Fractional heat content asymptotics for Carnot groups

Abstract

We propose a novel approach for studying small-time asymptotics of the fractional heat content of C2 non-characteristic domains in Carnot groups. Denoting the sub-Laplacian operator by L, the fractional heat content of a bounded domain is defined as Q(α)(t)=∫uα(x,t) dx, where uα is the solution to the heat equation corresponding to the fractional sub-Laplacian Lα:=Lα/2 with Dirichlet boundary condition on . We prove that for 1 α 2, there exists explicit rate function μα: (0,∞) (0,∞) such that align* t 0||-Q(α)(t)μα(t)=|∂ |H, align* where ||, |∂ |H are the volume and horizontal perimeter of respectively. Moreover, the rate function μα coincides with the same for the Euclidean case.