Harnack Inequalities on Manifolds with Boundary and Applications

Abstract

On a large class of Riemannian manifolds with boundary, some dimension-free Harnack inequalities for the Neumann semigroup is proved to be equivalent to the convexity of the boundary and a curvature condition. In particular, for pt(x,y) the Neumann heat kernel w.r.t. a volume type measure μ and for K a constant, the curvature condition - Z K together with the convexity of the boundary is equivalent to the heat kernel entropy inequality ∫M pt(x,z) pt(x,z)pt(y,z) μ( z) K(x,y)22(2Kt-1), t>0, x,y∈ M, where is the Riemannian distance. The main result is partly extended to manifolds with non-convex boundary and applied to derive the HWI inequality.