Circles in Riemannian symmetric spaces
1999 Volume 22 Issue 1 Pages 1-14
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1999 Volume 22 Issue 1 Pages 1-14
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.
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