Exact lambdavacuum solutions in higher dimensions
Abstract
In this work, we obtain exact solutions to the (n+2)-dimensional Einstein Field Equations with a non-zero cosmological constant for n > 1. These solutions depend on a set \ Aa, a=1,2,… , m \ of pairwise commuting constant matrices in sl ( n, R ) and on a constant matrix g0 in I (\ Aa, a=1,… , m \), determined in previous work. Different choices of \ Aa, a=1,… , m \ and g0 correspond to different solutions. As examples, we show how to obtain the de Sitter metric, the Anti-de Sitter metric, the Birmingham metric, the Nariai metric and the Anti-Nariai metric in higher dimensions. The generalized Nariai and Anti-Nariai solutions are direct topological products of AdSn2 + 1 × Hn2 + 1, dSn2 + 1 × Sn2 + 1, AdS2 × Hn, AdSn × H2, dS2 × Sn and dSn × S2. In addition, we study a solution in the context of cosmology.
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