Homogeneous Einstein metrics on non-K\"ahler C-spaces

Abstract

We study homogeneous Einstein metrics on indecomposable non-K\"ahlerian C-spaces, i.e. even-dimensional torus bundles M=G/H with rank G>rank H over flag manifolds F=G/K of a compact simple Lie group G. Based on the theory of painted Dynkin diagrams we present the classification of such spaces. Next we focus on the family \[ M, m, n:=SU(+m+n)/SU()×SU(m)×SU(n)\,, , m, n∈Z+ \] and examine several of its geometric properties. We show that invariant metrics on M, m, n are not diagonal and beyond certain exceptions their parametrization depends on six real parameters. By using such an invariant Riemannian metric, we compute the diagonal and the non-diagonal part of the Ricci tensor and present explicitly the algebraic system of the homogeneous Einstein equation. For general positive integers , m, n, by applying mapping degree theory we provide the existence of at least one SU(+m+n)-invariant Einstein metric on M, m, n. For =m we show the existence of two SU(2m+n) invariant Einstein metrics on Mm, m, n, and for =m=n we obtain four SU(3n)-invariant Einstein metrics on Mn, n, n. We also examine the isometry problem for these metrics, while for a plethora of cases induced by fixed , m, n, we provide the numerical form of all non-isometric invariant Einstein metrics.