Mild Solution of Semilinear Rough Stochastic Evolution Equations

Abstract

In this paper, we investigate a semilinear stochastic parabolic equation with a linear rough term dut=[Ltut+f(t, ut)]dt+(Gtut+gt)dXt+h(t, ut)dWt, where (Lt)t ∈ [0, T] is a family of unbounded operators acting on a monotone family of interpolation Hilbert spaces, X is a two-step α-H\"older rough path with α ∈ (1/3, 1/2] and W is a Brownian motion. Existence and uniqueness of the mild solution are given through the stochastic controlled rough path approach and fixed-point argument. As a technical tool to define rough stochastic convolutions, we also develop a general mild stochastic sewing lemma, which is applicable for processes according to a monotone family.