Gradient and Transport Estimates for Heat Flow on Nonconvex Domains

Abstract

For the Neumann heat flow on nonconvex Riemannian domains D⊂ M, we provide sharp gradient estimates and transport estimates with a novel t-dependence, for instance, Lip( PDtf) e2S \, t/π+O(t)· Lip (f), and we provide an equivalent characterization of the lower bound S on the second fundamental form of the boundary in terms of these quantitative estimates.

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