Uniqueness of the de Sitter spacetime among static vacua with positive cosmological constant
arXiv:1502.04090 · doi:10.1007/s10455-014-9441-1
Abstract
We prove that, among all (n + 1)-dimensional spin static vacua with positive cosmological constant, the de Sitter spacetime is characterized by the fact that its spatial Killing hori-zons have minimal modes for the Dirac operator. As a consequence, the de Sitter spacetime is the only vacuum of this type for which the induced metric tensor on some of its Killing horizons is at least equal to that of a round (n -- 1)-sphere. This extends unique-ness theorems shown by Boucher-Gibbons-Horowitz and Chruciel to more general horizon metrics and to the non-single horizon case.
in Annals of Global Analysis and Geometry, Springer Verlag (Germany), 2014