Vertical Ends of Constant Mean Curvature H=1/2 in H2× R

Abstract

We prove a vertical halfspace theorem for surfaces with constant mean curvature H=1/2, properly immersed in the product space 2×, where 2 is the hyperbolic plane and is the set of real numbers. The proof is a geometric application of the classical maximum principle for second order elliptic PDE, using the family of non compact rotational H=1/2 surfaces in 2×.