On the asymptotic Plateau problem for CMC hypersurfaces in hyperbolic space

Abstract

Let R+n+1 \ be the half-space model of the hyperbolic space Hn+1. It is proved that if ⊂\ xn+1=0\ ⊂∂∞Hn+1 is a bounded C0 Euclidean graph over \ x1=0, xn+1=0\ then, given H <1, there is a complete, properly embedded, CMC H hypersurface of Hn+1 such that ∂∞ S=\ xn+1=+∞\ . This result can be seen as a limit case of the existence theorem proved by B. Guan and J. Spruck in GS on CMC H <1 radial graphs with prescribed C0 asymptotic boundary data.