Periodic geodesics in singular spaces
Abstract
We extend the classical result of Lyusternik and Fet on the existence of closed geodesics to singular spaces. We show that if X is a compact geodesic metric space satisfying the CAT( ) condition for some fixed >0 and πn(X) 0 for some n>0 then X has a periodic geodesic. This condition is satisfied for example by locally CAT( ) manifolds. Our result applies more generally to compact locally uniquely geodesic spaces.
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