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Unique equilibrium states for geodesic flows in nonpositive curvature
Volume: 28, Issue: 5, Pages: 1209 - 1259
Published: Aug 24, 2018
Abstract
We study geodesic flows over compact rank 1 manifolds and prove that sufficiently regular potential functions have unique equilibrium states if the singular set does not carry full pressure. In dimension 2, this proves uniqueness for scalar multiples of the geometric potential on the interval ${(-\infty,1)} , which is optimal. In higher dimensions, we obtain the same result on a neighborhood of 0, and give examples where uniqueness holds on...
Paper Details
Title
Unique equilibrium states for geodesic flows in nonpositive curvature
Published Date
Aug 24, 2018
Volume
28
Issue
5
Pages
1209 - 1259
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