Equigeodesic vectors for homogeneous Riemannian submersions

Abstract

We study π-equigeodesic vectors associated with homogeneous fibrations, namely vectors that are geodesic with respect to every homogeneous metric making the projection a Riemannian submersion. We obtain an algebraic criterion characterizing such vectors and apply it to classical flag manifolds and Ledger-Obata spaces. As a framework for this study, given Lie groups K⊂eq H⊂eq G with H and K closed in G, and a fixed G-invariant metric gb on G/H, we describe the family of G-invariant metrics g on G/K for which the natural projection π:(G/K,g)(G/H,gb) is a Riemannian submersion. We also give a criterion for the fibers of π to be totally geodesic.

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