Parabolic Minimal Surfaces in M2×R

Abstract

Let M2 be a complete non compact orientable surface of non negative curvature. We prove in this paper some theorems involving parabolicity of minimal surfaces in M2×R. First, using a characterization of δ-parabolicity we prove that under additional conditions on M, an embedded minimal surface with bounded gaussian curvature is proper. The second theorem states that under some conditions on M, if is a properly immersed minimal surface with finite topology and one end in M×R, which is transverse to a slice M×\t\ except at a finite number of points, and such that (M×\t\) contains a finite number of components, then is parabolic. In the last result, we assume some conditions on M and prove that if a minimal surface in M×R has height controlled by a logarithmic function, then it is parabolic and has a finite number of ends.