Liouville theorem for V-harmonic maps under non-negative (m, V)-Ricci curvature for non-positive m

Abstract

Let V be a C1-vector field on an n-dimensional complete Riemannian manifold (M, g). We prove a Liouville theorem for V-harmonic maps satisfying various growth conditions from complete Riemannian manifolds with non-negative (m, V)-Ricci curvature for m∈\,[\,-∞,\,0\,]\,\,[\,n,\,+∞\,] into Cartan-Hadam\-ard manifolds, which extends Cheng's Liouville theorem proved S.~Y.~Cheng for sublinear growth harmonic maps from complete Riemannian manifolds with non-negative Ricci curvature into Cartan-Hadamard manifolds. We also prove a Liouville theorem for V-harmonic maps from complete Riemannian manifolds with non-negative (m, V)-Ricci curvature for m∈\,[\,-∞,\,0\,]\,\,[\,n,\,+∞\,] into regular geodesic balls of Riemannian manifolds with positive upper sectional curvature bound, which extends the results of Hildebrandt-Jost-Wideman and Choi. Our probabilistic proof of Liouville theorem for several growth V-harmonic maps into Hadamard manifolds enhances an incomplete argument by Stafford. Our results extend the results due to Chen-Jost-QiuChenJostQiu and QiuQiu in the case of m=+∞ on the Liouville theorem for bounded V-harmonic maps from complete Riemannian manifolds with non-negative (∞, V)-Ricci curvature into regular geodesic balls of Riemannian manifolds with positive sectional curvature upper bound. Finally, we establish a connection between the Liouville property of V-harmonic maps and the recurrence property of V-diffusion processes on manifolds. Our results are new even in the case V=∇ f for f∈ C2(M).