   796
      apply (rule order_le_less_trans) prefer 2
wenzelm@61808
   797
      by (rule \<open>e < b\<close>, auto)
hoelzl@59092
   798
  qed
hoelzl@59092
   799
qed
hoelzl@59092
   800
lp15@67974
   801
subsection\<open>The substitution theorem\<close>
hoelzl@59092
   802
lp15@67974
   803
text\<open>Once again, three versions: first, for finite intervals, and then two versions for
lp15@67974
   804
    arbitrary intervals.\<close>
hoelzl@63329
   805
hoelzl@59092
   806
lemma interval_integral_substitution_finite:
hoelzl@59092
   807
  fixes a b :: real and f :: "real \<Rightarrow> 'a::euclidean_space"
hoelzl@59092
   808
  assumes "a \<le> b"
hoelzl@59092
   809
  and derivg: "\<And>x. a \<le> x \<Longrightarrow> x \<le> b \<Longrightarrow> (g has_real_derivative (g' x)) (at x within {a..b})"
hoelzl@59092
   810
  and contf : "continuous_on (g ` {a..b}) f"
hoelzl@59092
   811
  and contg': "continuous_on {a..b} g'"
hoelzl@59092
   812
  shows "LBINT x=a..b. g' x *\<^sub>R f (g x) = LBINT y=g a..g b. f y"
hoelzl@59092
   813
proof-
hoelzl@59092
   814
  have v_derivg: "\<And>x. a \<le> x \<Longrightarrow> x \<le> b \<Longrightarrow> (g has_vector_derivative (g' x)) (at x within {a..b})"
hoelzl@59092
   815
    using derivg unfolding has_field_derivative_iff_has_vector_derivative .
hoelzl@59092
   816
  then have contg [simp]: "continuous_on {a..b} g"
hoelzl@59092
   817
    by (rule continuous_on_vector_derivative) auto
hoelzl@63329
   818
  have 1: "\<And>u. min (g a) (g b) \<le> u \<Longrightarrow> u \<le> max (g a) (g b) \<Longrightarrow>
hoelzl@59092
   819
      \<exists>x\<in>{a..b}. u = g x"
hoelzl@59092
   820
    apply (case_tac "g a \<le> g b")
hoelzl@59092
   821
    apply (auto simp add: min_def max_def less_imp_le)
hoelzl@59092
   822
    apply (frule (1) IVT' [of g], auto simp add: assms)
hoelzl@59092
   823
    by (frule (1) IVT2' [of g], auto simp add: assms)
wenzelm@61808
   824
  from contg \<open>a \<le> b\<close> have "\<exists>c d. g ` {a..b} = {c..d} \<and> c \<le> d"
hoelzl@59092
   825
    by (elim continuous_image_closed_interval)
hoelzl@59092
   826
  then obtain c d where g_im: "g ` {a..b} = {c..d}" and "c \<le> d" by auto
hoelzl@59092
   827
  have "\<exists>F. \<forall>x\<in>{a..b}. (F has_vector_derivative (f (g x))) (at (g x) within (g ` {a..b}))"
hoelzl@59092
   828
    apply (rule exI, auto, subst g_im)
hoelzl@59092
   829
    apply (rule interval_integral_FTC2 [of c c d])
wenzelm@61808
   830
    using \<open>c \<le> d\<close> apply auto
hoelzl@59092
   831
    apply (rule continuous_on_subset [OF contf])
hoelzl@59092
   832
    using g_im by auto
hoelzl@59092
   833
  then guess F ..
