diff --git a/CHANGELOG_UNRELEASED.md b/CHANGELOG_UNRELEASED.md index 7a5228a1c..172ae0368 100644 --- a/CHANGELOG_UNRELEASED.md +++ b/CHANGELOG_UNRELEASED.md @@ -15,6 +15,22 @@ - in `lebesgue_measure.v`: + lemma `measurable_indicP` +- in `numfun.v`: + + defintions `funrpos`, `funrneg` with notations `^\+` and `^\-` + + lemmas `funrpos_ge0`, `funrneg_ge0`, `funrposN`, `funrnegN`, `ge0_funrposE`, + `ge0_funrnegE`, `le0_funrposE`, `le0_funrnegE`, `ge0_funrposM`, `ge0_funrnegM`, + `le0_funrposM`, `le0_funrnegM`, `funr_normr`, `funrposneg`, `funrD_Dpos`, + `funrD_posD`, `funrpos_le`, `funrneg_le` + + lemmas `funerpos`, `funerneg` + +- in `measure.v`: + + lemma `preimage_class_comp` + + defintions `mapping_display`, `g_sigma_algebra_mappingType`, `g_sigma_algebra_mapping`, + notations `.-mapping`, `.-mapping.-measurable` + +- in `lebesgue_measure.v`: + + lemmas `measurable_funrpos`, `measurable_funrneg` + - in `lebesgue_integral.v`: + definition `dyadic_approx` (was `Let A`) + definition `integer_approx` (was `Let B`) @@ -28,6 +44,20 @@ + lemma `expectation_def` + notation `'M_` +- new file `independence.v`: + + lemma `expectationM_ge0` + + definition `independent_events` + + definition `mutual_independence` + + definition `independent_RVs` + + definition `independent_RVs2` + + lemmas `g_sigma_algebra_mapping_comp`, `g_sigma_algebra_mapping_funrpos`, + `g_sigma_algebra_mapping_funrneg` + + lemmas `independent_RVs2_comp`, `independent_RVs2_funrposneg`, + `independent_RVs2_funrnegpos`, `independent_RVs2_funrnegneg`, + `independent_RVs2_funrpospos` + + lemma `expectationM_ge0`, `integrable_expectationM`, `independent_integrableM`, + ` expectation_prod` + - in `lebesgue_integral.v`: + lemmas `integrable_pushforward`, `integral_pushforward` + lemma `integral_measure_add` diff --git a/_CoqProject b/_CoqProject index 882574185..fd675df69 100644 --- a/_CoqProject +++ b/_CoqProject @@ -86,6 +86,7 @@ theories/lebesgue_integral.v theories/ftc.v theories/hoelder.v theories/probability.v +theories/independence.v theories/convex.v theories/charge.v theories/kernel.v diff --git a/theories/Make b/theories/Make index d82042d37..dacb6a9d7 100644 --- a/theories/Make +++ b/theories/Make @@ -52,6 +52,7 @@ lebesgue_integral.v ftc.v hoelder.v probability.v +independence.v lebesgue_stieltjes_measure.v convex.v charge.v diff --git a/theories/independence.v b/theories/independence.v new file mode 100644 index 000000000..6e8bd8d78 --- /dev/null +++ b/theories/independence.v @@ -0,0 +1,1130 @@ +(* mathcomp analysis (c) 2022 Inria and AIST. License: CeCILL-C. *) +From mathcomp Require Import all_ssreflect. +From mathcomp Require Import ssralg poly ssrnum ssrint interval finmap. +From mathcomp Require Import mathcomp_extra boolp classical_sets functions. +From mathcomp Require Import cardinality fsbigop. +From HB Require Import structures. +From mathcomp Require Import exp numfun lebesgue_measure lebesgue_integral. +From mathcomp Require Import reals ereal signed topology normedtype sequences. +From mathcomp Require Import esum measure exp numfun lebesgue_measure. +From mathcomp Require Import lebesgue_integral kernel probability. + +(**md**************************************************************************) +(* # Independence *) +(* *) +(* ``` *) +(* independent_events I F == the events F indexed by I are independent *) +(* mutual_independence I F == the set systems F indexed by I are independent *) +(* independent_RVs I X == the random variables X indexed by I are independent *) +(* independent_RVs2 X Y == the random variables X and Y are independent *) +(* ``` *) +(* *) +(******************************************************************************) + +Set Implicit Arguments. +Unset Strict Implicit. +Unset Printing Implicit Defensive. + +Import Order.TTheory GRing.Theory Num.Def Num.Theory. +Import numFieldTopology.Exports. + +Local Open Scope classical_set_scope. +Local Open Scope ring_scope. + +Section independent_events. +Context {R : realType} d {T : measurableType d} (P : probability T R) + {I0 : choiceType}. +Local Open Scope ereal_scope. + +Definition independent_events (I : set I0) (E : I0 -> set T) := + (forall i, I i -> measurable (E i)) /\ + forall J : {fset I0}, [set` J] `<=` I -> + P (\bigcap_(i in [set` J]) E i) = \prod_(i <- J) P (E i). + +End independent_events. + +Section mutual_independence. +Context {R : realType} d {T : measurableType d} (P : probability T R) + {I0 : choiceType}. +Local Open Scope ereal_scope. + +Definition g_sigma_family (I : set I0) (F : I0 -> set_system T) + : set_system T := + <>. + +Definition mutual_independence (I : set I0) (F : I0 -> set_system T) := + (forall i, I i -> F i `<=` measurable) /\ + forall J : {fset I0}, [set` J] `<=` I -> + forall E, (forall i, i \in J -> E i \in F i) -> + P (\big[setI/setT]_(j <- J) E j) = \prod_(j <- J) P (E j). + +Lemma eq_mutual_independence (I : set I0) (F F' : I0 -> set_system T) : + (forall i, I i -> F i = F' i) -> + mutual_independence I F -> mutual_independence I F'. +Proof. +move=> FF' IF; split => [i Ii|J JI E EF']. + by rewrite -FF'//; apply IF. +apply IF => // i iJ. +by rewrite FF' ?EF'//; exact: JI. +Qed. + +End mutual_independence. + +Section independence. +Context {R : realType} d {T : measurableType d} (P : probability T R). +Local Open Scope ereal_scope. + +Definition independence (F G : set_system T) := + [/\ F `<=` measurable , G `<=` measurable & + forall A B, A \in F -> B \in G -> P (A `&` B) = P A * P B]. + +Lemma independenceP (F G : set_system T) : independence F G <-> + mutual_independence P [set: bool] (fun b => if b then F else G). +Proof. +split=> [[mF mG FG]|/= indeF]. + split=> [/= [|]//|/= J Jbool E EF]. + have [/eqP Jtrue|/eqP Jfalse| |] := set_bool [set` J]. + - rewrite -bigcap_fset Jtrue bigcap_set1. + by rewrite fsbig_seq ?Jtrue ?fsbig_set1. + - rewrite -bigcap_fset Jfalse bigcap_set1. + by rewrite fsbig_seq// ?Jfalse fsbig_set1. + - rewrite set_seq_eq0 => /eqP ->. + by rewrite !big_nil probability_setT. + - rewrite setT_bool => /eqP {}Jbool. + rewrite -bigcap_fset Jbool bigcap_setU1 bigcap_set1. + rewrite FG//. + + rewrite -(set_fsetK J) Jbool. + rewrite fset_setU1//= fset_set1. + rewrite big_fsetU1 ?inE//=. + by rewrite big_seq_fset1. + + rewrite EF//. + rewrite -(set_fsetK J) Jbool. + by rewrite in_fset_set// !inE/=; left. + + rewrite EF//. + rewrite -(set_fsetK J) Jbool. + by rewrite in_fset_set// !inE/=; right. +split. +- by case: indeF => /= [+ _] => /(_ true); exact. +- by case: indeF => /= [+ _] => /(_ false); exact. +- move=> A B AF BG. + case: indeF => _ /= /(_ [fset true; false]%fset _ (fun b => if b then A else B)). + do 2 rewrite big_fsetU1/= ?inE//= big_seq_fset1. + by apply => // -[]. +Qed. + +End independence. + +Lemma setI_closed_setT T (F : set_system T) : + setI_closed F -> setI_closed (F `|` [set setT]). +Proof. +move=> IF=> C D [FC|/= ->{C}]. +- move=> [FD|/= ->{D}]. + by left; exact: IF. + by rewrite setIT; left. +- move=> [FD|->{D}]. + by rewrite setTI; left. + by rewrite !setTI; right. +Qed. + +Lemma setI_closed_set0 T (F : set_system T) : + setI_closed F -> setI_closed (F `|` [set set0]). +Proof. +move=> IF=> C D [FC|/= ->{C}]. +- move=> [FD|/= ->{D}]. + by left; exact: IF. + by rewrite setI0; right. +- move=> [FD|->{D}]. + by rewrite set0I; right. + by rewrite !set0I; right. +Qed. + +Lemma setI_closed_set0' T (F : set_system T) : + F set0 -> + setI_closed (F `|` [set set0]) -> setI_closed F. +Proof. +move=> F0 IF C D FC FD. +have [//|/= ->//] : (F `|` [set set0]) (C `&` D). +by apply: IF; left. +Qed. + +Lemma g_sigma_setU d {T : measurableType d} (F : set_system T) A : + <> A -> + <> = @measurable _ T -> + <> = <>. +Proof. +move=> FA sFT; apply/seteqP; split=> [B|B]. + by apply: sub_sigma_algebra2; exact: subsetUl. +apply: smallest_sub => // C [FC|/= ->//]. +exact: sub_gen_smallest. +Qed. + +Lemma g_sigma_algebra_finite_measure_unique {d} {T : measurableType d} + {R : realType} (G : set_system T) : + G `<=` d.