Geodesic orbit metrics in a class of homogeneous bundles over real and complex Stiefel manifolds

Abstract

Geodesic orbit spaces (or g.o. spaces) are defined as those homogeneous Riemannian spaces (M=G/H,g) whose geodesics are orbits of one-parameter subgroups of G. The corresponding metric g is called a geodesic orbit metric. We study the geodesic orbit spaces of the form (G/H,g), such that G is one of the compact classical Lie groups (n), U(n), and H is a diagonally embedded product H1× ·s × Hs, where Hj is of the same type as G. This class includes spheres, Stiefel manifolds, Grassmann manifolds and real flag manifolds. The present work is a contribution to the study of g.o. spaces (G/H,g) with H semisimple.