On doubly periodic minimal surfaces in H2 × R with finite total curvature in the quotient space

Abstract

In this paper we develop the theory of properly immersed minimal surfaces in the quotient space H2× R/G, where G is a subgroup of isometries generated by a vertical translation and a horizontal isometry in H2 without fixed points. The horizontal isometry can be either a parabolic translation along horocycles in H2 or a hyperbolic translation along a geodesic in H2. In fact, we prove that if a properly immersed minimal surface in H2× R/G has finite total curvature then its total curvature is a multiple of 2π, and moreover, we understand the geometry of the ends. These theorems hold true more generally for properly immersed minimal surfaces in M× S1, where M is a hyperbolic surface with finite topology whose ends are isometric to one of the ends of the above spaces H2× R/G.