Gradient estimates and Liouville properties for the drifted Laplacian

Abstract

In this paper, we discuss the validity of the Liouville property for X-harmonic functions, i.e. positive solution to Xu=0, where X is a vector field on a complete, non-compact Riemannian manifold and X is the drifted Laplacian. In particular, we show that if the X-Bakry-\'Emery-Ricci curvature RicX is non-negative and the norm of X decays to zero at infinity, then the manifold has the Liouville property for the X-Laplacian. The proof exploits a local gradient estimate for positive solutions to the semilinear equation Xu+F(u)=0, which holds when F satisfies the structural conditions tF'(t)-F(t)α and F(t)β t, and the manifold has RicX-(n-1)K.

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