-measurable -> + setI_closed G -> + forall m1 m2 : {finite_measure set T -> \bar R}, + m1 [set: T] = m2 [set: T] -> + (forall A : set T, G A -> m1 A = m2 A) -> + forall E : set T, <> E -> m1 E = m2 E. +Proof. +move=> Gm IG m1 m2 m1m2T m1m2 E sGE. +apply: (@g_sigma_algebra_measure_unique _ _ _ + (G `|` [set setT]) _ (fun=> setT)) => //. +- by move=> A [/Gm//|/= ->//]. +- by right. +- by rewrite bigcup_const. +- exact: setI_closed_setT. +- by move=> B [/m1m2 //|/= ->]. +- by move=> n; apply: fin_num_fun_lty; exact: fin_num_measure. +- move: E sGE; apply: smallest_sub => // C GC. + by apply: sub_gen_smallest; left. +Qed. + +(*Section lem142b. +Context d {T : measurableType d} {R : realType}. +Variable mu : {finite_measure set T -> \bar R}. +Variable F : set_system T. +Hypothesis setI_closed_F : setI_closed F. (* pi-system *) +Hypothesis FT : F `<=` @measurable _ T. +Hypothesis sFT : <> = @measurable _ T. + +Lemma lem142b : forall nu : {finite_measure set T -> \bar R}, + (mu setT = nu setT) -> + (forall E, F E -> nu E = mu E) -> + forall A, measurable A -> mu A = nu A. +Proof. +move=> nu munu numu A mA. +apply: (measure_unique (F `|` [set setT]) (fun=> setT)) => //. +- rewrite -sFT; apply: g_sigma_setU => //. + by rewrite sFT. +- exact: setI_closed_setT. +- by move=> n /=; right. +- by rewrite bigcup_const. +- move=> E [/numu //|/= ->]. + by rewrite munu. +- move=> n. + apply: fin_num_fun_lty. + exact: fin_num_measure. +Qed. + +End lem142b.*) + +Section mutual_independence_properties. +Context {R : realType} d {T : measurableType d} (P : probability T R). +Local Open Scope ereal_scope. + +(**md see Achim Klenke's Probability Thery, Ch.2, sec.2.1, thm.2.13(i) *) +Lemma mutual_independence_fset {I0 : choiceType} (I : {fset I0}) + (F : I0 -> set_system T) : + (forall i, i \in I -> F i `<=` measurable /\ (F i) [set: T]) -> + mutual_independence P [set` I] F <-> + forall E, (forall i, i \in I -> E i \in F i) -> + P (\big[setI/setT]_(j <- I) E j) = \prod_(j <- I) P (E j). +Proof. +move=> mF; split=> [indeF E EF|indeF]; first by apply indeF. +split=> [i /mF[]//|J JI E EF]. +pose E' i := if i \in J then E i else [set: T]. +have /indeF : forall i, i \in I -> E' i \in F i. + move=> i iI; rewrite /E'; case: ifPn => [|iJ]; first exact: EF. + by rewrite inE; apply mF. +move/fsubsetP : (JI) => /(big_fset_incl _) <- /=; last first. + by move=> j jI jJ; rewrite /E' (negbTE jJ). +move/fsubsetP : (JI) => /(big_fset_incl _) <- /=; last first. + by move=> j jI jJ; rewrite /E' (negbTE jJ); rewrite probability_setT. +rewrite big_seq [in X in X = _ -> _](eq_bigr E); last first. + by move=> i iJ; rewrite /E' iJ. +rewrite -big_seq => ->. +by rewrite !big_seq; apply: eq_bigr => i iJ; rewrite /E' iJ. +Qed. + +(**md see Achim Klenke's Probability Thery, Ch.2, sec.2.1, thm.2.13(ii) *) +Lemma mutual_independence_finiteS {I0 : choiceType} (I : set I0) + (F : I0 -> set_system T) : + mutual_independence P I F <-> + (forall J : {fset I0}%fset, [set` J] `<=` I -> + mutual_independence P [set` J] F). +Proof. +split=> [indeF J JI|indeF]. + split=> [i /JI Ii|K KJ E EF]. + by apply indeF. + by apply indeF => // i /KJ /JI. +split=> [i Ii|J JI E EF]. + have : [set` [fset i]%fset] `<=` I. + by move=> j; rewrite /= inE => /eqP ->. + by move/indeF => [+ _]; apply; rewrite /= inE. +by have [_] := indeF _ JI; exact. +Qed. + +(**md see Achim Klenke's Probability Thery, Ch.2, sec.2.1, thm.2.13(iii) *) +Theorem mutual_independence_finite_g_sigma {I0 : choiceType} (I : set I0) + (F : I0 -> set_system T) : + (forall i, i \in I -> setI_closed (F i `|` [set set0])) -> + mutual_independence P I F <-> mutual_independence P I (fun i => <>). +Proof. +split=> indeF; last first. + split=> [i Ii|J JI E EF]. + case: indeF => /(_ _ Ii) + _. + by apply: subset_trans; exact: sub_gen_smallest. + apply indeF => // i iJ; rewrite inE. + by apply: sub_gen_smallest; exact/set_mem/EF. +split=> [i Ii|K KI E EF]. + case: indeF => + _ => /(_ _ Ii). + by apply: smallest_sub; exact: sigma_algebra_measurable. +suff: forall J J' : {fset I0}%fset, (J `<=` J')%fset -> [set` J'] `<=` I -> + forall E, (forall i, i \in J -> E i \in <>) -> + (forall i, i \in [set` J'] `\` [set` J] -> E i \in F i) -> + P (\big[setI/setT]_(j <- J') E j) = \prod_(j <- J') P (E j). + move=> /(_ K K (@fsubset_refl _ _) KI E); apply. + - by move=> i iK; exact: EF. + - by move=> i; rewrite setDv inE. +move=> {E EF K KI}. +apply: finSet_rect => K ih J' KJ' J'I E EsF EF. +have [K0|/fset0Pn[j jK]] := eqVneq K fset0. + apply indeF => // i iJ'. + by apply: EF; rewrite !inE; split => //=; rewrite K0 inE. +pose J := (K `\ j)%fset. +have jI : j \in I by apply/mem_set/J'I => /=; move/fsubsetP : KJ'; exact. +have JK : (J `<` K)%fset by rewrite fproperD1. +have JjJ' : (j |` J `<=` J')%fset by apply: fsubset_trans KJ'; rewrite fsetD1K. +have JJ' : (J `<=` J')%fset by apply: fsubset_trans JjJ'; exact: fsubsetU1. +have J'mE i : i \in J' -> d.-measurable (E i). + move=> iJ'. + case: indeF => + _ => /(_ i (J'I _ iJ')) Fim. + suff: <> (E i). + by apply: smallest_sub => //; exact: sigma_algebra_measurable. + apply/set_mem. + have [iK|iK] := boolP (i \in K); first by rewrite EsF. + have /set_mem : E i \in F i. + by rewrite EF// !inE/=; split => //; exact/negP. + by move/sub_sigma_algebra => /(_ setT)/mem_set. +have mmu : measurable (\big[setI/[set: T]]_(j0 <- (J' `\ j)%fset) (E j0)). + rewrite big_seq; apply: bigsetI_measurable => i /[!inE] /andP[_ iJ']. + exact: J'mE. +pose mu0 A := P (A `&` \big[setI/[set: T]]_(j0 <- (J' `\ j)%fset) (E j0)). +pose mu := [the {finite_measure set _ -> \bar _} of mrestr P mmu]. +pose nu0 A := P A * \prod_(j0 <- (J' `\ j)%fset) P (E j0). +have nuk : (0 <= fine (\prod_(j0 <- (J' `\ j)%fset) P (E j0)))%R. + by rewrite fine_ge0// prode_ge0. +pose nu := [the measure _ _ of mscale (NngNum nuk) P]. +have nuEj A : nu A = P A * \prod_(j0 <- (J' `\ j)%fset) P (E j0). + rewrite /nu/= /mscale muleC/= fineK// big_seq. + rewrite prode_fin_num// => i /[!inE]/= /andP[ij iJ']. + by rewrite fin_num_measure//; exact: J'mE. +have JJ'j : (J `<=` J' `\ j)%fset by exact: fsetSD. +have J'jI : [set` (J' `\ j)%fset] `<=` I. + by apply: subset_trans J'I; apply/fsubsetP; exact: fsubsetDl. +have jJ' : j \in J' by move/fsubsetP : JjJ'; apply; rewrite !inE eqxx. +have Fjmunu A : (F j `|` [set set0; setT]) A -> mu A = nu A. + move=> [FjA|[->|->]]. + - rewrite nuEj. + pose E' i := if i == j then A else E i. + transitivity (P (\big[setI/[set: T]]_(j <- J') E' j)). + rewrite [in RHS](big_fsetD1 j)//= {1}/E' eqxx//; congr (P (_ `&` _)). + rewrite !big_seq; apply: eq_bigr => i /[!inE] /andP[ij _]. + by rewrite /E' (negbTE ij). + transitivity (\prod_(j <- J') P (E' j)); last first. + rewrite [in LHS](big_fsetD1 j)//= {1}/E' eqxx//; congr (P _ * _). + rewrite !big_seq; apply: eq_bigr => i /[!inE] /andP[ij _]. + by rewrite /E' (negbTE ij). + apply: (ih _ JK _ JJ' J'I). + + move=> i iJ. + rewrite /E'; case: ifPn => [/eqP ->|ij]. + by rewrite inE; exact: sub_sigma_algebra. + rewrite EsF//. + by move/fproper_sub : JK => /fsubsetP; apply. + + move=> i. + rewrite ![in X in X -> _]inE /= ![in X in X -> _]inE => -[] iJ' /negP. + rewrite negb_and negbK => /predU1P[ij|iK]. + by rewrite /E' ij eqxx inE. + rewrite /E' ifF//; last first. + apply/negP => /eqP ij. + by rewrite ij jK in iK. + by rewrite EF// !inE/=; split => //; exact/negP. + - by rewrite !measure0. + - rewrite /mu /= /mrestr /= nuEj setTI probability_setT mul1e. + apply: (ih _ JK _ JJ'j J'jI). + + move=> i iJ. + rewrite EsF//. + by move/fproper_sub : JK => /fsubsetP; apply. + + move=> i. + rewrite ![in X in X -> _]inE /= ![in X in X -> _]inE => -[]. + move=> /andP[-> iJ'] iK. + by rewrite EF// !inE. +have sFjmunu A : <> A -> mu A = nu A. + move=> sFjA. + apply: (@g_sigma_algebra_finite_measure_unique _ _ _ (F j `|` [set set0])). + - move=> B /= [|->//]. + move: B. + case: indeF => + _. + by apply; exact/set_mem. + - exact: H. + - rewrite /mu/= /mrestr/= nuEj setTI probability_setT mul1e. + apply: (ih _ JK _ JJ'j J'jI). + + move=> i iJ. + rewrite EsF//. + by move/fproper_sub : JK => /fsubsetP; apply. + + move=> i. + rewrite ![in X in X -> _]inE /= ![in X in X -> _]inE => -[]. + move=> /andP[ij iJ']. + rewrite ij/= => iK. + by rewrite EF// !inE. + - move=> B FjB; apply: Fjmunu. + case: FjB => [|->//]; first by left. + by right; left. + - by move: sFjA; exact: sub_smallest2r. +rewrite [in LHS](big_fsetD1 j)//= [in RHS](big_fsetD1 j)//=. +have /sFjmunu : <> (E j) by apply/set_mem; rewrite EsF. +by rewrite /mu/= /mrestr/= nuEj. +Qed. + +(* pick an i from I_ k s.t. E k \in F (f k) *) +Local Definition f (K0 : choiceType) (K : {fset K0}) + (I0 : pointedType) (F : I0 -> set_system T) E I_ + (EF : forall k, k \in K -> E k \in \bigcup_(i in I_ k) F i) k := + if pselect (k \in K) is left kK then + sval (cid2 (set_mem (EF _ kK))) + else + point. + +Local Lemma f_prop (K0 : choiceType) (K : {fset K0}) + (I0 : pointedType) (F : I0 -> set_system T) E I_ + (EF : forall k, k \in K -> E k \in \bigcup_(i in I_ k) F i) k : + k \in K -> E k \in F (f EF k). +Proof. +move=> kK; rewrite /f; case: pselect => [kK_/=|//]. +by case: cid2 => // i/= ? /mem_set. +Qed. + +Local Lemma f_inj (K0 : choiceType) (K K' : {fset K0}) + (K'K : [set` K'] `<=` [set` K]) (I0 : pointedType) (F : I0 -> set_system T) + E I_ (EF : forall k, k \in K' -> E k \in \bigcup_(i in I_ k) F i) + (KI : trivIset [set` K] I_) k1 k2 : + k1 \in K' -> k2 \in K'-> k1 != k2 -> + ([fset f EF k1] `&` [fset f EF k2] = fset0)%fset. +Proof. +move=> k1K' k2K' k1k2; apply/eqP; rewrite -fsubset0. +apply/fsubsetP => i /[!inE] /andP[]. +rewrite /f; case: pselect => // k1K'_. +case: cid2 => // i' i'k1 Fi' /eqP ->{i}. +case: pselect => // k2K'_. +case: cid2 => // j ik2 FjEk2 /eqP/= i'j. +rewrite -{j}i'j in ik2 FjEk2 *. +move/trivIsetP : KI => /(_ _ _ (K'K _ k1K') (K'K _ k2K') k1k2). +by move/seteqP => [+ _] => /(_ i')/=; rewrite -falseE; exact. +Qed. + +Local Definition g (K0 : pointedType) (K' : {fset K0}) + (I0 : Type) (I_ : K0 -> set I0) (i : I0) : K0 := + if pselect (exists2 k, k \in K' & i \in I_ k) is left e then + sval (cid2 e) + else + point. + +Local Lemma gf (K0 I0 : pointedType) (F : I0 -> set_system T) + (K K' : {fset K0}) (K'K : [set` K'] `<=` [set` K]) + E I_ (EF : forall k, k \in K' -> E k \in \bigcup_(i in I_ k) F i) + (KI : trivIset [set` K] (fun i => I_ i)) i : i \in K' -> g K I_ (f EF i) = i. +Proof. +move=> iK'; rewrite /f; case: pselect => // iK'_. +case: cid2 => // j jIi FjEi. +rewrite /g; case: pselect => // k'; last first. + exfalso; apply: k'. + by exists i => //; [exact: K'K|exact/mem_set]. +case: cid2 => //= k'' k''K jIk'. +apply/eqP/negP => /negP k'i. +move/trivIsetP : KI => /(_ k'' i) /= /(_ k''K (K'K _ iK') k'i)/= /eqP. +apply/negP/set0P; exists j; split => //. +exact/set_mem. +Qed. + +(**md see Achim Klenke's Probability Thery, Ch.2, sec.2.1, thm.2.13(iv) *) +Lemma mutual_independence_bigcup (K0 I0 : pointedType) (K : {fset K0}) + (I_ : K0 -> set I0) (I : set I0) (F : I0 -> set_system T) : + trivIset [set` K] (fun i => I_ i) -> + (forall k, k \in K -> I_ k `<=` I) -> + mutual_independence P I F -> + mutual_independence P [set` K] (fun k => \bigcup_(i in I_ k) F i). +Proof. +move=> KI I_I PIF. +split=> [i Ki A [j ij FjA]|K' K'K E EF]. + by case: PIF => + _ => /(_ j); apply => //; exact: (I_I _ Ki). +case: PIF => Fm PIF. +pose f' := f EF. +pose g' := g K I_. +pose J' := (\bigcup_(k <- K') [fset f' k])%fset. +pose E' := E \o g'. +suff: P (\big[setI/[set: T]]_(j <- J') E' j) = \prod_(j <- J') P (E' j). + move=> suf. + transitivity (P (\big[setI/[set: T]]_(j <- J') E' j)). + congr (P _). + apply/seteqP; split=> [t|]. + rewrite -!bigcap_fset => L j => /bigfcupP[k] /[!andbT] kK'. + rewrite !inE => /eqP ->{j}. + apply: L => //=. + by rewrite /g' /f' gf. + move=> t. + rewrite -!bigcap_fset => L j/= jK'. + have /= := L (f' j). + rewrite /E' /g' /f'/= gf//. + by apply; apply/bigfcupP; exists j;[rewrite jK'|rewrite inE]. + rewrite suf partition_disjoint_bigfcup//=. + rewrite [LHS]big_seq [RHS]big_seq; apply: eq_big => // k kK'. + by rewrite big_seq_fset1 /E' /g' /f' /= gf. + move=> k1 k2 k1K' k2K' k1k2 /=. + by rewrite -fsetI_eq0 -fsubset0 (f_inj K'K). +apply: PIF. +- move=> i/= /bigfcupP[k] /[!andbT] kK' /[!inE] /eqP ->. + apply: (I_I k) => /=; first exact: K'K. + by rewrite /f' /f; case: pselect => // kK'_; case: cid2. +- move=> i /bigfcupP[k'] /[!andbT] k'K /[!inE] /eqP ->{i}. + by rewrite /E' /g' /f'/= gf//; exact/set_mem/f_prop. +Qed. + +End mutual_independence_properties. + +Section g_sigma_algebra_mapping_lemmas. +Context d {T : measurableType d} {R : realType}. + +Lemma g_sigma_algebra_mapping_comp (X : {mfun T >-> R}) (f : R -> R) : + measurable_fun setT f -> + g_sigma_algebra_mapping (f \o X)%R `<=` g_sigma_algebra_mapping X. +Proof. exact: preimage_class_comp. Qed. + +Lemma g_sigma_algebra_mapping_funrpos (X : {mfun T >-> R}) : + g_sigma_algebra_mapping X^\+%R `<=` d.-measurable. +Proof. +by move=> A/= -[B mB] <-; have := measurable_funrpos (measurable_funP X); exact. +Qed. + +Lemma g_sigma_algebra_mapping_funrneg (X : {mfun T >-> R}) : + g_sigma_algebra_mapping X^\-%R `<=` d.