hoelzl@63329
   834
  then have derivF: "\<And>x. a \<le> x \<Longrightarrow> x \<le> b \<Longrightarrow>
hoelzl@59092
   835
    (F has_vector_derivative (f (g x))) (at (g x) within (g ` {a..b}))" by auto
hoelzl@59092
   836
  have contf2: "continuous_on {min (g a) (g b)..max (g a) (g b)} f"
hoelzl@59092
   837
    apply (rule continuous_on_subset [OF contf])
hoelzl@59092
   838
    apply (auto simp add: image_def)
hoelzl@59092
   839
    by (erule 1)
hoelzl@59092
   840
  have contfg: "continuous_on {a..b} (\<lambda>x. f (g x))"
hoelzl@59092
   841
    by (blast intro: continuous_on_compose2 contf contg)
hoelzl@59092
   842
  have "LBINT x=a..b. g' x *\<^sub>R f (g x) = F (g b) - F (g a)"
hoelzl@59092
   843
    apply (subst interval_integral_Icc, simp add: assms)
lp15@67974
   844
    unfolding set_lebesgue_integral_def
wenzelm@61808
   845
    apply (rule integral_FTC_atLeastAtMost[of a b "\<lambda>x. F (g x)", OF \<open>a \<le> b\<close>])
hoelzl@59092
   846
    apply (rule vector_diff_chain_within[OF v_derivg derivF, unfolded comp_def])
hoelzl@59092
   847
    apply (auto intro!: continuous_on_scaleR contg' contfg)
hoelzl@59092
   848
    done
hoelzl@59092
   849
  moreover have "LBINT y=(g a)..(g b). f y = F (g b) - F (g a)"
hoelzl@59092
   850
    apply (rule interval_integral_FTC_finite)
hoelzl@59092
   851
    apply (rule contf2)
hoelzl@59092
   852
    apply (frule (1) 1, auto)
hoelzl@59092
   853
    apply (rule has_vector_derivative_within_subset [OF derivF])
hoelzl@59092
   854
    apply (auto simp add: image_def)
hoelzl@59092
   855
    by (rule 1, auto)
hoelzl@59092
   856
  ultimately show ?thesis by simp
hoelzl@59092
   857
qed
hoelzl@59092
   858
hoelzl@59092
   859
(* TODO: is it possible to lift the assumption here that g' is nonnegative? *)
hoelzl@59092
   860
hoelzl@59092
   861
lemma interval_integral_substitution_integrable:
hoelzl@59092
   862
  fixes f :: "real \<Rightarrow> 'a::euclidean_space" and a b u v :: ereal
hoelzl@63329
   863
  assumes "a < b"
hoelzl@59092
   864
  and deriv_g: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV g x :> g' x"
hoelzl@59092
   865
  and contf: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f (g x)"
hoelzl@59092
   866
  and contg': "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont g' x"
hoelzl@59092
   867
  and g'_nonneg: "\<And>x. a \<le> ereal x \<Longrightarrow> ereal x \<le> b \<Longrightarrow> 0 \<le> g' x"
wenzelm@61973
   868
  and A: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
wenzelm@61973
   869
  and B: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
hoelzl@59092
   870
  and integrable: "set_integrable lborel (einterval a b) (\<lambda>x. g' x *\<^sub>R f (g x))"
hoelzl@59092
   871
  and integrable2: "set_integrable lborel (einterval A B) (\<lambda>x. f x)"
hoelzl@59092
   872
  shows "(LBINT x=A..B. f x) = (LBINT x=a..b. g' x *\<^sub>R f (g x))"
hoelzl@59092
   873
proof -
wenzelm@61808
   874
  from einterval_Icc_approximation[OF \<open>a < b\<close>] guess u l . note approx [simp] = this
hoelzl@59092
   875
  note less_imp_le [simp]
hoelzl@59092
   876
  have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
