Uniform Gaussian bounds for subelliptic heat kernels and an application to the total variation flow of graphs over Carnot groups

Abstract

In this paper we study heat kernels associated to a Carnot group G, endowed with a family of collapsing left-invariant Riemannian metrics σ which converge in the Gromov-Hausdorff sense to a sub-Riemannian structure on G as 0. The main new contribution are Gaussian-type bounds on the heat kernel for the σ metrics which are stable as 0 and extend the previous time-independent estimates in CiMa-F. As an application we study well posedness of the total variation flow of graph surfaces over a bounded domain in (G,). We establish interior and boundary gradient estimates, and develop a Schauder theory which are stable as 0. As a consequence we obtain long time existence of smooth solutions of the sub-Riemannian flow (=0), which in turn yield sub-Riemannian minimal surfaces as t ∞.