A Sobolev space theory for the time-fractional stochastic partial differential equations driven by Levy processes

Abstract

We present an Lp-theory (p≥ 2) for time-fractional stochastic partial differential equations driven by L\'evy processes of the type ∂αtu=Σi,j=1d aijuxixj +f+Σk=1∞∂βt∫0t (Σi=1dμik uxi +gk) dZks given with nonzero intial data. Here ∂αt and ∂βt are the Caputo fractional derivatives, α∈ (0,2), β∈ (0,α+1/p), and \Zkt:k=1,2,·s\ is a sequence of independent L\'evy processes. The coefficients are random functions depending on (t,x). We prove the uniqueness and existence results in Sobolev spaces, and obtain the maximal regularity of the solution.