Stochastic maximum principle for infinite dimensional control systems
Abstract
The general maximum principle is proved for an infinite dimensional controlled stochastic evolution system. The control is allowed to take values in a nonconvex set and enter into both drift and diffusion terms. The operator-valued backward stochastic differential equation, which characterizes the second-order adjoint process, is understood via the concept of "generalized solution" proposed by Guatteri and Tessitore [SICON 44 (2006)].
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