On δ-homogeneous Riemannian manifolds

Abstract

We study in this paper previously defined by V.N. Berestovskii and C.P. Plaut δ-homogeneous spaces in the case of Riemannian manifolds. Every such manifold has non-negative sectional curvature. The universal covering of any δ-homogeneous Riemannian manifolds is itself δ-homogeneous. In turn, every simply connected Riemannian δ-homogeneous manifold is a direct metric product of an Euclidean space and compact simply connected indecomposable homogeneous manifolds; all factors in this product are itself δ-homogeneous. We find different characterizations of δ-homogeneous Riemannian spaces, which imply that any such space is geodesic orbit (g.o.) and every normal homogeneous Riemannian manifold is δ-homogeneous. The g.o. property and the δ-homogeneity property are inherited by closed totally geodesic submanifolds. Then we find all possible candidates for compact simply connected indecomposable Riemannian δ-homogeneous non-normal manifolds of positive Euler characteristic and a priori inequalities for parameters of the corresponding family of Riemannian δ-homogeneous metrics on them (necessarily two-parametric). We prove that there are only two families of possible candidates: non-normal (generalized) flag manifolds SO(2l+1)/U(l) and Sp(l)/U(1)· Sp(l-1), l≥ 2, investigated earlier by W. Ziller, H. Tamaru, D.V. Alekseevsky and A. Arvanitoyeorgos. At the end we prove that the corresponding two-parametric family of Riemannian metrics on SO(5)/U(2)=Sp(2)/U(1)· Sp(1) satisfying the above mentioned (strict!) inequalities, really generates δ-homogeneous spaces, which are not normal and are not naturally reductive with respect to any isometry group.

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