We consider the Cauchy problem for a semilinear stochastic differential
inclusion in a Hilbert space. The linear operator generates a strongly
continuous semigroup and the nonlinear term is multivalued and satisfies a
condition which is more heneral than the Lipschitz condition. We prove the
existence of a mild solution to this problem. This solution is not "strong" in
the probabilistic sense, that is, it is not defined on the underlying
probability space, but on a larger one, which provides a "very good extension"
in the sense of Jacod and Memin. Actually, we construct this solution as a
Young measure, limit of approximated solutions provided by the Euler scheme.
The compactness in the space of Young measures of this sequence of approximated
solutions is obtained by proving that some measure of noncompactness equals
zero

De Fitte, Paul Raynaud

Jakubowski, Adam

Kamenskii, Mikhail

English

arXiv

Kamenskiı̆, Mikhail I.

Raynaud de Fitte, Paul

Numérisation de Documents Anciens Mathématiques

1/scetochastic,g aofo-dreeuresé-C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234http://france.elsevier.com/direct/CRASSProbability TheoryExistence of weak solutions to stochastic evolution inclusionAdam Jakubowskia, Mikhail I. Kamenskĭı b, Paul Raynaud de Fitteca Nicholas Copernicus University, Faculty of Mathematics and Informatics, ul. Chopina 12/18, 87-100 Toru´n, Polandb Departement of Mathematics, State University of Voronezh, Voronezh, Universitetskaja pl. 1, 394693, Russiac Laboratoire de mathematique R. Salem, UMR CNRS 6085, UFR sciences, université de Rouen, 76821 Mont Saint Aignan cedex, FranReceived 21 July 2004; accepted after revision 14 December 2004Available online 7 January 2005Presented by Marc YorAbstractWe prove the existence of a weak mild solution (or mild solution-measure) to the Cauchy problem for the semilinear sdifferential inclusion in a Hilbert space dXt ∈ AXt dt + F(t,Xt )dt + G(t,Xt )dWt whereW is a cylindrical Wiener processA is a linear operator which generates aC0-semigroup,F andG are multifunctions with convex compact values satisfyinlinear growth condition and a condition weakerthan the Lipschitz condition. The weak solution is constructed in the senseYoung measures. In the case whenF andG are single-valued, we obtain the existence of a strong solution.To cite this article:A. Jakubowski et al., C. R. Acad. Sci. Paris, Ser. I 340 (2005). 2004 Académie des sciences. Published by Elsevier SAS. All rights reserved.RésuméExistence de solutions faibles d’inclusions d’évolution stochastiques.Nous démontrons l’existence d’une solution d’évlution faible (ou solution-mesure d’évolution) de l’inclusion différentielle stochastique dans un espace de HilbertXt ∈AXt dt + F(t,Xt )dt + G(t,Xt )dWt oùW est un mouvement brownien cylindrique,A est un opérateur linéaire qui engendun semi-groupe de classeC0, F etG sont des multifonctions à valeurs convexes compactes vérifiant une condition de croissanclinéaire ainsi qu’une condition plus généraleque la condition de Lipschitz. La solution faible est construite au sens des mesde Young. LorsqueF etG sont univoques, on obtient l’existence d’une solution forte.Pour citer cet article : A. Jakubowski etal., C. R. Acad. Sci. Paris, Ser. I 340 (2005). 