Einstein nilpotent Lie groups
Abstract
We study the Ricci tensor of left-invariant pseudoriemannian metrics on Lie groups. For an appropriate class of Lie groups that contains nilpotent Lie groups, we introduce a variety with a natural action, whose orbits parametrize Lie groups with a left-invariant metric; we show that the Ricci operator can be identified with the moment map relative to a natural symplectic structure. From this description we deduce that the Ricci operator is the derivative of the scalar curvature under gauge transformations of the metric, and show that Lie algebra derivations with nonzero trace obstruct the existence of Einstein metrics with . Using the notion of nice Lie algebra, we give the first example of a left-invariant Einstein metric with on a nilpotent Lie group. We show that nilpotent Lie groups of dimension do not admit such a metric, and a similar result holds in dimension with the extra assumption that the Lie algebra is nice.
Keywords
Cite
@article{arxiv.1707.04454,
title = {Einstein nilpotent Lie groups},
author = {Diego Conti and Federico A. Rossi},
journal= {arXiv preprint arXiv:1707.04454},
year = {2018}
}
Comments
24 pages; v2, improved criterion for nonexistence added (Theorem 4.1), proofs simplified and contents reorganized accordingly, two references added; v3, corrected a constant in Theorem 3.8 and Corollary 3.10, minor correction in the proofs, added examples of Einstein metrics in any indefinite signature, presentation improved, three references added. To appear in J. Pure Appl. Algebra