Optimal controls of backward stochastic differential equations

Author

Dokuchaev, Nikolai ; Zhou, Xun Yu

Author_Institution

Inst. of Math. & Mech., St. Petersburg State Univ., Russia

Volume

2

fYear

1999

fDate

6/21/1905 12:00:00 AM

Firstpage

1470

Abstract

This paper considers a nonlinear stochastic control problem where the system dynamics is a controlled nonlinear backward stochastic differential equation and the state must coincide with a given random vector at the terminal time. A necessary condition of optimality in the form of a global maximum principle as well as a sufficient condition of optimality are presented. The general result is also applied to a backward linear-quadratic control problem and an optimal control is obtained explicitly as a feedback of the solution to a forward-backward equation. Finally, a nonlinear problem with additional integral constraints is discussed and it is shown that the duality gap is zero under the Slater condition

Keywords

differential equations; linear quadratic control; maximum principle; nonlinear control systems; optimal control; stochastic systems; Lagrangian; Slater condition; adjoint equation; backward linear-quadratic control problem; backward stochastic differential equations; controlled nonlinear backward stochastic differential equation; duality gap; forward-backward equation; global maximum principle; integral constraints; nonlinear stochastic control problem; optimal control; system dynamics; Control systems; Differential equations; Integral equations; Linear feedback control systems; Nonlinear control systems; Nonlinear dynamical systems; Optimal control; Stochastic processes; Stochastic systems; Sufficient conditions;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 1999. Proceedings of the 38th IEEE Conference on

Conference_Location

Phoenix, AZ

ISSN

0191-2216

Print_ISBN

0-7803-5250-5

Type

conf

DOI

10.1109/CDC.1999.830191

Filename

830191