hoelzl@59092
   877
    by (rule order_less_le_trans, rule approx, force)
hoelzl@59092
   878
  have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
hoelzl@59092
   879
    by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
hoelzl@63329
   880
  have [simp]: "\<And>i. l i < b"
hoelzl@63329
   881
    apply (rule order_less_trans) prefer 2
hoelzl@59092
   882
    by (rule approx, auto, rule approx)
hoelzl@63329
   883
  have [simp]: "\<And>i. a < u i"
hoelzl@59092
   884
    by (rule order_less_trans, rule approx, auto, rule approx)
hoelzl@59092
   885
  have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> l j \<le> l i" by (rule decseqD, rule approx)
hoelzl@59092
   886
  have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> u i \<le> u j" by (rule incseqD, rule approx)
hoelzl@59092
   887
  have g_nondec [simp]: "\<And>x y. a < x \<Longrightarrow> x \<le> y \<Longrightarrow> y < b \<Longrightarrow> g x \<le> g y"
hoelzl@59092
   888
    apply (erule DERIV_nonneg_imp_nondecreasing, auto)
hoelzl@59092
   889
    apply (rule exI, rule conjI, rule deriv_g)
hoelzl@59092
   890
    apply (erule order_less_le_trans, auto)
hoelzl@59092
   891
    apply (rule order_le_less_trans, subst ereal_less_eq(3), assumption, auto)
hoelzl@59092
   892
    apply (rule g'_nonneg)
hoelzl@59092
   893
    apply (rule less_imp_le, erule order_less_le_trans, auto)
hoelzl@59092
   894
    by (rule less_imp_le, rule le_less_trans, subst ereal_less_eq(3), assumption, auto)
hoelzl@59092
   895
  have "A \<le> B" and un: "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
hoelzl@63329
   896
  proof -
wenzelm@61969
   897
    have A2: "(\<lambda>i. g (l i)) \<longlonglongrightarrow> A"
hoelzl@59092
   898
      using A apply (auto simp add: einterval_def tendsto_at_iff_sequentially comp_def)
hoelzl@59092
   899
      by (drule_tac x = "\<lambda>i. ereal (l i)" in spec, auto)
hoelzl@59092
   900
    hence A3: "\<And>i. g (l i) \<ge> A"
hoelzl@59092
   901
      by (intro decseq_le, auto simp add: decseq_def)
wenzelm@61969
   902
    have B2: "(\<lambda>i. g (u i)) \<longlonglongrightarrow> B"
hoelzl@59092
   903
      using B apply (auto simp add: einterval_def tendsto_at_iff_sequentially comp_def)
hoelzl@59092
   904
      by (drule_tac x = "\<lambda>i. ereal (u i)" in spec, auto)
hoelzl@59092
   905
    hence B3: "\<And>i. g (u i) \<le> B"
hoelzl@59092
   906
      by (intro incseq_le, auto simp add: incseq_def)
hoelzl@59092
   907
    show "A \<le> B"
hoelzl@59092
   908
      apply (rule order_trans [OF A3 [of 0]])
hoelzl@59092
   909
      apply (rule order_trans [OF _ B3 [of 0]])
hoelzl@59092
   910
      by auto
hoelzl@59092
   911
    { fix x :: real
hoelzl@63329
   912
      assume "A < x" and "x < B"
hoelzl@59092
   913
      then have "eventually (\<lambda>i. ereal (g (l i)) < x \<and> x < ereal (g (u i))) sequentially"
hoelzl@59092
   914
        apply (intro eventually_conj order_tendstoD)
hoelzl@59092
   915
        by (rule A2, assumption, rule B2, assumption)
hoelzl@59092
   916
      hence "\<exists>i. g (l i) < x \<and> x < g (u i)"
hoelzl@59092
   917
        by (simp add: eventually_sequentially, auto)
hoelzl@59092
