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Invariant Einstein Metrics on Some Homogeneous Spaces of Classical Lie Groups

Published online by Cambridge University Press:  20 November 2018

Andreas Arvanitoyeorgos
Affiliation:
University of Patras, Department of Mathematics, GR-26500 Rion, Greece email: arvanito@math.upatras.gr
V. V. Dzhepko
Affiliation:
Rubtsovsk Industrial Institute, ul. Traktornaya, 2/6, Rubtsovsk, 658207, Russia email: J Valera V@mail.runik@inst.rubtsovsk.ru
Yu. G. Nikonorov
Affiliation:
Rubtsovsk Industrial Institute, ul. Traktornaya, 2/6, Rubtsovsk, 658207, Russia email: J Valera V@mail.runik@inst.rubtsovsk.ru
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Abstract

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A Riemannian manifold $\left( M,\,\rho \right)$ is called Einstein if the metric $\rho $ satisfies the condition $\text{Ric}\left( \rho \right)\,=\,c\,\cdot \,\rho $ for some constant $c$. This paper is devoted to the investigation of $G$-invariant Einstein metrics, with additional symmetries, on some homogeneous spaces $G/H$ of classical groups. As a consequence, we obtain new invariant Einstein metrics on some Stiefel manifolds $SO\left( n \right)/SO\left( l \right)$. Furthermore, we show that for any positive integer $p$ there exists a Stiefel manifold $SO\left( n \right)/SO\left( l \right)$ that admits at least $p$$SO\left( n \right)$-invariant Einstein metrics.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 2009

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