Square-mean weighted pseudo almost automorphic solutions for stochastic semilinear integral equations

Abstract

In this paper, we introduce the concept of S2-weighted pseudo almost automorphy for stochastic processes. We study the existence and uniqueness of square-mean weighted pseudo almost automorphic solutions for the semilinear stochastic integral equation x(t)=∫-∞ta(t-s)[Ax(s)+f(s,x(s))]ds+∫-∞ta(t-s)(s,x(s))dw(s), \ t∈R, where a∈ L1(R+), A is the generator of an integral resolvent family on a Hilbert space H, w(t) is the two-sided Q-Wiener process, f,: R× L2(P,H)→ L2(P,H) are two S2-weighted pseudo almost automorphic functions.