Splitting, parallel gradient and Bakry-Emery Ricci curvature

Abstract

In this paper we obtain a splitting theorem for the symmetric diffusion operator φ=-<∇φ,∇ > and a non-constant C3 function f in a complete Riemannian manifold M, under the assumptions that the Ricci curvature associated with φ satisfies Ricφ(∇ f,∇ f) 0, that |∇ f| attains a maximum at M and that φ is non-decreasing along the orbits of ∇ f. The proof uses the general fact that a complete manifold M with a non-constant smooth function f with parallel gradient vector field must be a Riemannian product M=N× R, where N is any level set of f.