New Einstein-Sasaki and Einstein Spaces from Kerr-de Sitter
Abstract
In this paper, which is an elaboration of our results in hep-th/0504225, we construct new Einstein-Sasaki spaces Lp,q,r1,...,rn-1 in all odd dimensions D=2n+1 5. They arise by taking certain BPS limits of the Euclideanised Kerr-de Sitter metrics. This yields local Einstein-Sasaki metrics of cohomogeneity n, with toric U(1)n+1 principal orbits, and n real non-trivial parameters. By studying the structure of the degenerate orbits we show that for appropriate choices of the parameters, characterised by the (n+1) coprime integers (p,q,r1,...,rn-1), the local metrics extend smoothly onto complete and non-singular compact Einstein-Sasaki manifolds Lp,q,r1,...,rn-1. We also construct new complete and non-singular compact Einstein spaces p,q,r1,...,rn in D=2n+1 that are not Sasakian, by choosing parameters appropriately in the Euclideanised Kerr-de Sitter metrics when no BPS limit is taken.
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