Gradient estimates for weighted harmonic function with Dirichlet boundary condition
Abstract
We prove a Yau's type gradient estimate for positive f-harmonic functions with the Dirichlet boundary condition on smooth metric measure spaces with compact boundary when the infinite dimensional Bakry-Emery Ricci tensor and the weighted mean curvature are bounded below. As an application, we give a Liouville type result for bounded f-harmonic functions with the Dirichlet boundary condition. Our results do not depend on any assumption on the potential function f.
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