New Laplacian comparison theorem and its applications to diffusion processes on Riemannian manifolds

Abstract

Let L=-∇φ· ∇ be a symmetric diffusion operator with an invariant measure μ( d x)=e-φ(x) m( d x) on a complete non-compact smooth Riemannian manifold (M,g) with its volume element m= volg, and φ∈ C2(M) a potential function. In this paper, we prove a Laplacian comparison theorem on weighted complete Riemannian manifolds with CD(K, m)-condition for m≤ 1 and a continuous function K. As consequences, we give the optimal conditions on m-Bakry-\'Emery Ricci tensor for m≤1 such that the (weighted) Myers' theorem, Bishop-Gromov volume comparison theorem, Ambrose-Myers' theorem, and the Cheeger-Gromoll type splitting theorem, stochastic completeness and Feller property of L-diffusion processes hold on weighted complete Riemannian manifolds. Some of these results were well-studied for m-Bakry-\'Emery Ricci curvature for m≥ n (\!\!Lot,Qian,XDLi05, WeiWylie) or m=1 (\!\!Wylie:WarpedSplitting, WylieYeroshkin). When m<1, our results are new in the literature.