Constant mean curvature foliations of globally hyperbolic spacetimes locally modelled on $AdS_3$
arXiv:math/0412111
Abstract
We prove that any maximal globally hyperbolic spacetime locally modelled on the anti-de Sitter space of dimension 3, and admitting a closed Cauchy surface, admits a time function $Ï$, such that every fiber $Ï^{-1}(t)$ is a spacelike surface with constant mean curvature $t$.