Mild Solution of Semilinear SPDEs with Young Drifts

Abstract

In this paper, we study a semilinear SPDE with a linear Young drift dut=Lutdt+f(t, ut)dt+(Gtut+gt)dηt+h(t, ut)dWt, where L is the generator of an analytical semigroup, η is an α-H\"older continuous path with α ∈ (1/2, 1) and W is a Brownian motion. After establishing through two different approaches the Young convolution integrals for stochastic integrands, we introduce the corresponding definition of mild solutions and continuous mild solutions, and give via a fixed-point argument the existence and uniqueness of the (continuous) mild solution under suitable conditions.