English

Geodesics in generalized Wallach spaces

Differential Geometry 2015-11-26 v1

Abstract

We study geodesics in generalized Wallach spaces which are expressed as orbits of products of three exponential terms. These are homogeneous spaces M=G/KM=G/K whose isotropy representation decomposes into a direct sum of three submodules m=m1m2m3\frak{m}=\frak{m}_1\oplus\frak{m}_2\oplus\frak{m}_3, satisfying the relations [mi,mi]k[\frak{m}_i,\frak{m}_i]\subset \frak{k}. Assuming that the submodules mi\frak{m}_i are pairwise non isomorphic, we study geodesics on such spaces of the form γ(t)=exp(tX)exp(tY)exp(tZ)o\gamma (t)=\exp (tX)\exp (tY)\exp (tZ)\cdot o, where X\frm1,Y\frm2,Z\frm3X\in\fr{m}_1, Y\in\fr{m}_2, Z\in\fr{m}_3 (o=eKo=eK), with respect to a GG-invariant metric. Our investigation imposes certain restrictions on the GG-invariant metric, so the geodesics turn out to be orbits of two exponential terms. We give a point of view using Riemannian submersions. As an application, we describe geodesics in generalized flag manifolds with three isotropy summands and with second Betti number b2(M)=2b_2(M)=2, and in the Stiefel manifolds SO(n+2)/S(n)SO(n+2)/S(n). We relate our results to geodesic orbit spaces (g.o. spaces).

Keywords

Cite

@article{arxiv.1503.04279,
  title  = {Geodesics in generalized Wallach spaces},
  author = {Andreas Arvanitoyeorgos and Nikolaos Panagiotis Souris},
  journal= {arXiv preprint arXiv:1503.04279},
  year   = {2015}
}

Comments

Journal of Geometry (2015)

R2 v1 2026-06-22T08:52:56.473Z