2004 Académie des sciences. Published by Elsevier SAS. All rights reserved.Version française abrégéeDans ce qui suit, 0< T < +∞ est un horizon fixé etF = (Ω,F , (Ft )0tT ,P) est une base stochastique vrifiant les conditions habituelles. On sedonne deux espaces de Hilbert séparablesH et U et un(Ft )-mouvementE-mail addresses:adjakubo@mat.uni.torun.pl (A. Jakubowski), mikhailkamenski@mail.ru (M.I. Kamenskiı̆), prf@univ-rouen.fr(P. Raynaud de Fitte).1631-073X/$ – see front matter 2004 Académie des sciences. Published by Elsevier SAS. All rights reserved.doi:10.1016/j.crma.2004.12.015230 A. Jakubowski et al. / C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234(1) ci-s àEndansese-brownienW (éventuellement cylindrique) surU. SoitL l’espace des opérateurs de Hilbert–Schmidt deU dansH.Dans ce travail, nous montrons l’existence d’une solution-mesure d’évolution au problème de Cauchydessous, oùX est à valeurs dansH, A est un opérateur linéaire surH etF etG sont des applications mesurablevaleurs convexes compactes, respectivement dansH et dansL.Une solution d’évolution forte de (1) a été obtenue par Da Prato et Frankowska [5] dans le cas oùF etG vérifientune condition de Lipschitz par rapport à la deuxième variable. Nous affaiblissons nettement cette condition.revanche, nous supposons les applicationsF et G déterministes et à valeurs convexes compactes, alors que[5] elles sont aléatoires et à valeurs fermées non nécessairement bornées.On se donne une fois pour toutes un nombrep > 2. Si E est un espace de Banach, on noteKc(E) l’ensembledes compacts convexes non vides deE, t HausdE la distance de Hausdorff surKc(E). On se donne également lhypothèses suivantes :(HS) A engendre un semigroupe(S(t))t0 de classeC0.(HFG) F : [0, T ] × H → Kc(H) etG : [0, T ] × H → Kc(L) sont des applications mesurables telles que(i) il existe une constanteCgrowth> 0 telle que, pour tout(t, x) ∈ [0, T ] × H,HausdH(0,F (t, x)) Cgrowth(1+ ‖x‖), HausdL(0,G(t, x))  Cgrowth(1+ ‖x‖),(ii) pour tout(t, x, y) ∈ [0, T ] × H × H,(HausdH(F(t, x),F (t, y)))p  L(t,‖x − y‖p),(HausdL(G(t, x),G(t, y)))p  L(t,‖x − y‖p),où L : [0, T ] × [0,+∞] → [0,+∞] est une fonction continue donnée telle que pour tout∈ [0, T ],l’application L(t, ·) soit croissante et concave et que, pour toute application mesurablez : [0, T ] →[0,+∞] et pour toute constanteK > 0, on ait[(∀t ∈ [0, T ]) z(t)  K t∫0L(s, z(s))ds]⇒ z = 0.En particulier, pour tout ∈ [0, T ], les multifonctionsF(t, ·) et G(t, ·) sont continues. Ce type dfonctionL est considéré notamment dans [11,1,12,3,4].(HI) ξ ∈ Lp(Ω,F0,P|F0;H).Pour toutt ∈ [0, T ], N pc (F, [0, t];H) désigne l’espace des processus continus(Ft )-adaptésX à valeurs dansHtels queE(sup0st ‖X(s)‖pH) < +∞.Définition 0.1.On dit qu’un processusX ∈N pc (F, [0, T ];H) est unesolution d’évolution ( forte)de (1) s’il existedes processus prévisiblesf et g définis surF vérifiant (5). On dit qu’un processusX est unesolution d’évolutionfaibleousolution-mesure d’évolutionde (1) s’il existe une base stochastiqueF = (Ω,F ,(F t )t ,µ) telle que(i) Ω est de la formeΩ = Ω × Ω ′, F = F ⊗ F ′ pour une tribuF ′ surΩ ′, F t = Ft ⊗ F ′t pour une filtrationcontinue à droite(F ′t ) sur(Ω ′,F ′) et la probabilitéµ vérifieµ(A × Ω ′) = P(A) pour toutA ∈F ,(ii) le processusW est un mouvement brownien surF (on identifie ici toute variable aléatoireY définie surΩavec la variable aléatoire(ω,ω′) 	→ Y (ω) définie surΩ),(iii) X ∈ N pc (F, [0, T ];H) et il existe des processus prévisiblesf etg définis surF vérifiant (5).Les qualificatifs « fort » et « faible » sont donc à prendre au sens probabiliste. La