Torus diffeomorphisms with parabolic and non-proper actions on the fine curve graph and their generalized rotation sets
Abstract
We prove that a generic element of the Anosov-Katok class of the torus, O∞(T2), acts parabolically and non-properly on the fine curve graph C(T2). Additionally, we show that a generic element of O∞(T2) admits generalized rotation sets of any point-symmetric compact convex homothety type in the plane.
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