   918
    } note AB = this
hoelzl@59092
   919
    show "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
hoelzl@59092
   920
      apply (auto simp add: einterval_def)
hoelzl@59092
   921
      apply (erule (1) AB)
hoelzl@59092
   922
      apply (rule order_le_less_trans, rule A3, simp)
hoelzl@59092
   923
      apply (rule order_less_le_trans) prefer 2
hoelzl@63329
   924
      by (rule B3, simp)
hoelzl@59092
   925
  qed
hoelzl@59092
   926
  (* finally, the main argument *)
hoelzl@59092
   927
  {
hoelzl@59092
   928
     fix i
hoelzl@59092
   929
     have "(LBINT x=l i.. u i. g' x *\<^sub>R f (g x)) = (LBINT y=g (l i)..g (u i). f y)"
hoelzl@59092
   930
        apply (rule interval_integral_substitution_finite, auto)
hoelzl@59092
   931
        apply (rule DERIV_subset)
hoelzl@59092
   932
        unfolding has_field_derivative_iff_has_vector_derivative[symmetric]
hoelzl@59092
   933
        apply (rule deriv_g)
hoelzl@59092
   934
        apply (auto intro!: continuous_at_imp_continuous_on contf contg')
hoelzl@59092
   935
        done
hoelzl@59092
   936
  } note eq1 = this
wenzelm@61969
   937
  have "(\<lambda>i. LBINT x=l i..u i. g' x *\<^sub>R f (g x)) \<longlonglongrightarrow> (LBINT x=a..b. g' x *\<^sub>R f (g x))"
wenzelm@61808
   938
    apply (rule interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx])
hoelzl@59092
   939
    by (rule assms)
wenzelm@61969
   940
  hence 2: "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> (LBINT x=a..b. g' x *\<^sub>R f (g x))"
hoelzl@59092
   941
    by (simp add: eq1)
hoelzl@59092
   942
  have incseq: "incseq (\<lambda>i. {g (l i)<..<g (u i)})"
hoelzl@59092
   943
    apply (auto simp add: incseq_def)
hoelzl@59092
   944
    apply (rule order_le_less_trans)
hoelzl@59092
   945
    prefer 2 apply (assumption, auto)
hoelzl@59092
   946
    by (erule order_less_le_trans, rule g_nondec, auto)
wenzelm@61969
   947
  have "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> (LBINT x = A..B. f x)"
hoelzl@59092
   948
    apply (subst interval_lebesgue_integral_le_eq, auto simp del: real_scaleR_def)
wenzelm@61808
   949
    apply (subst interval_lebesgue_integral_le_eq, rule \<open>A \<le> B\<close>)
hoelzl@59092
   950
    apply (subst un, rule set_integral_cont_up, auto simp del: real_scaleR_def)
hoelzl@59092
   951
    apply (rule incseq)
hoelzl@59092
   952
    apply (subst un [symmetric])
hoelzl@59092
   953
    by (rule integrable2)
hoelzl@59092
   954
  thus ?thesis by (intro LIMSEQ_unique [OF _ 2])
hoelzl@59092
   955
qed
hoelzl@59092
   956
hoelzl@59092
   957
(* TODO: the last two proofs are only slightly different. Factor out common part?
hoelzl@59092
   958
   An alternative: make the second one the main one, and then have another lemma
hoelzl@59092
   959
   that says that if f is nonnegative and all the other hypotheses hold, then it is integrable. *)
hoelzl@59092
   960
hoelzl@59092
   961
lemma interval_integral_substitution_nonneg:
hoelzl@59092
   962
  fixes f g g':: "real \<Rightarrow> real" and a b u v :: ereal
hoelzl@63329
   963
  assumes "a < b"
hoelzl@59092
   964
  and deriv_g: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> DERIV g x :> g' x"
