Intermittency fronts for space-time fractional stochastic partial differential equations in (d+1) dimensions

Abstract

We consider time fractional stochastic heat type equation ∂βtut(x)=-(-)α/2 ut(x)+I1-βt[σ(u)·W(t,x)] in (d+1) dimensions, where >0, β∈ (0,1), α∈ (0,2], d<\2,β-1\, ∂βt is the Caputo fractional derivative, -(-)α/2 is the generator of an isotropic stable process, ·W(t,x) is space-time white noise, and σ: R is Lipschitz continuous. Mijena and Nane proved in JebesaAndNane1 that : (i) absolute moments of the solutions of this equation grows exponentially; and (ii) the distances to the origin of the farthest high peaks of those moments grow exactly linearly with time. The last result was proved under the assumptions α=2 and d=1. In this paper we extend this result to the case α=2 and d∈\1,2,3\.