Affiliation:
1. Shandong University, China
Abstract
In this paper, we introduce the fourth fundamental forms for hypersurfaces in Hn+1 and space-like hypersurfaces in S1n+1, and discuss the conformality of the normal Gauss map of the hypersurfaces in Hn+1 and S1n+1. Particularly, we discuss the surfaces with conformal normal Gauss map in H³ and S³1, and prove a duality property. We give a Weierstrass representation formula for space-like surfaces in S³1 with conformal normal Gauss map. We also state the similar results for time-like surfaces in S³1. Some examples of surfaces in S³1 with conformal normal Gauss map are given and a fully nonlinear equation of Monge-Ampère type for the graphs in S³1 with conformal normal Gauss map is derived.
Reference18 articles.
1. Kenmotsu type representation formula for space-like surfaces in the de Sitter 3-space;AIYAMA R;Tsukuba J Math,2000
2. A duality result between the minimal surface equation and the maximal surface quation;ALÍAS LJ;An Acad Bras Cienc,2001
3. Surfaces of mean curvature one in hyperbolic space;BRYANT RL;Astérisque,1987
4. The hyperbolic Gauss map and quasiconformal reflections;EPSTEIN CL;J Reine Angew Math,1986
5. The Gauss map and second fundamental form of surfaces in R³;GÁLVEZ JA;Geom Dedicata,2000
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献