hoelzl@59092
   965
  and contf: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont f (g x)"
hoelzl@59092
   966
  and contg': "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> isCont g' x"
hoelzl@59092
   967
  and f_nonneg: "\<And>x. a < ereal x \<Longrightarrow> ereal x < b \<Longrightarrow> 0 \<le> f (g x)" (* TODO: make this AE? *)
hoelzl@59092
   968
  and g'_nonneg: "\<And>x. a \<le> ereal x \<Longrightarrow> ereal x \<le> b \<Longrightarrow> 0 \<le> g' x"
wenzelm@61973
   969
  and A: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> A) (at_right a)"
wenzelm@61973
   970
  and B: "((ereal \<circ> g \<circ> real_of_ereal) \<longlongrightarrow> B) (at_left b)"
hoelzl@59092
   971
  and integrable_fg: "set_integrable lborel (einterval a b) (\<lambda>x. f (g x) * g' x)"
hoelzl@63329
   972
  shows
hoelzl@59092
   973
    "set_integrable lborel (einterval A B) f"
hoelzl@59092
   974
    "(LBINT x=A..B. f x) = (LBINT x=a..b. (f (g x) * g' x))"
hoelzl@59092
   975
proof -
wenzelm@61808
   976
  from einterval_Icc_approximation[OF \<open>a < b\<close>] guess u l . note approx [simp] = this
hoelzl@59092
   977
  note less_imp_le [simp]
hoelzl@59092
   978
  have [simp]: "\<And>x i. l i \<le> x \<Longrightarrow> a < ereal x"
hoelzl@59092
   979
    by (rule order_less_le_trans, rule approx, force)
hoelzl@59092
   980
  have [simp]: "\<And>x i. x \<le> u i \<Longrightarrow> ereal x < b"
hoelzl@59092
   981
    by (rule order_le_less_trans, subst ereal_less_eq(3), assumption, rule approx)
hoelzl@63329
   982
  have [simp]: "\<And>i. l i < b"
hoelzl@63329
   983
    apply (rule order_less_trans) prefer 2
hoelzl@59092
   984
    by (rule approx, auto, rule approx)
hoelzl@63329
   985
  have [simp]: "\<And>i. a < u i"
hoelzl@59092
   986
    by (rule order_less_trans, rule approx, auto, rule approx)
hoelzl@59092
   987
  have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> l j \<le> l i" by (rule decseqD, rule approx)
hoelzl@59092
   988
  have [simp]: "\<And>i j. i \<le> j \<Longrightarrow> u i \<le> u j" by (rule incseqD, rule approx)
hoelzl@59092
   989
  have g_nondec [simp]: "\<And>x y. a < x \<Longrightarrow> x \<le> y \<Longrightarrow> y < b \<Longrightarrow> g x \<le> g y"
hoelzl@59092
   990
    apply (erule DERIV_nonneg_imp_nondecreasing, auto)
hoelzl@59092
   991
    apply (rule exI, rule conjI, rule deriv_g)
hoelzl@59092
   992
    apply (erule order_less_le_trans, auto)
hoelzl@59092
   993
    apply (rule order_le_less_trans, subst ereal_less_eq(3), assumption, auto)
hoelzl@59092
   994
    apply (rule g'_nonneg)
hoelzl@59092
   995
    apply (rule less_imp_le, erule order_less_le_trans, auto)
hoelzl@59092
   996
    by (rule less_imp_le, rule le_less_trans, subst ereal_less_eq(3), assumption, auto)
hoelzl@59092
   997
  have "A \<le> B" and un: "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
hoelzl@63329
   998
  proof -
wenzelm@61969
   999
    have A2: "(\<lambda>i. g (l i)) \<longlonglongrightarrow> A"
hoelzl@59092
  1000
      using A apply (auto simp add: einterval_def tendsto_at_iff_sequentially comp_def)
hoelzl@59092
  1001
      by (drule_tac x = "\<lambda>i. ereal (l i)" in spec, auto)