-measurable. +Proof. +by move=> A/= -[B mB] <-; have := measurable_funrneg (measurable_funP X); exact. +Qed. + +End g_sigma_algebra_mapping_lemmas. +Arguments g_sigma_algebra_mapping_comp {d T R X} f. + +Section independent_RVs. +Context {R : realType} d (T : measurableType d). +Context {I0 : choiceType}. +Context {d' : I0 -> _} (T' : forall i : I0, measurableType (d' i)). +Variable P : probability T R. + +Definition independent_RVs (I : set I0) + (X : forall i : I0, {mfun T >-> T' i}) : Prop := + mutual_independence P I (fun i => g_sigma_algebra_mapping (X i)). + +End independent_RVs. + +Section independent_RVs2. +Context {R : realType} d d' (T : measurableType d) (T' : measurableType d'). +Variable P : probability T R. + +Definition independent_RVs2 (X Y : {mfun T >-> T'}) := + independent_RVs P [set: bool] (fun b => if b then Y else X). + +End independent_RVs2. + +Section independent_generators. +Context {R : realType} d (T : measurableType d). +Context {I0 : choiceType}. +Context {d' : I0 -> _} (T' : forall i : I0, measurableType (d' i)). +Variable P : probability T R. + +(**md see Achim Klenke's Probability Thery, Ch.2, sec.2.1, thm.2.16 *) +Theorem independent_generators (I : set I0) (F : forall i : I0, set_system (T' i)) + (X : forall i, {RV P >-> T' i}) : + (forall i, i \in I -> setI_closed (F i)) -> + (forall i, i \in I -> F i `<=` @measurable _ (T' i)) -> + (forall i, i \in I -> @measurable _ (T' i) = <>) -> + mutual_independence P I (fun i => preimage_class setT (X i) (F i)) -> + independent_RVs P I X. +Proof. +move=> IF FA AsF indeX1. +have closed_preimage i : I i -> setI_closed (preimage_class setT (X i) (F i)). + move=> Ii A B [A' FiA']; rewrite setTI => <-{A}. + move=> [B' FiB']; rewrite setTI => <-{B}. + rewrite /preimage_class/=; exists (A' `&` B'). + apply: IF => //. + - exact/mem_set. + - by rewrite setTI. +have gen_preimage i : I i -> + <> = g_sigma_algebra_mapping (X i). + move=> Ii. + rewrite /g_sigma_algebra_mapping AsF; last exact/mem_set. + by rewrite -sigma_algebra_preimage_classE. +rewrite /independent_RVs. +suff: mutual_independence P I (fun i => <>). + exact: eq_mutual_independence. +apply: (mutual_independence_finite_g_sigma _ _).1. +- by move=> i Ii; apply: setI_closed_set0; exact/closed_preimage/set_mem. +- split => [i Ii A [A' mA'] <-{A}|J JI E EF]. + by apply/measurable_funP => //; apply: FA => //; exact/mem_set. + by apply indeX1. +Qed. + +End independent_generators. + +Section independent_RVs_lemmas. +Context {R : realType} d d' (T : measurableType d) (T' : measurableType d'). +Variable P : probability T R. +Local Open Scope ring_scope. + +Lemma independent_RVs2_comp (X Y : {RV P >-> R}) (f g : {mfun R >-> R}) : + independent_RVs2 P X Y -> independent_RVs2 P (f \o X) (g \o Y). +Proof. +move=> indeXY; split => /=. +- move=> [] _ /= A. + + by rewrite /g_sigma_algebra_mapping/= /preimage_class/= => -[B mB <-]; + exact/measurableT_comp. + + by rewrite /g_sigma_algebra_mapping/= /preimage_class/= => -[B mB <-]; + exact/measurableT_comp. +- move=> J _ E JE. + apply indeXY => //= i iJ; have := JE _ iJ. + by move: i {iJ} =>[|]//=; rewrite !inE => Eg; + exact: g_sigma_algebra_mapping_comp Eg. +Qed. + +Lemma independent_RVs2_funrposneg (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> independent_RVs2 P X^\+ Y^\-. +Proof. +move=> indeXY; split=> [[|]/= _|J J2 E JE]. +- exact: g_sigma_algebra_mapping_funrneg. +- exact: g_sigma_algebra_mapping_funrpos. +- apply indeXY => //= i iJ; have := JE _ iJ. + move/J2 : iJ; move: i => [|]// _; rewrite !inE. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr (- x) 0)%R). + exact: measurable_funrneg. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr x 0)%R) => //. + exact: measurable_funrpos. +Qed. + +Lemma independent_RVs2_funrnegpos (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> independent_RVs2 P X^\- Y^\+. +Proof. +move=> indeXY; split=> [/= [|]// _ |J J2 E JE]. +- exact: g_sigma_algebra_mapping_funrpos. +- exact: g_sigma_algebra_mapping_funrneg. +- apply indeXY => //= i iJ; have := JE _ iJ. + move/J2 : iJ; move: i => [|]// _; rewrite !inE. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr x 0)%R). + exact: measurable_funrpos. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr (- x) 0)%R). + exact: measurable_funrneg. +Qed. + +Lemma independent_RVs2_funrnegneg (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> independent_RVs2 P X^\- Y^\-. +Proof. +move=> indeXY; split=> [/= [|]// _ |J J2 E JE]. +- exact: g_sigma_algebra_mapping_funrneg. +- exact: g_sigma_algebra_mapping_funrneg. +- apply indeXY => //= i iJ; have := JE _ iJ. + move/J2 : iJ; move: i => [|]// _; rewrite !inE. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr (- x) 0)%R). + exact: measurable_funrneg. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr (- x) 0)%R). + exact: measurable_funrneg. +Qed. + +Lemma independent_RVs2_funrpospos (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> independent_RVs2 P X^\+ Y^\+. +Proof. +move=> indeXY; split=> [/= [|]//= _ |J J2 E JE]. +- exact: g_sigma_algebra_mapping_funrpos. +- exact: g_sigma_algebra_mapping_funrpos. +- apply indeXY => //= i iJ; have := JE _ iJ. + move/J2 : iJ; move: i => [|]// _; rewrite !inE. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr x 0)%R). + exact: measurable_funrpos. + + apply: (g_sigma_algebra_mapping_comp (fun x => maxr x 0)%R). + exact: measurable_funrpos. +Qed. + +End independent_RVs_lemmas. + +Definition preimage_classes I (d : I -> measure_display) + (Tn : forall k, semiRingOfSetsType (d k)) (T : Type) (fn : forall k, T -> Tn k) := + <>. +Arguments preimage_classes {I} d Tn {T} fn. + +Lemma measurable_prod d [T : measurableType d] [R : realType] [D : set T] [I : eqType] + (s : seq I) [h : I -> T -> R] : + (forall i, i \in s -> measurable_fun D (h i)) -> + measurable_fun D (fun x => (\prod_(i <- s) h i x)%R). +Proof. +elim: s => [mh|x y ih mh]. + under eq_fun do rewrite big_nil//=. + exact: measurable_cst. +under eq_fun do rewrite big_cons//=. +apply: measurable_funM => //. + apply: mh. + by rewrite mem_head. +apply: ih => n ny. +apply: mh. +by rewrite inE orbC ny. +Qed. + +Section pairRV. +Context d d' {T : measurableType d} {T' : measurableType d'} {R : realType} + (P : probability T R). + +Definition pairRV (X Y : {RV P >-> T'}) : T * T -> T' * T' := + (fun x => (X x.1, Y x.2)). + +Lemma pairM (X Y : {RV P >-> T'}) : measurable_fun setT (pairRV X Y). +Proof. +rewrite /pairRV. +apply/prod_measurable_funP; split => //=. + rewrite (_ : (fst \o (fun x : T * T => (X x.1, Y x.2))) = (fun x => X x.1))//. + by apply/measurableT_comp => //=. +rewrite (_ : (snd \o (fun x : T * T => (X x.1, Y x.2))) = (fun x => Y x.2))//. +by apply/measurableT_comp => //=. +Qed. + +HB.instance Definition _ (X Y : {RV P >-> T'}) := + @isMeasurableFun.Build _ _ _ _ (pairRV X Y) (pairM X Y). + +End pairRV. + +Section product_expectation. +Context {R : realType} d (T : measurableType d). +Variable P : probability T R. +Local Open Scope ereal_scope. + +Let mu := @lebesgue_measure R. + +Let mprod_m (X Y : {RV P >-> R}) (A1 : set R) (A2 : set R) : + measurable A1 -> measurable A2 -> + (distribution P X \x distribution P Y) (A1 `*` A2) = + ((distribution P X) A1 * (distribution P Y) A2)%E. +Proof. +move=> mA1 mA2. +etransitivity. + by apply: product_measure1E. +rewrite /=. +done. +Qed. + +Lemma tmp0 (X Y : {RV P >-> R}) (B1 B2 : set R) : + measurable B1 -> measurable B2 -> + independent_RVs2 P X Y -> + P (X @^-1` B1 `&` Y @^-1` B2) = P (X @^-1` B1) * P (Y @^-1` B2). +Proof. +move=> mB1 mB2. +rewrite /independent_RVs2 /independent_RVs /mutual_independence /= => -[_]. +move/(_ [fset false; true]%fset (@subsetT _ _) + (fun b => if b then Y @^-1` B2 else X @^-1` B1)). +rewrite !big_fsetU1 ?inE//= !big_seq_fset1/=. +apply => -[|] /= _; rewrite !inE; rewrite /g_sigma_algebra_mapping. +by exists B2 => //; rewrite setTI. +by exists B1 => //; rewrite setTI. +Qed. + +Lemma tmp1 (X Y : {RV P >-> R}) (B1 B2 : set R) : + measurable B1 -> measurable B2 -> + independent_RVs2 P X Y -> + P (X @^-1` B1 `&` Y @^-1` B2) = (P \x P) (pairRV X Y @^-1` (B1 `*` B2)). +Proof. +move=> mB1 mB2 XY. +rewrite (_ : ((fun x : T * T => (X x.1, Y x.2)) @^-1` (B1 `*` B2)) = + (X @^-1` B1) `*` (Y @^-1` B2)); last first. + by apply/seteqP; split => [[x1 x2]|[x1 x2]]//. +rewrite product_measure1E; last 2 first. + rewrite -[_ @^-1` _]setTI. + by apply: (measurable_funP X). + rewrite -[_ @^-1` _]setTI. + by apply: (measurable_funP Y). +by rewrite tmp0//. +Qed. + +Let phi (x : R * R) := (x.1 * x.2)%R. +Let mphi : measurable_fun setT phi. +Proof. +rewrite /= /phi. +by apply: measurable_funM. +Qed. + +Lemma PP : (P \x P) setT = 1. +Proof. +rewrite /product_measure1 /=. +rewrite /xsection/=. +under eq_integral. + move=> t _. + rewrite (_ : [set y | (t, y) \in [set: T * T]] = setT); last first. + apply/seteqP; split => [x|x]// _ /=. + by rewrite in_setT. + rewrite probability_setT. + over. +rewrite integral_cst // mul1e. +apply: probability_setT. +Qed. + +HB.instance Definition _ := @Measure_isProbability.Build _ _ R (P \x P) PP. + +Lemma integrable_expectationM (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> + P.