Singular SPDEs on Homogeneous Lie Groups

Abstract

The aim of this article is to extend the scope of the theory of regularity structures in order to deal with a large class of singular SPDEs of the form ∂t u = L u+ F(u, )\ , where the differential operator L fails to be elliptic. This is achieved by interpreting the base space Rd as a non-trivial homogeneous Lie group G such that the differential operator ∂t -L becomes a translation invariant hypoelliptic operator on G. Prime examples are the kinetic Fokker-Planck operator ∂t -v - v· ∇x and heat-type operators associated to sub-Laplacians. As an application of the developed framework, we solve a class of parabolic Anderson type equations ∂t u = Σi X2i u + u (-c) on the compact quotient of an arbitrary Carnot group.