hoelzl@59092
  1002
    hence A3: "\<And>i. g (l i) \<ge> A"
hoelzl@59092
  1003
      by (intro decseq_le, auto simp add: decseq_def)
wenzelm@61969
  1004
    have B2: "(\<lambda>i. g (u i)) \<longlonglongrightarrow> B"
hoelzl@59092
  1005
      using B apply (auto simp add: einterval_def tendsto_at_iff_sequentially comp_def)
hoelzl@59092
  1006
      by (drule_tac x = "\<lambda>i. ereal (u i)" in spec, auto)
hoelzl@59092
  1007
    hence B3: "\<And>i. g (u i) \<le> B"
hoelzl@59092
  1008
      by (intro incseq_le, auto simp add: incseq_def)
hoelzl@59092
  1009
    show "A \<le> B"
hoelzl@59092
  1010
      apply (rule order_trans [OF A3 [of 0]])
hoelzl@59092
  1011
      apply (rule order_trans [OF _ B3 [of 0]])
hoelzl@59092
  1012
      by auto
hoelzl@59092
  1013
    { fix x :: real
hoelzl@63329
  1014
      assume "A < x" and "x < B"
hoelzl@59092
  1015
      then have "eventually (\<lambda>i. ereal (g (l i)) < x \<and> x < ereal (g (u i))) sequentially"
hoelzl@59092
  1016
        apply (intro eventually_conj order_tendstoD)
hoelzl@59092
  1017
        by (rule A2, assumption, rule B2, assumption)
hoelzl@59092
  1018
      hence "\<exists>i. g (l i) < x \<and> x < g (u i)"
hoelzl@59092
  1019
        by (simp add: eventually_sequentially, auto)
hoelzl@59092
  1020
    } note AB = this
hoelzl@59092
  1021
    show "einterval A B = (\<Union>i. {g(l i)<..<g(u i)})"
hoelzl@59092
  1022
      apply (auto simp add: einterval_def)
hoelzl@59092
  1023
      apply (erule (1) AB)
hoelzl@59092
  1024
      apply (rule order_le_less_trans, rule A3, simp)
hoelzl@59092
  1025
      apply (rule order_less_le_trans) prefer 2
hoelzl@63329
  1026
      by (rule B3, simp)
hoelzl@59092
  1027
  qed
hoelzl@59092
  1028
  (* finally, the main argument *)
hoelzl@59092
  1029
  {
hoelzl@59092
  1030
     fix i
hoelzl@59092
  1031
     have "(LBINT x=l i.. u i. g' x *\<^sub>R f (g x)) = (LBINT y=g (l i)..g (u i). f y)"
hoelzl@59092
  1032
        apply (rule interval_integral_substitution_finite, auto)
hoelzl@59092
  1033
        apply (rule DERIV_subset, rule deriv_g, auto)
hoelzl@59092
  1034
        apply (rule continuous_at_imp_continuous_on, auto, rule contf, auto)
hoelzl@59092
  1035
        by (rule continuous_at_imp_continuous_on, auto, rule contg', auto)
hoelzl@59092
  1036
     then have "(LBINT x=l i.. u i. (f (g x) * g' x)) = (LBINT y=g (l i)..g (u i). f y)"
hoelzl@59092
  1037
       by (simp add: ac_simps)
hoelzl@59092
  1038
  } note eq1 = this
hoelzl@59092
  1039
  have "(\<lambda>i. LBINT x=l i..u i. f (g x) * g' x)
wenzelm@61969
  1040
      \<longlonglongrightarrow> (LBINT x=a..b. f (g x) * g' x)"
wenzelm@61808
  1041
    apply (rule interval_integral_Icc_approx_integrable [OF \<open>a < b\<close> approx])
hoelzl@59092
  1042
    by (rule assms)
wenzelm@61969
  1043
  hence 2: "(\<lambda>i. (LBINT y=g (l i)..g (u i). f y)) \<longlonglongrightarrow> (LBINT x=a..b. f (g x) * g' x)"
hoelzl@59092
  1044
    by (simp add: eq1)
hoelzl@59092
  1045
  have incseq: "incseq (\<lambda>i. {g (l i)<..<g (u i)})"
hoelzl@59092
  1046
    apply (auto simp add: incseq_def)
hoelzl@59092
  1047
    apply (rule order_le_less_trans)
