Complete Constant Mean Curvature surfaces and Bernstein type Theorems in M2× R

Abstract

In this paper we study constant mean curvature surfaces in a product space, M2× R, where M2 is a complete Riemannian manifold. We assume the angle function = N∂t does not change sign on . We classify these surfaces according to the infimum c() of the Gaussian curvature of the projection of . When H ≠ 0 and c()≥ 0, then is a cylinder over a complete curve with curvature 2H. If H=0 and c() ≥ 0, then must be a vertical plane or is a slice M2 × t, or M2 R2 with the flat metric and is a tilted plane (after possibly passing to a covering space). When c()<0 and H>-c() /2, then is a vertical cylinder over a complete curve of M2 of constant geodesic curvature 2H. This result is optimal. We also prove a non-existence result concerning complete multi-graphs in M2× R, when c(M2)<0.