The Abresch-Rosenberg Shape Operator and applications

Abstract

There exists a holomorphic quadratic differential defined on any H- surface immersed in the homogeneous space E(,τ) given by U. Abresch and H. Rosenberg, called the Abresch-Rosenberg differential. However, there were no Codazzi pair on such H-surface associated to the Abresch-Rosenberg differential when τ ≠ 0. The goal of this paper is to find a geometric Codazzi pair defined on any H-surface in E(,τ), when τ ≠ 0, whose (2,0)-part is the Abresch-Rosenberg differential. In particular, this allows us to compute a Simons' type formula for H-surfaces in E(,τ). We apply such Simons' type formula, first, to study the behavior of complete H-surfaces of finite Abresch-Rosenberg total curvature immersed in E(,τ). Second, we estimate the first eigenvalue of any Schr\"odinger operator L= + V, V continuous, defined on such surfaces. Finally, together with the Omori-Yau's Maximum Principle, we classify complete H-surfaces in E(,τ), τ ≠ 0, satisfying a lower bound on H depending on and τ.