-integrable setT (EFin \o X) -> P.-integrable setT (EFin \o Y) -> + 'E_(P \x P) [(fun x => `|X x.1 * Y x.2|)%R] < +oo +(* `|'E_(P) [(fun x => X x * Y x)%R]| < +oo *) . +Proof. +move=> indeXY iX iY. +(*apply: (@le_lt_trans _ _ 'E_(P \x P)[(fun x => `|(X x.1 * Y x.2)|%R)] + (* 'E_(P)[(fun x => `|(X x * Y x)|%R)] *) ). + rewrite unlock/=. + rewrite (le_trans (le_abse_integral _ _ _))//. + apply/measurable_EFinP/measurable_funM. + by apply/measurableT_comp => //. + by apply/measurableT_comp => //.*) +rewrite unlock. +rewrite [ltLHS](_ : _ = + \int[distribution (P \x P) (pairRV X Y)%R]_x `|x.1 * x.2|%:E); last first. + rewrite integral_distribution//=; last first. + apply/measurable_EFinP => //=. + by apply/measurableT_comp => //=. +(* admit. (* NG *)*) +rewrite [ltLHS](_ : _ = + \int[distribution P X \x distribution P Y]_x `|x.1 * x.2|%:E); last first. + apply: eq_measure_integral => // A mA _. + apply/esym. + apply: product_measure_unique => //= A1 A2 mA1 mA2. + rewrite /pushforward/=. + rewrite -tmp1//. + by rewrite tmp0//. +rewrite fubini_tonelli1//=; last first. + by apply/measurable_EFinP => /=; apply/measurableT_comp => //=. +rewrite /fubini_F/= -/mu. +rewrite [ltLHS](_ : _ = \int[distribution P X]_x `|x|%:E * + \int[distribution P Y]_y `|y|%:E); last first. + rewrite -ge0_integralZr//=; last 2 first. + exact/measurable_EFinP. + by apply: integral_ge0 => //. + apply: eq_integral => x _. + rewrite -ge0_integralZl//=. + by under eq_integral do rewrite normrM. + exact/measurable_EFinP. +rewrite integral_distribution//=; last exact/measurable_EFinP. +rewrite integral_distribution//=; last exact/measurable_EFinP. +rewrite lte_mul_pinfty//. + by apply: integral_ge0 => //. + apply: integral_fune_fin_num => //=. + by move/integrable_abse : iX => //. +apply: integral_fune_lt_pinfty => //. +by move/integrable_abse : iY => //. +Qed. + +End product_expectation. + +Section product_expectation. +Context {R : realType} d (T : measurableType d). +Variable P : probability T R. +Local Open Scope ereal_scope. + +Import HBNNSimple. + +Let expectationM_nnsfun (f g : {nnsfun T >-> R}) : + (forall y y', y \in range f -> y' \in range g -> + P (f @^-1` [set y] `&` g @^-1` [set y']) = + P (f @^-1` [set y]) * P (g @^-1` [set y'])) -> + 'E_P [f \* g] = 'E_P [f] * 'E_P [g]. +Proof. +move=> fg; transitivity + ('E_P [(fun x => (\sum_(y \in range f) y * \1_(f @^-1` [set y]) x)%R) + \* (fun x => (\sum_(y \in range g) y * \1_(g @^-1` [set y]) x)%R)]). + by congr ('E_P [_]); apply/funext => t/=; rewrite (fimfunE f) (fimfunE g). +transitivity ('E_P [(fun x => (\sum_(y \in range f) \sum_(y' \in range g) y * y' + * \1_(f @^-1` [set y] `&` g @^-1` [set y']) x)%R)]). + congr ('E_P [_]); apply/funext => t/=. + rewrite mulrC; rewrite fsbig_distrr//=. (* TODO: lemma fsbig_distrl *) + apply: eq_fsbigr => y yf; rewrite mulrC; rewrite fsbig_distrr//=. + by apply: eq_fsbigr => y' y'g; rewrite indicI mulrCA !mulrA (mulrC y'). +rewrite unlock. +under eq_integral do rewrite -fsumEFin//. +transitivity (\sum_(y \in range f) (\sum_(y' \in range g) + ((y * y')%:E * \int[P]_w (\1_(f @^-1` [set y] `&` g @^-1` [set y']) w)%:E))). + rewrite ge0_integral_fsum//=; last 2 first. + - move=> r; under eq_fun do rewrite -fsumEFin//. + apply: emeasurable_fsum => // s. + apply/measurable_EFinP/measurable_funM => //. + exact/measurable_indic/measurableI. + - move=> r t _; rewrite lee_fin sumr_ge0 // => s _; rewrite -lee_fin. + by rewrite indicI/= indicE -mulrACA EFinM mule_ge0// nnfun_muleindic_ge0. + apply: eq_fsbigr => y yf. + under eq_integral do rewrite -fsumEFin//. + rewrite ge0_integral_fsum//=; last 2 first. + - move=> r; apply/measurable_EFinP; apply: measurable_funM => //. + exact/measurable_indic/measurableI. + - move=> r t _. + by rewrite indicI/= indicE -mulrACA EFinM mule_ge0// nnfun_muleindic_ge0. + apply: eq_fsbigr => y' y'g. + under eq_integral do rewrite EFinM. + by rewrite integralZl//; exact/integrable_indic/measurableI. +transitivity (\sum_(y \in range f) (\sum_(y' \in range g) + ((y * y')%:E * (\int[P]_w (\1_(f @^-1` [set y]) w)%:E * + \int[P]_w (\1_(g @^-1` [set y']) w)%:E)))). + apply: eq_fsbigr => y fy; apply: eq_fsbigr => y' gy'; congr *%E. + transitivity ('E_P[\1_(f @^-1` [set y] `&` g @^-1` [set y'])]). + by rewrite unlock. + transitivity ('E_P[\1_(f @^-1` [set y])] * 'E_P[\1_(g @^-1` [set y'])]); + last by rewrite unlock. + rewrite expectation_indic//; last exact: measurableI. + by rewrite !expectation_indic// fg. +transitivity ( + (\sum_(y \in range f) (y%:E * (\int[P]_w (\1_(f @^-1` [set y]) w)%:E))) * + (\sum_(y' \in range g) (y'%:E * \int[P]_w (\1_(g @^-1` [set y']) w)%:E))). + transitivity (\sum_(y \in range f) (\sum_(y' \in range g) + (y'%:E * \int[P]_w (\1_(g @^-1` [set y']) w)%:E)%E)%R * + (y%:E * \int[P]_w (\1_(f @^-1` [set y]) w)%:E)%E%R); last first. + rewrite !fsbig_finite//= ge0_sume_distrl//; last first. + move=> r _; rewrite -integralZl//; last exact: integrable_indic. + by apply: integral_ge0 => t _; rewrite nnfun_muleindic_ge0. + by apply: eq_bigr => r _; rewrite muleC. + apply: eq_fsbigr => y fy. + rewrite !fsbig_finite//= ge0_sume_distrl//; last first. + move=> r _; rewrite -integralZl//; last exact: integrable_indic. + by apply: integral_ge0 => t _; rewrite nnfun_muleindic_ge0. + apply: eq_bigr => r _; rewrite (mulrC y) EFinM. + by rewrite [X in _ * X]muleC muleACA. +suff: forall h : {nnsfun T >-> R}, + (\sum_(y \in range h) (y%:E * \int[P]_w (\1_(h @^-1` [set y]) w)%:E)%E)%R + = \int[P]_w (h w)%:E. + by move=> suf; congr *%E; rewrite suf. +move=> h. +apply/esym. +under eq_integral do rewrite (fimfunE h). +under eq_integral do rewrite -fsumEFin//. +rewrite ge0_integral_fsum//; last 2 first. +- by move=> r; exact/measurable_EFinP/measurable_funM. +- by move=> r t _; rewrite lee_fin -lee_fin nnfun_muleindic_ge0. +by apply: eq_fsbigr => y fy; rewrite -integralZl//; exact/integrable_indic. +Qed. + +Lemma expectationM_ge0 (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> + 'E_P[X] *? 'E_P[Y] -> + (forall t, 0 <= X t)%R -> (forall t, 0 <= Y t)%R -> + 'E_P [X * Y] = 'E_P [X] * 'E_P [Y]. +Proof. +move=> indeXY defXY X0 Y0. +have mX : measurable_fun setT (EFin \o X) by exact/measurable_EFinP. +have mY : measurable_fun setT (EFin \o Y) by exact/measurable_EFinP. +pose X_ := nnsfun_approx measurableT mX. +pose Y_ := nnsfun_approx measurableT mY. +have EXY : 'E_P[X_ n \* Y_ n] @[n --> \oo] --> 'E_P [X * Y]. + rewrite unlock; have -> : \int[P]_w ((X * Y) w)%:E = + \int[P]_x limn (fun n => (EFin \o (X_ n \* Y_ n)%R) x). + apply: eq_integral => t _; apply/esym/cvg_lim => //=. + rewrite fctE EFinM; under eq_fun do rewrite EFinM. + by apply: cvgeM; [rewrite mule_def_fin//| + apply: cvg_nnsfun_approx => //= x _; rewrite lee_fin..]