Half-space theorems for 1-surfaces of H3

Abstract

In this paper we investigate the intersection problem for 1-surfaces immersed in a complete Riemannian three-manifold P with Ricci curvature bounded from below by -2. We first prove a Frankel's type theorem for 1-surfaces with bounded curvature immersed in P when RicP > -2. In this setting we also give a criterion for deciding whether a complete 1-surface is proper. A splitting result is established when the distance between the 1-surfaces is realized, even if RicP ≥ -2. In the hyperbolic space H3 we show strong half-space theorems for the classes of complete 1-surfaces with bounded curvature, parabolic 1-surfaces, and stochastically complete H-surfaces with H<1. As a by-product of our techniques a Maximum Principle at Infinity is given for 1-surfaces in H3.