We show that every circle in a compact Riemannian symmetic space of rank one is obtained as an orbit of a one parameter subgroup of isometries. We also show that a homogeneous space with the above property is either a Euclidean space or a Riemannian globally symmetric space of rank one.
References (8)
Related articles (0)
Figures (0)
Content from these authors
Supplementary material (0)
Result List ()
Cited by
This article cannot obtain the latest cited-by information.