. + apply: cvg_monotone_convergence => //. + - by move=> n; apply/measurable_EFinP; exact: measurable_funM. + - by move=> n t _; rewrite lee_fin. + - move=> t _ m n mn. + by rewrite lee_fin/= ler_pM//; exact/lefP/nd_nnsfun_approx. +have EX : 'E_P[X_ n] @[n --> \oo] --> 'E_P [X]. + rewrite unlock. + have -> : \int[P]_w (X w)%:E = \int[P]_x limn (fun n => (EFin \o X_ n) x). + by apply: eq_integral => t _; apply/esym/cvg_lim => //=; + apply: cvg_nnsfun_approx => // x _; rewrite lee_fin. + apply: cvg_monotone_convergence => //. + - by move=> n; exact/measurable_EFinP. + - by move=> n t _; rewrite lee_fin. + - by move=> t _ m n mn; rewrite lee_fin/=; exact/lefP/nd_nnsfun_approx. +have EY : 'E_P[Y_ n] @[n --> \oo] --> 'E_P [Y]. + rewrite unlock. + have -> : \int[P]_w (Y w)%:E = \int[P]_x limn (fun n => (EFin \o Y_ n) x). + by apply: eq_integral => t _; apply/esym/cvg_lim => //=; + apply: cvg_nnsfun_approx => // x _; rewrite lee_fin. + apply: cvg_monotone_convergence => //. + - by move=> n; exact/measurable_EFinP. + - by move=> n t _; rewrite lee_fin. + - by move=> t _ m n mn; rewrite lee_fin/=; exact/lefP/nd_nnsfun_approx. +have {EX EY}EXY' : 'E_P[X_ n] * 'E_P[Y_ n] @[n --> \oo] --> 'E_P[X] * 'E_P[Y]. + apply: cvgeM => //. +suff : forall n, 'E_P[X_ n \* Y_ n] = 'E_P[X_ n] * 'E_P[Y_ n]. + by move=> suf; apply: (cvg_unique _ EXY) => //=; under eq_fun do rewrite suf. +move=> n; apply: expectationM_nnsfun => x y xX_ yY_. +suff : P (\big[setI/setT]_(j <- [fset false; true]%fset) + [eta fun=> set0 with 0%N |-> X_ n @^-1` [set x], + 1%N |-> Y_ n @^-1` [set y]] j) = + \prod_(j <- [fset false; true]%fset) + P ([eta fun=> set0 with 0%N |-> X_ n @^-1` [set x], + 1%N |-> Y_ n @^-1` [set y]] j). + by rewrite !big_fsetU1/= ?inE//= !big_seq_fset1/=. +move: indeXY => [/= _]; apply => // i. +pose AX := dyadic_approx setT (EFin \o X). +pose AY := dyadic_approx setT (EFin \o Y). +pose BX := integer_approx setT (EFin \o X). +pose BY := integer_approx setT (EFin \o Y). +have mA (Z : {RV P >-> R}) m k : (k < m * 2 ^ m)%N -> + g_sigma_algebra_mapping Z (dyadic_approx setT (EFin \o Z) m k). + move=> mk; rewrite /g_sigma_algebra_mapping /dyadic_approx mk setTI. + rewrite /preimage_class/=; exists [set` dyadic_itv R m k] => //. + rewrite setTI/=; apply/seteqP; split => z/=. + by rewrite inE/= => Zz; exists (Z z). + by rewrite inE/= => -[r rmk] [<-]. +have mB (Z : {RV P >-> R}) k : + g_sigma_algebra_mapping Z (integer_approx setT (EFin \o Z) k). + rewrite /g_sigma_algebra_mapping /integer_approx setTI /preimage_class/=. + by exists `[k%:R, +oo[%classic => //; rewrite setTI preimage_itvcy. +have m1A (Z : {RV P >-> R}) : forall k, (k < n * 2 ^ n)%N -> + measurable_fun setT + (\1_(dyadic_approx setT (EFin \o Z) n k) : g_sigma_algebra_mappingType Z -> R). + move=> k kn. + exact/(@measurable_indicP _ (g_sigma_algebra_mappingType Z))/mA. +rewrite !inE => /orP[|]/eqP->{i} //=. + have : @measurable_fun _ _ (g_sigma_algebra_mappingType X) _ setT (X_ n). + rewrite nnsfun_approxE//. + apply: measurable_funD => //=. + apply: measurable_sum => //= k'; apply: measurable_funM => //. + by apply: measurable_indic; exact: mA. + apply: measurable_funM => //. + by apply: measurable_indic; exact: mB. + rewrite /measurable_fun => /(_ measurableT _ (measurable_set1 x)). + by rewrite setTI. +have : @measurable_fun _ _ (g_sigma_algebra_mappingType Y) _ setT (Y_ n). + rewrite nnsfun_approxE//. + apply: measurable_funD => //=. + apply: measurable_sum => //= k'; apply: measurable_funM => //. + by apply: measurable_indic; exact: mA. + apply: measurable_funM => //. + by apply: measurable_indic; exact: mB. +move=> /(_ measurableT [set y] (measurable_set1 y)). +by rewrite setTI. +Qed. + +Lemma integrable_expectationM000 (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> + P.-integrable setT (EFin \o X) -> P.-integrable setT (EFin \o Y) -> + `|'E_P [X * Y]| < +oo. +Proof. +move=> indeXY iX iY. +apply: (@le_lt_trans _ _ 'E_P[(@normr _ _ \o X) * (@normr _ _ \o Y)]). + rewrite unlock/=. + rewrite (le_trans (le_abse_integral _ _ _))//. + apply/measurable_EFinP/measurable_funM. + by have /measurable_EFinP := measurable_int _ iX. + by have /measurable_EFinP := measurable_int _ iY. + apply: ge0_le_integral => //=. + - by apply/measurable_EFinP; exact/measurableT_comp. + - by move=> x _; rewrite lee_fin/= mulr_ge0/=. + - by apply/measurable_EFinP; apply/measurable_funM; exact/measurableT_comp. + - by move=> t _; rewrite lee_fin/= normrM. +rewrite expectationM_ge0//=. +- rewrite lte_mul_pinfty//. + + by rewrite expectation_ge0/=. + + rewrite expectation_fin_num//= compA//. + exact: (integrable_abse iX). + + by move/integrableP : iY => [_ iY]; rewrite unlock. +- exact: independent_RVs2_comp. +- apply: mule_def_fin; rewrite unlock integral_fune_fin_num//. + + exact: (integrable_abse iX). + + exact: (integrable_abse iY). +Qed. + +Lemma independent_integrableM (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> + P.-integrable setT (EFin \o X) -> P.-integrable setT (EFin \o Y) -> + P.-integrable setT (EFin \o (X \* Y)%R). +Proof. +move=> indeXY iX iY. +apply/integrableP; split; first exact/measurable_EFinP/measurable_funM. +have := integrable_expectationM000 indeXY iX iY. +rewrite unlock => /abse_integralP; apply => //. +exact/measurable_EFinP/measurable_funM. +Qed. + +(* TODO: rename to expectationM when deprecation is removed *) +Lemma expectation_prod (X Y : {RV P >-> R}) : + independent_RVs2 P X Y -> + P.-integrable setT (EFin \o X) -> P.-integrable setT (EFin \o Y) -> + 'E_P [X * Y] = 'E_P [X] * 'E_P [Y]. +Proof. +move=> XY iX iY. +transitivity ('E_P[(X^\+ - X^\-) * (Y^\+ - Y^\-)]). + congr ('E_P[_]). + apply/funext => /=t. + by rewrite [in LHS](funrposneg X)/= [in LHS](funrposneg Y). +have ? : P.-integrable [set: T] (EFin \o X^\-%R). + by rewrite -funerneg; exact/integrable_funeneg. +have ? : P.-integrable [set: T] (EFin \o X^\+%R). + by rewrite -funerpos; exact/integrable_funepos. +have ? : P.-integrable [set: T] (EFin \o Y^\+%R). + by rewrite -funerpos; exact/integrable_funepos. +have ? : P.-integrable [set: T] (EFin \o Y^\-%R). + by rewrite -funerneg; exact/integrable_funeneg. +have ? : P.-integrable [set: T] (EFin \o (X^\+ \* Y^\+)%R). + by apply: independent_integrableM => //=; exact: independent_RVs2_funrpospos. +have ? : P.-integrable [set: T] (EFin \o (X^\- \* Y^\+)%R). + by apply: independent_integrableM => //=; exact: independent_RVs2_funrnegpos. +have ? : P.-integrable [set: T] (EFin \o (X^\+ \* Y^\-)%R). + by apply: independent_integrableM => //=; exact: independent_RVs2_funrposneg. +have ? : P.-integrable [set: T] (EFin \o (X^\- \* Y^\-)%R). + by apply: independent_integrableM => //=; exact: independent_RVs2_funrnegneg. +transitivity ('E_P[X^\+ * Y^\+] - 'E_P[X^\- * Y^\+] + - 'E_P[X^\+ * Y^\-] + 'E_P[X^\- * Y^\-]). + rewrite mulrDr !mulrDl -expectationB//= -expectationB//=; last first. + rewrite (_ : _ \o _ = EFin \o (X^\+ \* Y^\+)%R \- + (EFin \o (X^\- \* Y^\+)%R))//. + exact: integrableB. + rewrite -expectationD//=; last first. + rewrite (_ : _ \o _ = (EFin \o (X^\+ \* Y^\+)%R) + \- (EFin \o (X^\- \* Y^\+)%R) \- (EFin \o (X^\+ \* Y^\-)%R))//. + by apply: integrableB => //; exact: integrableB. + congr ('E_P[_]); apply/funext => t/=. + by rewrite !fctE !