Constant periodic data and rigidity

Abstract

In this work we lead with expanding maps of the circle and Anosov diffeomorphisms on Td, d ≥ 2. We prove that, for these maps, constant periodic data imply same periodic data of these maps and their linearizations, so in particular we have smooth conjugacy. For expanding maps of the circle and Anosov diffeomorphism on Td, d= 2, 3, we have global rigidity. In higher dimensions, d ≥ 4, we can establish a result of local rigidity, in several cases. The main tools of this work are celebrated results of rigidity involving same periodic data with linearization and results involving topological entropy of a diffeomorphism along an expanding invariant foliation.