The continuum parabolic Anderson model with a half-Laplacian and periodic noise

Abstract

We construct solutions of a renormalized continuum fractional parabolic Anderson model, formally given by ∂t u=-(-)1/2u+ u, where is a periodic spatial white noise. To be precise, we construct limits as 0 to solutions of ∂t u=-(-)1/2u+(-C)u, where is a mollification of at scale and C is a logarithmically diverging renormalization constant. We use a simple renormalization scheme based on that of Hairer and Labb\'e, "A simple construction of the continuum parabolic Anderson model on R2."