(mulNr,mulrN,opprK,addrA)/=. +rewrite [in LHS]expectationM_ge0//=; last 2 first. + exact: independent_RVs2_funrpospos. + by rewrite mule_def_fin// expectation_fin_num. +rewrite [in LHS]expectationM_ge0//=; last 2 first. + exact: independent_RVs2_funrnegpos. + by rewrite mule_def_fin// expectation_fin_num. +rewrite [in LHS]expectationM_ge0//=; last 2 first. + exact: independent_RVs2_funrposneg. + by rewrite mule_def_fin// expectation_fin_num. +rewrite [in LHS]expectationM_ge0//=; last 2 first. + exact: independent_RVs2_funrnegneg. + by rewrite mule_def_fin// expectation_fin_num//=. +transitivity ('E_P[X^\+ - X^\-] * 'E_P[Y^\+ - Y^\-]). + rewrite -addeA -addeACA -muleBr; last 2 first. + by rewrite expectation_fin_num. + by rewrite fin_num_adde_defr// expectation_fin_num. + rewrite -oppeB; last first. + by rewrite fin_num_adde_defr// fin_numM// expectation_fin_num. + rewrite -muleBr; last 2 first. + by rewrite expectation_fin_num. + by rewrite fin_num_adde_defr// expectation_fin_num. + rewrite -muleBl; last 2 first. + by rewrite fin_numB// !expectation_fin_num//. + by rewrite fin_num_adde_defr// expectation_fin_num. + by rewrite -expectationB//= -expectationB. +by congr *%E; congr ('E_P[_]); rewrite [RHS]funrposneg. +Qed. + +Lemma prodE (s : seq nat) (X : {RV P >-> R}^nat) (t : T) : + (\prod_(i <- s) X i t)%R = ((\prod_(j <- s) X j)%R t). +Proof. +by elim/big_ind2 : _ => //= {}X x {}Y y -> ->. +Qed. + +Lemma set_cons2 (I : eqType) (x y : I) : [set` [:: x; y]] = [set x ; y]. +Proof. +apply/seteqP; split => z /=; rewrite !inE. + move=> /orP[|] /eqP ->; auto. +by move=> [|] ->; rewrite eqxx// orbT. +Qed. + +Lemma independent_RVsD1 (I : {fset nat}) i0 (X : {RV P >-> R}^nat) : + independent_RVs P [set` I] X -> independent_RVs P [set` (I `\ i0)%fset] X. +Proof. +move=> H. +split => [/= i|/= J JIi0 E EK]. + rewrite !inE => /andP[ii0 iI]. + by apply H. +apply H => //. +by move=> /= x /JIi0 /=; rewrite !inE => /andP[]. +Qed. + +End product_expectation. diff --git a/theories/lebesgue_measure.v b/theories/lebesgue_measure.v index c0abfbdd3..268d9e07e 100644 --- a/theories/lebesgue_measure.v +++ b/theories/lebesgue_measure.v @@ -1053,6 +1053,12 @@ by move=> mf mg mD; move: (mD); apply: measurable_fun_if => //; [exact: measurable_fun_ltr|exact: measurable_funS mg|exact: measurable_funS mf]. Qed. +Lemma measurable_funrpos D f : measurable_fun D f -> measurable_fun D f^\+. +Proof. by move=> mf; exact: measurable_maxr. Qed. + +Lemma measurable_funrneg D f : measurable_fun D f -> measurable_fun D f^\-. +Proof. by move=> mf; apply: measurable_maxr => //; exact: measurableT_comp. Qed. + Lemma measurable_minr D f g : measurable_fun D f -> measurable_fun D g -> measurable_fun D (f \min g). Proof. diff --git a/theories/measure.v b/theories/measure.v index b26b412db..f3fcb1177 100644 --- a/theories/measure.v +++ b/theories/measure.v @@ -70,6 +70,11 @@ From HB Require Import structures. (* G.-sigma.-measurable A == A is measurable for the sigma-algebra <> *) (* g_sigma_algebraType G == the measurableType corresponding to <> *) (* This is an HB alias. *) +(* g_sigma_algebra_mapping f == sigma-algebra generated by the mapping f *) +(* g_sigma_algebra_mappingType f == the measurableType corresponding to *) +(* g_sigma_algebra_mapping f *) +(* This is an HB alias. *) +(* f.-mapping.-measurable A == A is measurable for g_sigma_algebra_mapping f *) (* mu .-cara.-measurable == sigma-algebra of Caratheodory measurable sets *) (* ``` *) (* *) @@ -296,6 +301,9 @@ Reserved Notation "'\d_' a" (at level 8, a at level 2, format "'\d_' a"). Reserved Notation "G .-sigma" (at level 1, format "G .-sigma"). Reserved Notation "G .-sigma.-measurable" (at level 2, format "G .-sigma.-measurable"). +Reserved Notation "f .-mapping" (at level 1, format "f .-mapping"). +Reserved Notation "f .-mapping.-measurable" + (at level 2, format "f .-mapping.-measurable"). Reserved Notation "d .-ring" (at level 1, format "d .-ring"). Reserved Notation "d .-ring.-measurable" (at level 2, format "d .-ring.-measurable"). @@ -1729,6 +1737,16 @@ Definition preimage_class (aT rT : Type) (D : set aT) (f : aT -> rT) (G : set (set rT)) : set (set aT) := [set D `&` f @^-1` B | B in G]. +Lemma preimage_class_comp (aT : Type) + d (rT : measurableType d) d' (T : sigmaRingType d') + (g : rT -> T) (f : aT -> rT) (D : set aT) : + measurable_fun setT g -> + preimage_class D (g \o f) measurable `<=` preimage_class D f measurable. +Proof. +move=> mg A; rewrite /preimage_class/= => -[B GB]; exists (g @^-1` B) => //. +by rewrite -[X in measurable X]setTI; exact: mg. +Qed. + (* f is measurable on the sigma-algebra generated by itself *) Lemma preimage_class_measurable_fun d (aT : pointedType) (rT : measurableType d) (D : set aT) (f : aT -> rT) : @@ -1813,6 +1831,58 @@ Qed. End measurability. +Definition mapping_display {T T'} : (T -> T') -> measure_display. +Proof. exact. Qed. + +Definition g_sigma_algebra_mappingType d' (T : pointedType) + (T' : measurableType d') (f : T -> T') : Type := T. + +Definition g_sigma_algebra_mapping d' (T : pointedType) + (T' : measurableType d') (f : T -> T') := + preimage_class setT f (@measurable _ T'). + +Section mapping_generated_sigma_algebra. +Context {d'} (T : pointedType) (T' : measurableType d'). +Variable f : T -> T'. + +Let mapping_set0 : g_sigma_algebra_mapping f set0. +Proof. +rewrite /g_sigma_algebra_mapping /preimage_class/=. +by exists set0 => //; rewrite preimage_set0 setI0. +Qed. + +Let mapping_setC A : + g_sigma_algebra_mapping f A -> g_sigma_algebra_mapping f (~` A). +Proof. +rewrite /g_sigma_algebra_mapping /preimage_class/= => -[B mB] <-{A}. +by exists (~` B); [exact: measurableC|rewrite !setTI preimage_setC]. +Qed. + +Let mapping_bigcup (F : (set T)^nat) : + (forall i, g_sigma_algebra_mapping f (F i)) -> + g_sigma_algebra_mapping f (\bigcup_i (F i)). +Proof. +move=> mF; rewrite /g_sigma_algebra_mapping /preimage_class/=. +pose g := fun i => sval (cid2 (mF i)). +pose mg := fun i => svalP (cid2 (mF i)). +exists (\bigcup_i g i). + by apply: bigcup_measurable => k; case: (mg k). +rewrite setTI /g preimage_bigcup; apply: eq_bigcupr => k _. +by case: (mg k) => _; rewrite setTI. +Qed. + +HB.instance Definition _ := Pointed.on (g_sigma_algebra_mappingType f). + +HB.instance Definition _ := @isMeasurable.Build (mapping_display f) + (g_sigma_algebra_mappingType f) (g_sigma_algebra_mapping f) + mapping_set0 mapping_setC mapping_bigcup. + +End mapping_generated_sigma_algebra. + +Notation "f .-mapping" := (mapping_display f) : measure_display_scope. +Notation "f .-mapping.