Stability of non-diagonal Einstein metrics on homogeneous spaces H× H/ K

Abstract

We consider the homogeneous space M=H× H/ K, where H/K is an irreducible symmetric space and K denotes diagonal embedding. Recently, Lauret and Will provided a complete classification of H× H-invariant Einstein metrics on M. They obtained that there is always at least one non-diagonal Einstein metric on M, and in some cases, diagonal Einstein metrics also exist. We give a formula for the scalar curvature of a subset of H× H-invariant metrics and study the stability of non-diagonal Einstein metrics on M with respect to the Hilbert action, obtaining that these metrics are unstable with different coindexes for all homogeneous spaces M.