On a fractional stochastic heat equation arising from the disordered pinning model

Abstract

We study the mild Skorohod solution to the following fractional stochastic heat equation on R: equation cases ∂t u(t,x)=-(-)/2 u(t,x) +β u(t,x)δ0(x)(t),\\ u(0,·)=u0(x), cases equation where -(-)/2 with ∈(0,2] is the fractional Laplacian and is a Gaussian noise with covariance E[(t) (s)]=|t-s|2H-2 for H∈(12, 1]. This equation with ∈(1,2] arises naturally in the study of the disordered pinning model. We show that the equation admits a local L2-solution when = 2, whereas, for ∈ (0,2), any solution--if it exists uniquely--cannot be Lp-integrable for any p > 1. Moreover, inspired by the recent work of Quastel, Ramirez and Vir\'ag, we prove that the equation has a unique global L1-solution whenever 1+1<2H. We also establish the strict positivity of the solution. Our work partially fills the gap in the study of the Weinrib-Halperin prediction.

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