-measurable" := + (measurable : set (set (g_sigma_algebra_mappingType f))) : classical_set_scope. + Local Open Scope ereal_scope. Definition subset_sigma_subadditive {T} {R : numFieldType} diff --git a/theories/numfun.v b/theories/numfun.v index 3a892df55..159626c8f 100644 --- a/theories/numfun.v +++ b/theories/numfun.v @@ -14,12 +14,15 @@ From mathcomp Require Import function_spaces. (* ``` *) (* {nnfun T >-> R} == type of non-negative functions *) (* f ^\+ == the function formed by the non-negative outputs *) -(* of f (from a type to the type of extended real *) -(* numbers) and 0 otherwise *) -(* rendered as f ⁺ with company-coq (U+207A) *) +(* of f and 0 otherwise *) +(* The codomain of f is the real numbers in scope *) +(* ring_scope and the extended real numbers in scope *) +(* ereal_scope. *) +(* It is rendered as f ⁺ with company-coq (U+207A). *) (* f ^\- == the function formed by the non-positive outputs *) (* of f and 0 o.w. *) -(* rendered as f ⁻ with company-coq (U+207B) *) +(* Similar to ^\+. *) +(* It is rendered as f ⁻ with company-coq (U+207B). *) (* \1_ A == indicator function 1_A *) (* ``` *) (* *) @@ -127,6 +130,149 @@ Proof. by apply/funext=> x; rewrite /patch/=; case: ifP; rewrite ?mule0. Qed. End erestrict_lemmas. +Section funrposneg. +Local Open Scope ring_scope. + +Definition funrpos T (R : realDomainType) (f : T -> R) := + fun x => maxr (f x) 0. +Definition funrneg T (R : realDomainType) (f : T -> R) := + fun x => maxr (- f x) 0. + +End funrposneg. + +Notation "f ^\+" := (funrpos f) : ring_scope. +Notation "f ^\-" := (funrneg f) : ring_scope. + +Section funrposneg_lemmas. +Local Open Scope ring_scope. +Variables (T : Type) (R : realDomainType) (D : set T). +Implicit Types (f g : T -> R) (r : R). + +Lemma funrpos_ge0 f x : 0 <= f^\+ x. +Proof. by rewrite /funrpos /= le_max lexx orbT. Qed. + +Lemma funrneg_ge0 f x : 0 <= f^\- x. +Proof. by rewrite /funrneg le_max lexx orbT. Qed. + +Lemma funrposN f : (\- f)^\+ = f^\-. Proof. exact/funext. Qed. + +Lemma funrnegN f : (\- f)^\- = f^\+. +Proof. by apply/funext => x; rewrite /funrneg opprK. Qed. + +(* TODO: the following lemmas require a pointed type and realDomainType does +not seem to be at this point + +Lemma funrpos_restrict f : (f \_ D)^\+ = (f^\+) \_ D. +Proof. +by apply/funext => x; rewrite /patch/_^\+; case: ifP; rewrite //= maxxx. +Qed. + +Lemma funrneg_restrict f : (f \_ D)^\- = (f^\-) \_ D. +Proof. +by apply/funext => x; rewrite /patch/_^\-; case: ifP; rewrite //= oppr0 maxxx. +Qed.*) + +Lemma ge0_funrposE f : (forall x, D x -> 0 <= f x) -> {in D, f^\+ =1 f}. +Proof. by move=> f0 x; rewrite inE => Dx; apply/max_idPl/f0. Qed. + +Lemma ge0_funrnegE f : (forall x, D x -> 0 <= f x) -> {in D, f^\- =1 cst 0}. +Proof. +by move=> f0 x; rewrite inE => Dx; apply/max_idPr; rewrite lerNl oppr0 f0. +Qed. + +Lemma le0_funrposE f : (forall x, D x -> f x <= 0) -> {in D, f^\+ =1 cst 0}. +Proof. by move=> f0 x; rewrite inE => Dx; exact/max_idPr/f0. Qed. + +Lemma le0_funrnegE f : (forall x, D x -> f x <= 0) -> {in D, f^\- =1 \- f}. +Proof. +by move=> f0 x; rewrite inE => Dx; apply/max_idPl; rewrite lerNr oppr0 f0. +Qed. + +Lemma ge0_funrposM r f : (0 <= r)%R -> + (fun x => r * f x)^\+ = (fun x => r * (f^\+ x)). +Proof. by move=> ?; rewrite funeqE => x; rewrite /funrpos maxr_pMr// mulr0. Qed. + +Lemma ge0_funrnegM r f : (0 <= r)%R -> + (fun x => r * f x)^\- = (fun x => r * (f^\- x)). +Proof. +by move=> r0; rewrite funeqE => x; rewrite /funrneg -mulrN maxr_pMr// mulr0. +Qed. + +Lemma le0_funrposM r f : (r <= 0)%R -> + (fun x => r * f x)^\+ = (fun x => - r * (f^\- x)). +Proof. +move=> r0; rewrite -[in LHS](opprK r); under eq_fun do rewrite mulNr. +by rewrite funrposN ge0_funrnegM ?oppr_ge0. +Qed. + +Lemma le0_funrnegM r f : (r <= 0)%R -> + (fun x => r * f x)^\- = (fun x => - r * (f^\+ x)). +Proof. +move=> r0; rewrite -[in LHS](opprK r); under eq_fun do rewrite mulNr. +by rewrite funrnegN ge0_funrposM ?oppr_ge0. +Qed. + +Lemma funr_normr f : normr \o f = f^\+ \+ f^\-. +Proof. +rewrite funeqE => x /=; have [fx0|/ltW fx0] := leP (f x) 0. +- rewrite ler0_norm// /funrpos /funrneg. + move/max_idPr : (fx0) => ->; rewrite add0r. + by move: fx0; rewrite -{1}oppr0 lerNr => /max_idPl ->. +- rewrite ger0_norm// /funrpos /funrneg; move/max_idPl : (fx0) => ->. + by move: fx0; rewrite -{1}oppr0 lerNl => /max_idPr ->; rewrite addr0. +Qed. + +Lemma funrposneg f : f = (fun x => f^\+ x - f^\- x). +Proof. +rewrite funeqE => x; rewrite /funrpos /funrneg; have [|/ltW] := leP (f x) 0. + by rewrite -{1}oppr0 -lerNr => /max_idPl ->; rewrite opprK add0r. +by rewrite -{1}oppr0 -lerNl => /max_idPr ->; rewrite subr0. +Qed. + +Lemma funrD_Dpos f g : f \+ g = (f \+ g)^\+ \- (f \+ g)^\-. +Proof. +apply/funext => x; rewrite /funrpos /funrneg/=; have [|/ltW] := lerP 0 (f x + g x). +- by rewrite -{1}oppr0 -lerNl => /max_idPr ->; rewrite subr0. +- by rewrite -{1}oppr0 -lerNr => /max_idPl ->; rewrite opprK add0r. +Qed. + +Lemma funrD_posD f g : f \+ g = (f^\+ \+ g^\+) \- (f^\- \+ g^\-). +Proof. +apply/funext => x; rewrite /funrpos /funrneg/=. +have [|fx0] := lerP 0 (f x); last rewrite add0r. +- rewrite -{1}oppr0 lerNl => /max_idPr ->; have [|/ltW] := lerP 0 (g x). + by rewrite -{1}oppr0 lerNl => /max_idPr ->; rewrite addr0 subr0. + by rewrite -{1}oppr0 -lerNr => /max_idPl ->; rewrite addr0 sub0r opprK. +- move/ltW : (fx0); rewrite -{1}oppr0 lerNr => /max_idPl ->. + have [|]/= := lerP 0 (g x); last rewrite add0r. + by rewrite -{1}oppr0 lerNl => /max_idPr ->; rewrite addr0 opprK addrC. + by rewrite -oppr0 ltrNr -{1}oppr0 => /ltW/max_idPl ->; rewrite opprD !opprK. +Qed. + +Lemma funrpos_le f g : + {in D, forall x, f x <= g x} -> {in D, forall x, f^\+ x <= g^\+ x}. +Proof. +move=> fg x Dx; rewrite /funrpos /maxr; case: ifPn => fx; case: ifPn => gx //. +- by rewrite leNgt. +- by move: fx; rewrite -leNgt => /(lt_le_trans gx); rewrite ltNge fg. +- exact: fg. +Qed. + +Lemma funrneg_le f g : + {in D, forall x, f x <= g x} -> {in D, forall x, g^\- x <= f^\- x}. +Proof. +move=> fg x Dx; rewrite /funrneg /maxr; case: ifPn => gx; case: ifPn => fx //. +- by rewrite leNgt. +- by move: gx; rewrite -leNgt => /(lt_le_trans fx); rewrite ltrN2 ltNge fg. +- by rewrite lerN2; exact: fg. +Qed. + +End funrposneg_lemmas. +#[global] +Hint Extern 0 (is_true (0%R <= _ ^\+ _)%R) => solve [apply: funrpos_ge0] : core. +#[global] +Hint Extern 0 (is_true (0%R <= _ ^\- _)%R) => solve [apply: funrneg_ge0] : core. + Section funposneg. Local Open Scope ereal_scope. @@ -276,6 +422,17 @@ Hint Extern 0 (is_true (0%R <= _ ^\+ _)%E) => solve [apply: funepos_ge0] : core. #[global] Hint Extern 0 (is_true (0%R <= _ ^\- _)%E) => solve [apply: funeneg_ge0] : core. +Section funrpos_funepos_lemmas. +Context {T : Type} {R : realDomainType}. + +Lemma funerpos (f : T -> R) : (EFin \o f)^\+%E = (EFin \o f^\+). +Proof. by apply/funext => x; rewrite /funepos /funrpos/= EFin_max. Qed. + +Lemma funerneg (f : T -> R) : (EFin \o f)^\-%E = (EFin \o f^\-). +Proof. by apply/funext => x; rewrite /funeneg /funrneg/= EFin_max. Qed. + +End funrpos_funepos_lemmas. + Definition indic {T} {R : ringType} (A : set T) (x : T) : R := (x \in A)%:R. Reserved Notation "'\1_' A" (at level 8, A at level 2, format "'\1_' A") . Notation "'\1_' A" := (indic A) : ring_scope. diff --git a/theories/probability.v b/theories/probability.v index c958e511f..6468b6fd8 100644 --- a/theories/probability.v +++ b/theories/probability.v @@ -541,6 +541,24 @@ Qed. End variance. Notation "'V_ P [ X ]" := (variance P X). +(* TODO: move earlier *) +Section mfun_measurable_realType. +Context {d} {aT : measurableType d} {rT : realType}. + +HB.instance Definition _ (f : {mfun aT >-> rT}) := + @isMeasurableFun.Build d _ _ _ f^\+ + (measurable_funrpos (@measurable_funP _ _ _ _ f)). + +HB.instance Definition _ (f : {mfun aT >-> rT}) := + @isMeasurableFun.Build d _ _ _ f^\- + (measurable_funrneg (@measurable_funP _ _ _ _ f)). + +HB.instance Definition _ (f : {mfun aT >-> rT}) := + @isMeasurableFun.Build d _ _ _ (@normr _ _ \o f) + (measurableT_comp (@normr_measurable _ _) (@measurable_funP _ _ _ _ f)). + +End mfun_measurable_realType. + Section markov_chebyshev_cantelli. Local Open Scope ereal_scope. Context d (T : measurableType d) (R : realType) (P : probability T R).