Temporal asymptotics for fractional parabolic Anderson model

Abstract

In this paper, we consider fractional parabolic equation of the form ∂ u∂ t=-(-)α2u+u W(t,x), where -(-)α2 with α∈(0,2] is a fractional Laplacian and W is a Gaussian noise colored in space and time. The precise moment Lyapunov exponents for the Stratonovich solution and the Skorohod solution are obtained by using a variational inequality and a Feynman-Kac type large deviation result for space-time Hamiltonians driven by α-stable process. As a byproduct, we obtain the critical values for θ and η such that E(θ(∫01 ∫01 |r-s|-β0γ(Xr-Xs)drds)η) is finite, where X is d-dimensional symmetric α-stable process and γ(x) is |x|-β or Πj=1d|xj|-βj.