Andreas Arvanitoyeorgos, Nikolaos Panagiotis Souris, Marina Statha
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引用次数: 0
Abstract
Geodesic orbit manifolds (or g.o. manifolds) are those Riemannian manifolds
$(M,g)$ whose geodesics are integral curves of Killing vector fields.
Equivalently, there exists a Lie group $G$ of isometries of $(M,g)$ such that
any geodesic $\gamma$ has the simple form $\gamma(t)=e^{tX}\cdot p$, where $e$
denotes the exponential map on $G$. The classification of g.o. manifolds is a
longstanding problem in Riemannian geometry. In this brief survey, we present
some recent results and open questions on the subject focusing on the compact
case. In addition we study the geodesic orbit condition for the space
$\SU(5)/\s(\U(2)\times \U(2))$.