Nonlinear stochastic time-fractional slow and fast diffusion equations on Rd

Abstract

This paper studies the nonlinear stochastic partial differential equation of fractional orders both in space and time variables: \[ (∂β+2(-)α/2)u(t,x) = Itγ[(u(t,x))W(t,x)], t>0,\: x∈Rd, \] where W is the space-time white noise, α∈(0,2], β∈(0,2), γ 0 and >0. Fundamental solutions and their properties, in particular the nonnegativity, are derived. The existence and uniqueness of solution together with the moment bounds of the solution are obtained under Dalang's condition: d<2α+αβ(2γ-1,0). In some cases, the initial data can be measures. When β∈ (0,1], we prove the sample path regularity of the solution.