Heat kernel on smooth metric measure spaces and applications

Abstract

We derive a Harnack inequality for positive solutions of the f-heat equation and Gaussian upper and lower bounds for the f-heat kernel on complete smooth metric measure spaces (M, g, e-fdv) with Bakry-\'Emery Ricci curvature bounded below. The lower bound is sharp. The main argument is the De Giorgi-Nash-Moser theory. As applications, we prove an L1f-Liouville theorem for f-subharmonic functions and an L1f-uniqueness theorem for f-heat equations when f has at most linear growth. We also obtain eigenvalues estimates and f-Green's function estimates for the f-Laplace operator.