terminologiesolution-mesureest celle de Jacod et Mémin [7]. SiF ′ est la tribu borélienne d’une topologie surΩ ′, on peut voir une solutionA. Jakubowski et al. / C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234 231mesuresisationualfgs,under athatheymesure comme une mesure de Young. C’est le point de vue adopté par Pellaumail [10], qui a réinventé lesde Young sous le nom derègles.Théorème 0.2.Sous les hypothèses(HS), (HFG) et (HI), l’inclusion (1) admet une solution d’évolution faible.Dans le cas oùH etU sont de dimension finie, une adaptation facile de la preuve de ce théorème et l’utildu point de Steiner montrent que (1) admet une solution d’évolution forte.1. Formulation of the problem, statement of the result1.1. IntroductionThroughout, 0< T < +∞ is a fixed time andF = (Ω,F , (Ft )t∈[0,T ],P) is a stochastic basis satisfying the usconditions. We are given two separable Hilbert spacesH andU and a (possibly cylindrical)(Ft )t∈[0,T ]-BrownianmotionW on U. We denote byL the space of Hilbert–Schmidt operators fromU to H. We prove the existence oa ‘weak’ (in the sense of probability) mild solutionX to the Cauchy problem{dXt ∈ AXt + F(t,Xt )dt + G(t,Xt)dW(t),X(0) = ξ, (1)whereX takes its values inH, A is a linear operator onH andF andG are measurable multivalued mappinwith convex compact values inH andL respectively.The existence of a strong mild solution to (1) has been proved by Da Prato and Frankowska in [5]Lipschitz assumption. We replace this assumption by a much more general one. On the other hand, we assumeF andG have compact convex values (whereas they are only assumed to have closed values in [5]) and that tare deterministic (whereas they are random in [5]).1.2. Notations, hypothesis, definitionsWe are given a fixed numberp > 2. For anyt ∈ [0, T ], we denote byN pc (F, [0, t];H) the space of(Ft )-adaptedH-valued continuous processesX such that‖X‖pN pc (F,[0,t ];H) := E(sup0st∥∥X(s)∥∥pH)< +∞.If E is a Banach space, we denote byKc(E) the set of nonempty convex compact subsets ofE, and by HausdE theHausdorff distance onKc(E). We shall assume the following hypothesis:(HS) A is the generator of aC0 semigroup(S(t))t0. In particular there existM > 0 andβ ∈ ]−∞,+∞[ suchthat, for everyt  0,∥∥S(t)∥∥  M eβt . (2)For t ∈ [0, T ], we denoteMt = sup0st M eβs .(HFG) F : [0, T ] × H → Kc(H) andG : [0, T ] × H → Kc(L) are measurable mappings which satisfy:(i) There exists a constantCgrowth> 0 such that, for all(t, x) ∈ [0, T ] × H,HausdH(0,F (t, x)) Cgrowth(1+ ‖x‖), HausdL(0,G(t, x))  Cgrowth(1+ ‖x‖).(ii) For all (t, x, y) ∈ [0, T ] × H × H,(HausdH(F(t, x),F (t, y)))p  L(t,‖x − y‖p),232 A. Jakubowski et al. / C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234,ssisasnder thef(HausdL(G(t, x),G(t, y)))p  L(t,‖x − y‖p),whereL : [0, T ] × [0,+∞] → [0,+∞] is a given continuous mapping such that(a) for everyt ∈ [0, T ], the mappingL(t, ·) is nondecreasing and concave,(b) for every measurable mappingz : [0, T ] → [0,+∞] and for every constantK > 0,the following implication holds true:[(∀t ∈ [0, T ]) z(t)  K t∫0L(s, z(s))ds]⇒ z = 0. (3)In particular, for allt ∈ [0, T ], we haveL(t,0) = 0 for all t ∈ [0, T ], thus, by hypothesis (HFG)(ii)F(t, ·) andG(t, ·) are continuous for the Hausdorff distance. Such a functionL is considered ine.g. [11,1,12,3,4]. Concrete examples can be found in [12].