A splitting algorithm for stochastic partial differential equations driven by linear multiplicative noise

Abstract

We study the convergence of a Douglas-Rachford type splitting algorithm for the infinite dimensional stochastic differential equation dX+A(t)(X)dt=X\,dW in (0,T);\ X(0)=x, where A(t):V V' is a nonlinear, monotone, coercive and demicontinuous operator with sublinear growth and V is a real Hilbert space with the dual V'. V is densely and continuously embedded in the Hilbert space H and W is an H-valued Wiener process. The general case of a maximal monotone operators A(t):H H is also investigated.