Abstract
We deduce an analog of the Itô–Venttsel’ formula for an Itô system of generalized stochastic differential equations (GSDE) with noncentered measure on the basis of a stochastic kernel of an integral invariant. We construct a system of GSDE whose solution is a kernel of an integral invariant connected with a solution to GSDE with noncentered measure. We introduce the notion of a stochastic first integral of a system of GSDE with noncentered measure and find conditions under which a random function is a first integral of a given system of GSDE.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
J.-M. Bismut, “A generalized formula of Itô and some other properties of stochastic flows,” Z.Wahrsch. Verw. Gebiete 55, 331 (1981).
E. V. Chalykh, “A generalization of models of Brownian motion with orthogonal random actions,” in: The Second International Scientific Technical Conference “Open Evolving Systems” (December 1–30, 2003), Abstracts, 90 (VNZ VMURoL, Kyiv, 2004); http://openevolvingsystems.narod.ru/2004-OESII/2004-OESII.pdf
E. V. Chalykh, “Program control with probability 1 for open systems,” Obozr. Prikl. Prom. Mat. 14, 253 (2007).
V. A. Dubko, First Integrals of Systems of Stochastic Differenial Equations, Preprint (Izd-vo An USSR, In-tMatematiki, Kiev, 1978) [in Russian]; http://openevolvingsystems.narod.ru/indexUkr.htm.
V. A. Dubko, “Integral invariants for some class of systems of stochastic differential equations,” Dokl. Akad. Nauk Ukr. SSR, Ser. A, No.1, 18 (1984).
V. A. Dubko, Questions in the Theory and Applications of Stochastic Differential Equations (DVO AN SSSR, Vladivostok, 1989) [in Russian].
V. A. Dubko, “Integral invariants of Itô’ s equations and their relation with some problems of the theory of stochastic processes,” Dopov. Nats. Akad. Nauk Ukr.,Mat. Pryr. Tekh. Nauky, No.1, 24 (2002).
V. A. Dubko, “Open evolving systems,” in: The First International Scientific Technical Conference “Open Evolving Systems” (April 26–27, 2002), Abstracts, 14 (VNZ VMURoL, Kyiv, 2002); http://openevolvingsystems.narod.ru/indexUkr.htm
V. A. Dubko and E. V. Chalykh, “Construction of an analytic solution for one class of Langevin-type equations with orthogonal random actions,” Ukr. Mat. Zh. 50, 588 (1998) [Ukr.Math. J. 50, 666 (1998)].
N. P. Erugin, “Construction of the whole set of differential equations having a given integral curve,” Prikl. Mat. Mekh. 16, 658 (1952).
I. I. Gikhman and A. V. Skorokhod, Stochastic Differential Equations (Naukova Dumka, Kiev, 1968; Springer Verlag, Berlin, 1972).
K. Itô, “Stochastic differential equations in a differentiable manifold,” Nagoya Math. J. 1, 35 (1950).
E. V. Karachanskaya, “On a generalization of the Itô–Venttsel-formula,” Obozr. Prikl. Prom. Mat. 18, 494 (2011).
E. V. Karachanskaya, “Construction of program controls with probability 1 for a dynamical system with Poisson perturbations,” Vestnik Tikhookeansk. Gosuniversiteta No. 2 (21), 51 (2011).
E. V. Karachanskaya, “Construction of a set of differential equations with a given set of first integrals,” Vestnik Tikhookeansk. Gosuniversiteta No. 3 (22), 47 (2011).
N. V. Krylov and B. L. Rozovskii, “Stochastic partial differential equations and diffusion processes,” Usp. Mat. Nauk 37, No. 6 (228), 75 (1982) [Russ.Math. Surv. 37, 81 (1982)].
N. V. Krylov, “On the Itô–Wentzell formula for distribution-valued processes and related topics,” Probab. Theory Related Fields 150, 295–319 (2011).
H. Kunita and S. Watanabe, “On square integrable martingales,” Nagoya Math. J. 30, 209 (1967) [Matematika, Moskva, 15, No. 1, 66 (1971)].
V. V. Nemytskii and V. V. Stepanov, Qualitative Theory of Differential Equations (Editorial URSS, Moscow, 2004; Princeton University Press, rinceton, N.J., 1960].
D. Ocone and E. Pardoux, “A generalized Itô–Ventzell formula,” Ann. Inst. H. PoincaréSect. B 25, 39 (1989).
B. Oksendal and T. Zhang, “The Itô–Ventzell formula and forward stochastic differential equations driven by Poisson random measures,” Osaka J. Math. 44, 207 (2007)
A. Poincaré, Selected Works in Three Volumes. Vol. II: Les Méthodes Nouvelles de la Mécanique Céleste. Topology. Number Theory (Nauka, Moscow, 1972) [in Russian].
B. L. Rozovskii, “On the Ito-Venttsel formula,” Vestn. Mosk. Univ., Ser. I. 28, No.1, 26 (1973) [Mosc. Univ. Math. Bull. 28, 22 (1973)].
A. D. Ventzel, “On equations of the theory of conditionalMarkov processes,” Teor. Veroyatnost. i Primenen. 10, 390 (1965) [Theory Probab. Appl. 10, 357 (1965)].
V. I. Zubov, Dynamics of Controlled Systems (Vysshaya Shkola, Moscow, 1982) [in Russian].
Author information
Authors and Affiliations
Corresponding author
Additional information
Original Russian Text © E.V. Karachanskaya, 2014, published in Matematicheskie Trudy, 2014, Vol. 17, No. 1, pp. 99–122.
About this article
Cite this article
Karachanskaya, E.V. The generalized Itô–Venttsel’ formula in the case of a noncentered Poisson measure, a stochastic first integral, and a first integral. Sib. Adv. Math. 25, 191–205 (2015). https://doi.org/10.3103/S1055134415030049
Received:
Published:
Issue Date:
DOI: https://doi.org/10.3103/S1055134415030049