On the equidistribution of closed geodesics and geodesic nets
Abstract
We show that given a closed n-manifold M, for a generic set of Riemannian metrics g on M there exists a sequence of closed geodesics that are equidistributed in M if n=2; and an equidistributed sequence of embedded stationary geodesic nets if n=3. One of the main tools that we use is the Weyl Law for the volume spectrum for 1-cycles, proved by Liokumovich, Marques and Neves for n=2 and more recently by Guth and Liokumovich for n=3. We show that our proof of the equidistribution of geodesic nets can be generalized for any dimension n≥ 2 provided the Weyl Law for 1-cycles in n-manifolds holds.
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