arXiv:1503.07079 Abstract | arXiv Analytics

arXiv:1503.07079 [math.DG]Abstract References Reviews Resources

The Alekseevskii conjecture in low dimensions

Published 2015-03-24Version 1

The long-standing Alekseevskii conjecture states that a connected homogeneous Einstein space G/K of negative scalar curvature must be diffeomorphic to R^n. This was known to be true only in dimensions up to 5, and in dimension 6 for non-semisimple G. In this work we prove that this is also the case in dimensions up to 10 when G is not semisimple. For arbitrary G, besides 5 possible exceptions, we show that the conjecture holds up to dimension 8.

Comments: 19 pages, 1 table

Categories: math.DG

Subjects: 53C25, 53C30

Keywords: low dimensions, connected homogeneous einstein space g/k, long-standing alekseevskii conjecture states, conjecture holds, negative scalar curvature

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arXiv:1503.07079 [math.DG]Abstract References Reviews Resources

The Alekseevskii conjecture in low dimensions

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The Alekseevskii conjecture in low dimensions

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arXiv:1503.07079 [math.DG]Abstract References Reviews Resources