hoelzl@59092
  1048
    prefer 2 apply assumption
hoelzl@59092
  1049
    apply (rule g_nondec, auto)
hoelzl@59092
  1050
    by (erule order_less_le_trans, rule g_nondec, auto)
hoelzl@59092
  1051
  have img: "\<And>x i. g (l i) \<le> x \<Longrightarrow> x \<le> g (u i) \<Longrightarrow> \<exists>c \<ge> l i. c \<le> u i \<and> x = g c"
hoelzl@63329
  1052
    apply (frule (1) IVT' [of g], auto)
hoelzl@59092
  1053
    apply (rule continuous_at_imp_continuous_on, auto)
hoelzl@59092
  1054
    by (rule DERIV_isCont, rule deriv_g, auto)
hoelzl@59092
  1055
  have nonneg_f2: "\<And>x i. g (l i) \<le> x \<Longrightarrow> x \<le> g (u i) \<Longrightarrow> 0 \<le> f x"
hoelzl@59092
  1056
    by (frule (1) img, auto, rule f_nonneg, auto)
hoelzl@59092
  1057
  have contf_2: "\<And>x i. g (l i) \<le> x \<Longrightarrow> x \<le> g (u i) \<Longrightarrow> isCont f x"
hoelzl@59092
  1058
    by (frule (1) img, auto, rule contf, auto)
hoelzl@59092
  1059
  have integrable: "set_integrable lborel (\<Union>i. {g (l i)<..<g (u i)}) f"
hoelzl@59092
  1060
    apply (rule pos_integrable_to_top, auto simp del: real_scaleR_def)
hoelzl@59092
  1061
    apply (rule incseq)
hoelzl@59092
  1062
    apply (rule nonneg_f2, erule less_imp_le, erule less_imp_le)
hoelzl@59092
  1063
    apply (rule set_integrable_subset)
hoelzl@59092
  1064
    apply (rule borel_integrable_atLeastAtMost')
hoelzl@59092
  1065
    apply (rule continuous_at_imp_continuous_on)
hoelzl@59092
  1066
    apply (clarsimp, erule (1) contf_2, auto)
hoelzl@59092
  1067
    apply (erule less_imp_le)+
hoelzl@59092
  1068
    using 2 unfolding interval_lebesgue_integral_def
hoelzl@59092
  1069
    by auto
hoelzl@59092
  1070
  thus "set_integrable lborel (einterval A B) f"
hoelzl@59092
  1071
    by (simp add: un)
hoelzl@59092
  1072
hoelzl@59092
  1073
  have "(LBINT x=A..B. f x) = (LBINT x=a..b. g' x *\<^sub>R f (g x))"
hoelzl@59092
  1074
  proof (rule interval_integral_substitution_integrable)
hoelzl@59092
  1075
    show "set_integrable lborel (einterval a b) (\<lambda>x. g' x *\<^sub>R f (g x))"
hoelzl@59092
  1076
      using integrable_fg by (simp add: ac_simps)
hoelzl@59092
  1077
  qed fact+
hoelzl@59092
  1078
  then show "(LBINT x=A..B. f x) = (LBINT x=a..b. (f (g x) * g' x))"
hoelzl@59092
  1079
    by (simp add: ac_simps)
hoelzl@59092
  1080
qed
hoelzl@59092
  1081
hoelzl@59092
  1082
hoelzl@63941
  1083
syntax "_complex_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real \<Rightarrow> complex"
hoelzl@63941
  1084
  ("(2CLBINT _. _)" [0,60] 60)
hoelzl@63941
  1085
hoelzl@63941
  1086
translations "CLBINT x. f" == "CONST complex_lebesgue_integral CONST lborel (\<lambda>x. f)"
hoelzl@63941
  1087
hoelzl@63941
  1088
syntax "_complex_set_lebesgue_borel_integral" :: "pttrn \<Rightarrow> real set \<Rightarrow> real \<Rightarrow> complex"
hoelzl@63941
  1089
  ("(3CLBINT _:_. _)" [0,60,61] 60)
hoelzl@59092
  1090
hoelzl@59092
  1091
translations
hoelzl@63941
  1092
  "CLBINT x:A. f" == "CONST complex_set_lebesgue_integral CONST lborel A (\<lambda>x. f)"
hoelzl@59092
  1093
hoelzl@63329
  1094
abbreviation complex_interval_lebesgue_integral ::
hoelzl@59092
  1095
