Backward Stochastic Evolution Inclusions in UMD Banach Spaces

Abstract

In this paper, we prove the existence of a mild Lp-solution for the backward stochastic evolution inclusion (BSEI for short) of the form align*%BSDI3 cases dYt+AYtdt∈ G(t,Yt,Zt)dt+ZtdWt, t∈ [0,T] YT =, cases align* where W=(Wt)t∈ [0,T] is a standard Brownian motion, A is the generator of a C0-semigroup on a UMD Banach space E, is a terminal condition from Lp(,FT;E), with p>1 and G is a set-valued function satisfying some suitable conditions. The case when the processes with values in spaces that have martingale type 2, has been also studied.