We relate the existence of many infinite geodesics on Alexandrov spaces to a
statement about the average growth of volumes of balls. We deduce that the
geodesic flow exists and preserves the Liouville measure in several important
cases. The developed analytic tool has close ties to integral geometry

Kapovitch, Vitali

Lytchak, Alexander

Petrunin, Anton

English

arXiv

We relate the existence of many infinite geodesics on Alexandrov spaces to a statement about the average growth of volumes of balls. We deduce that the geodesic flow exists and preserves the Liouville measure in several important cases. The analytic tools we develop have close ties to integral geometry

Metric-measure boundary and geodesic flow on Alexandrov spaces

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