Random dynamical systems for stochastic evolution equations driven by multiplicative fractional Brownian noise with Hurst parameters H∈ (1/3,1/2]

Abstract

We consider the stochastic evolution equation du=Audt+G(u)dω, u(0)=u0 in a separable Hilbert--space V. Here G is supposed to be three times Fr\'echet--differentiable and ω is a trace class fractional Brownian--motion with Hurst parameter H∈ (1/3,1/2]. We prove the existence of a global solution where exceptional sets are independent of the initial state u0∈ V. In addition, we show that the above equation generates a random dynamical system.