(HI) ξ ∈ Lp(Ω,F0,P|F0;H).Recall (see [6]) that, under Hypothesis(HS), there exists a constantCConv such that, for any predictable proceZ ∈ Lp(Ω × [0, T ];L), we haveE[supst∥∥∥∥∥s∫0S(s − r)Z(r)dW(r)∥∥∥∥∥p] CConvt(p/2)−1Et∫0∥∥Z(s)∥∥pLds. (4)Definition 1.1. We say that a processX ∈ N pc (F, [0, T ];H) is a (strong) mild solutionto (1) if there exist twopredictable processesf andg defined onF such that{X(t) = S(t)ξ + ∫ t0 S(t − s)f (s)ds + ∫ t0 S(t − s)g(s)dW(s),f (s) ∈ F(s,X(s)) P-a.e., g(s) ∈ G(s,X(s)) P-a.e.(5)We say that a processX is aweak mild solutionor amild solution-measureto (1) if there exists a stochastic basF = (Ω,F ,(F t )t ,µ) satisfying the following conditions:(i) Ω has the formΩ = Ω × Ω ′, F = F ⊗ F ′ for someσ -algebraF ′ on Ω ′, F t = Ft ⊗ F ′t for some rightcontinuous filtration(F ′t ) on (Ω ′,F ′), and the probabilityµ satisfiesµ(A × Ω ′) = P(A) for everyA ∈F .(ii) The processW is a Brownian motion onF (we identify here every random variableY onΩ with the randomvariable(ω,ω′) 	→ Y (ω) defined onΩ).(iii) X ∈ N pc (F, [0, T ];H) and there exist two predictable processesf andg defined onF satisfying (5).So, the qualifiers ‘strong’ and ‘weak’ are to be taken in the probabilistic sense. The terminologys lution-measureis that of [7]. IfF ′ is the Borelσ -algebra of some topology onΩ ′, a solution-measure can also be seena Young measure. This is the point of view adopted by Pellaumail [10], who reinvented Young measures uname ofrules.1.3. Statement of the resultsTheorem 1.2.Under Hypothesis(HS), (HFG) and(HI), inclusion(1) has a weak mild solution.An adaptation of our reasoning also yields a well-known strong existence result [3,4]: ifF andG are single-valued, then (1) has a strong mild solution. IfH andU are finite dimensional, considering the Steiner point oFandG, we deduce from this result that (1) has a strong mild solution.A. Jakubowski et al. / C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234 233ellnt in.2. Sketch of the proofLet us denote byΦ the mapping which, with every continuous adaptedH-valued processX such thatE∫ T0 ‖X(s)‖p ds < +∞, associates the set of all processes of the formS(t)ξ +∫ t0 S(t − s)f (s)ds +∫ t0 S(t −s)g(s)dW(s), wheref andg are predictable selections of(ω, t) 	→ F(t,X(ω, t)) and(ω, t) 	→ G(t,X(ω, t)) re-spectively. Let C([0, T ];H) denote the space of continuous mappings from[0, T ] to H. The proof of Theorem 1.2relies on the following lemmas:Lemma 2.1.Let Λ be a set of continuous(Ft )-adapted processes onH. Assume that each element ofΛ is inLp(Ω × [0, T ];H) and thatΛ, considered as a set ofC([0, T ];H)-valued random variables, is tight. Assumfurthermore Hypothesis(HS) and(HFG)(i). ThenΦ(Λ) is a tight set ofC([0, T ];H)-valued random variables.If (E, d) is a metric space andΛ ⊂ E, we say that a subsetΛ′ of E is anε-net of Λ if inf X∈Λ d(X,Λ′)  ε(note thatΛ′ is not necessarily a subset ofΛ). Let Λ be a subset ofN pc (F, [0, T ];H). For everys ∈ [0, T ], letΛs ⊂N pc (F, [0, s];H) be the set of restrictions to[0, s] of elements ofΛ. We denoteΨ (Λ)(s) := inf{ε > 0; Λs has a tightε-net inN pc (F, [0, s];H)}.So,Λ is tight if and only ifΨ (Λ)(T ) = 0. We denoteΨ (Λ) := (Ψ (Λ)(s))0sT . The familyΨ (Λ) is called themeasure of noncompactnessof Λ (see [1,8] about measures of noncompactness).Lemma 2.2.Let Λ be a bounded subset ofN pc (F, [0, T ];H). Assume Hypothesis(HFG). We then haveΨ p(Φ ◦Λ)(t)  k∫ t0 L(s,Ψp(Λ)(s))ds for some constantk which depends only onT , p, MT , andCConv.Our proof of Lemma 2.2 draws inspiration from [1, Lemma 