    "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> complex) \<Rightarrow> complex" where
hoelzl@59092
  1096
  "complex_interval_lebesgue_integral M a b f \<equiv> interval_lebesgue_integral M a b f"
hoelzl@59092
  1097
hoelzl@63329
  1098
abbreviation complex_interval_lebesgue_integrable ::
hoelzl@59092
  1099
  "real measure \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> (real \<Rightarrow> complex) \<Rightarrow> bool" where
hoelzl@59092
  1100
  "complex_interval_lebesgue_integrable M a b f \<equiv> interval_lebesgue_integrable M a b f"
hoelzl@59092
  1101
hoelzl@59092
  1102
syntax
hoelzl@59092
  1103
  "_ascii_complex_interval_lebesgue_borel_integral" :: "pttrn \<Rightarrow> ereal \<Rightarrow> ereal \<Rightarrow> real \<Rightarrow> complex"
hoelzl@59092
  1104
  ("(4CLBINT _=_.._. _)" [0,60,60,61] 60)
hoelzl@59092
  1105
hoelzl@59092
  1106
translations
hoelzl@59092
  1107
  "CLBINT x=a..b. f" == "CONST complex_interval_lebesgue_integral CONST lborel a b (\<lambda>x. f)"
hoelzl@59092
  1108
hoelzl@59092
  1109
lemma interval_integral_norm:
hoelzl@59092
  1110
  fixes f :: "real \<Rightarrow> 'a :: {banach, second_countable_topology}"
hoelzl@59092
  1111
  shows "interval_lebesgue_integrable lborel a b f \<Longrightarrow> a \<le> b \<Longrightarrow>
hoelzl@59092
  1112
    norm (LBINT t=a..b. f t) \<le> LBINT t=a..b. norm (f t)"
hoelzl@59092
  1113
  using integral_norm_bound[of lborel "\<lambda>x. indicator (einterval a b) x *\<^sub>R f x"]
lp15@67974
  1114
  by (auto simp add: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def)
hoelzl@59092
  1115
hoelzl@59092
  1116
lemma interval_integral_norm2:
hoelzl@63329
  1117
  "interval_lebesgue_integrable lborel a b f \<Longrightarrow>
wenzelm@61945
  1118
    norm (LBINT t=a..b. f t) \<le> \<bar>LBINT t=a..b. norm (f t)\<bar>"
hoelzl@59092
  1119
proof (induct a b rule: linorder_wlog)
hoelzl@59092
  1120
  case (sym a b) then show ?case
hoelzl@59092
  1121
    by (simp add: interval_integral_endpoints_reverse[of a b] interval_integrable_endpoints_reverse[of a b])
hoelzl@59092
  1122
next
hoelzl@63329
  1123
  case (le a b)
hoelzl@63329
  1124
  then have "\<bar>LBINT t=a..b. norm (f t)\<bar> = LBINT t=a..b. norm (f t)"
hoelzl@59092
  1125
    using integrable_norm[of lborel "\<lambda>x. indicator (einterval a b) x *\<^sub>R f x"]
lp15@67974
  1126
    by (auto simp add: interval_lebesgue_integral_def interval_lebesgue_integrable_def set_lebesgue_integral_def
hoelzl@59092
  1127
             intro!: integral_nonneg_AE abs_of_nonneg)
hoelzl@59092
  1128
  then show ?case
hoelzl@59092
  1129
    using le by (simp add: interval_integral_norm)
hoelzl@59092
  1130
qed
hoelzl@59092
  1131
hoelzl@59092
  1132
(* TODO: should we have a library of facts like these? *)
hoelzl@59092
  1133
lemma integral_cos: "t \<noteq> 0 \<Longrightarrow> LBINT x=a..b. cos (t * x) = sin (t * b) / t - sin (t * a) / t"
hoelzl@59092
  1134
  apply (intro interval_integral_FTC_finite continuous_intros)
hoelzl@59092
  1135
  by (auto intro!: derivative_eq_intros simp: has_field_derivative_iff_has_vector_derivative[symmetric])
hoelzl@59092
  1136
hoelzl@59092
  1137
hoelzl@59092
  1138
end