Spatial asymptotics and strong comparison principle for some fractional stochastic heat equations

Abstract

Consider the following stochastic heat equation, align* ∂ ut(x)∂ t=-(-)α/2 ut(x)+σ(ut(x))F(t,\,x), t>0, \; x ∈ Rd. align* Here -(-)α/2 is the fractional Laplacian with >0 and α ∈ (0,2], σ: R→ R is a globally Lipschitz function, and F(t,\,x) is a Gaussian noise which is white in time and colored in space. Under some suitable additional conditions, we prove a strong comparison theorem and explore the effect of the initial data on the spatial asymptotic properties of the solution. This constitutes an important extension over a series of recent works.