Morse estimates for translated points on unit tangent bundles
Abstract
In this article, we study conjectures of Sandon on the minimal number of translated points in the special case of the unit tangent bundle of a Riemannian manifold. We restrict ourselves to contactomorphisms of SM that lift diffeomorphisms of M homotopic to identity. We prove that there exist sequences (pn,tn) where pn is a translated point of time-shift tn with tn+∞ for a large class of manifolds. We also prove Morse estimates on the number of translated points in the case of Zoll Riemannian manifolds.
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