4.2.6] and uses Lemma 2.1.Proof of Theorem 1.2: First Part. We build a tight sequence of approximating solutions through Tonelli’sscheme: For eachn  1, we define a process̃Xn on [−1, T ] by X̃n(t) = 0 if t  0 and, fort  0,X̃n(t) = S(t)ξ +t∫0S(t −(s − 1n))fn(s)ds +t∫0S(t −(s − 1n))gn(s)dW(s),wherefn :Ω × [0, T ] → H andgn :Ω × [0, T ] → L are predictable andfn(s) ∈ F(s, X̃n(s − 1/n)) P-a.e. andgn(s) ∈ G(s, X̃n(s − 1/n)) P-a.e. We then setXn(t) = ξ for t  1/n and, fort ∈ [1/n,T ], Xn(t) = X̃n(t − 1/n) =S(t − 1/n)ξ + ∫ t−1/n0 S(t − s)fn(s)ds + ∫ t−1/n0 S(t − s)gn(s)dW(s). A calculation using (2), (4) and GronwaLemma shows that(Xn) is bounded in Lp(Ω × [0, T ];H). Then, with the help of Lemma 2.2, we obtainΨ p(⋃n{Xn})(t)  MpT Ψp(⋃nΦ(Xn))(t)  MpT kt∫0L(s,Ψ p(⋃n{Xn})(s))ds.From (3), we conclude that(Xn) is a tight set of C([0, T ];H)–valued random variables.Remark 1. If F andG are single-valued, replacing tight nets by finite nets in the definition ofΨ , an easy adaptatioof all previous arguments shows that the sequence(Xn) provided by the Tonelli scheme is relatively compacN pc (F, [0, T ];H). Moreover, the limit of any convergent subsequence of(Xn) is a strong mild solution of (1)Thus, in this case, (1) has a strong mild solution, as was proved in [3,4].Proof of Theorem 1.2: Second Part.We now construct a weak mild solution to (1).234 A. Jakubowski et al. / C. R. Acad. Sci. Paris, Ser. I 340 (2005) 229–234sreytors,vak-roc.dede200.By Prohorov’s compactness criterion for Young measures, we can extract a subsequence of(Xn) which con-verges stably (i.e. in the sense of Young measures) to a Young measureµ ∈ Y(Ω,F ,P;C([0, T ];H)). For sim-plicity, we denote this extracted sequence by(Xn).Let C be the Borelσ -algebra of C([0, T ];H) and, for eacht ∈ [0, T ], letCt be the sub-σ -algebra ofC generatedby C([0, t];H). We define a stochastic basis(Ω,F, (F t )t ,µ) by Ω = Ω ×C([0, T ];H),F =F ⊗C,F t =Ft ⊗Ctand we defineX∞ onΩ by X∞(ω,u) = u. Clearly,X∞ is (F t )-adapted. The random variablesXn can be seen arandom elements defined onΩ , using the notationXn(ω,u) := Xn(ω) (n ∈ N). Furthermore,Xn is (F t )-adaptedfor eachn, andW is (F t )-adapted. By a result of Balder (e.g. [2]), each subsequence of(Xn) contains a furthesubsequence(X′n) such that, for each subsequence(X′′n) of (X′n), we have limn 1n∑ni=1 δX′′n(ω) = µω a.e. whereδx is the probability concentrated onx andω 	→ µω is the disintegration ofµ. This entails that, for everyA ∈ Ct ,the mappingω 	→ µω(A) is Ft -measurable. Then is easy to prove thatW is an(F t )-Wiener process under thprobabilityµ.To prove thatX = X∞ satisfies (5), we choose particular selectionsfn andgn. From a result of Kucia [9], wecan find measurable selectionsf andg of F andG respectively such thatf(t, ·) andg(t, ·) are continuous for evert ∈ [0, T ]. DenotingN̂ = N ∪ {∞}, we set, for eachn ∈ N̂ and eacht ∈ [0, T ],fn(t) = f(t,Xn(t)), gn(t) = g(t,Xn(t)),Zn(t) = −Xn(t) + S(t)ξ +t−1/n∫0S(t − s)fn(s)ds +t−1/n∫0S(t − s)gn(s)dW(s)(with 1/∞ := 0). The sequence(Xn,W,fn, gn) converges in law to(X∞,W,f∞, g∞) in C([0, T ];H)×C([0, T ];U)×Lp([0, T ];H)×Lp([0, T ];L). Using the fact thatp > 2, we prove that, for everyt ∈ [0, T ], thesequence(Zn(t)) converges in law toZ∞(t). But we deduce from(HFG)(i) and the boundedness of(Xn) inLp(Ω × [0, T ];H) thatZn(t) converges to 0 in probability. Thus, for everyt ∈ [0, T ], we haveZ∞(t) = 0 a.e. AsZ∞ is continuous, this means thatZ∞ = 0 a.e. ThusX is a weak mild solution to (1). AcknowledgementsWe thank Professor Jan Seidler for the references [3,4,12] and several helpful remarks.References[1] R.R. Akhmerov, M.I. Kamenskiı̆, A.S. Potapov, B.N. Rodkina, B.N. Sadovskiı̆, Measures of Noncompactness and Condensing OperaBirkhäuser, Basel, 1992.