The Gauss map of minimal surfaces in S2×R

Abstract

In this work, we consider the model of S2×R isometric to R3 \0\, endowed with a metric conformally equivalent to the Euclidean metric of R3, and we define a Gauss map for surfaces in this model likewise in the 3-Euclidean space. We show as a main result that any two minimal conformal immersions in S2×R with the same non-constant Gauss map differ by only two types of ambient isometries: either f=(id,T), where T is a translation on R, or f=(A,T), where A denotes the antipodal map on S2. Moreover, if the Gauss map is singular, we show that it is necessarily constant, and then only vertical cylinders over geodesics of S2 in S2×R appear with this assumption. We also study some particular cases, among them we prove that there is no minimal conformal immersion in S2×R which the Gauss map is a non-constant anti-holomorphic map.