BMO estimates for stochastic singular integral operators and its application to PDEs with L\'evy noise

Abstract

In this paper, we consider the stochastic singular integral operators and obtain the BMO estimates. As an application, we consider the fractional Laplacian equation with additive noises dut(x)=α2ut(x)dt+Σk=1∞∫Rmgk(t,x)z Nk(dz,dt),\ \ \ u0=0,\ 0≤ t≤ T, where α2=-(-)α2, and ∫Rmz Nk(t,dz)=:Ytk are independent m-dimensional pure jump L\'evy processes with L\'evy measure of k. Following the idea of Kim, we obtain the q-th order BMO quasi-norm of the αq0-order derivative of u is controlled by the norm of g.