[2] E.J. Balder, New sequential compactness results for spaces ofscalarly integrable functions, J. Math. Anal. Appl. 151 (1990) 1–16.[3] D. Barbu, Local and global existence for mild solutions ofstochastic differential equations, Portugal. Math. 55 (1998) 411–424.[4] D. Barbu, G. Boc¸san, Approximations to mild solutions of stochastic semilinear equations with non-Lipschitz coefficients, CzechosloMath. J. 52 (127) (2002) 87–95.[5] G. Da Prato, H. Frankowska, A stochastic Filippov theorem, Stochastic Anal. Appl. 12 (1994) 409–426.[6] G. Da Prato, J. Zabczyk, Stochastic Equations in Infinite Dimensions, Encyclopedia of Mathematics and Its Applications, vol. 44, Cambridge University Press, Cambridge, 1992.[7] J. Jacod, J. Mémin, Weak and strong solutions of stochastic differential quations: existence and stability, in: Stochastic Integrals, PSympos., Univ. Durham, Durham, 1980, in: Lecture Notes in Math., vol. 851, Springer, Berlin, 1981, pp. 169–212.[8] M.I. Kamenskĭı, V. Obukhovskĭı, P. Zecca, Condensing Multivalued Maps and Semilinear Differential Inclusions in Banach Spaces,Gruyter, Berlin, 2001.[9] A. Kucia, Some results on Carathéodory selections and extensions, J. Math. Anal. Appl. 223 (1998) 302–318.[10] J. Pellaumail, Solutions faibles et semi-martingales, in: J. Azéma, M. Yor (Eds.), Séminaire de Probabilités XV, 1979/80, UniversitéStrasbourg, in: Lecture Notes in Math., vol. 850, Springer-Verlag, Berlin, 1981, pp. 561–586.[11] A.E. Rodkina, On existence and uniqueness of solution of stochastic differential equations with heredity, Stochastics 12 (1984) 187–[12] T. Taniguchi, Successive approximationsto solutions of stochastic differential equations, J. Differential Equations 96 (1992) 152–169.

Existence of weak solutions to stochastic evolution inclusions

HAL: Hyper Article en Ligne

HAL - Normandie Université

Adam Jakubowski

Mikhail I. Kamenskiı̆

Paul Raynaud de Fitte

Comptes Rendus Mathématique

International audienceWe consider the Cauchy problem for a semilinear stochastic differential inclusion in a Hilbert space. The linear operator generates a strongly continuous semigroup and the nonlinear term is multivalued and satisfies a condition which is more heneral than the Lipschitz condition. We prove the existence of a mild solution to this problem. This solution is not "strong" in the probabilistic sense, that is, it is not defined on the underlying probability space, but on a larger one, which provides a "very good extension" in the sense of Jacod and Mémin. Actually, we construct this solution as a Young measure, limit of approximated solutions provided by the Euler scheme. The compactness in the space of Young measures of this sequence of approximated solutions is obtained by proving that some measure of noncompactness equals zero

https://hal.archives-ouvertes.fr/hal-00726643

Existence of weak solutions to stochastic evolution inclusions

Abstract

Similar works

Full text

Available Versions

Numérisation de Documents Anciens Mathématiques

HAL: Hyper Article en Ligne

HAL - Normandie Université

Comptes Rendus Mathématique

HAL: Hyper Article en Ligne