Embedded cmc hypersurfaces on hyperbolic spaces
Abstract
In this paper we will prove that for every integer n>1, there exists a real number H0<-1 such that every H∈ (-∞,H0) can be realized as the mean curvature of a embedding of Hn-1× S1 in the (n+1)-dimensional spaces Hn+1. For n=2 we explicitly compute the value H0. For a general value n, we provide function n defined on (-∞,-1), which is easy to compute numerically, such that, if n(H)>-2π, then, H can be realized as the mean curvature of a embedding of Hn-1× S1 in the (n+1)-dimensional spaces Hn+1.
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