Flexibility of measure-theoretic entropy of boundary maps associated to Fuchsian groups

Abstract

Given a closed, oriented, compact surface S of constant negative curvature and genus g 2, we study the measure-theoretic entropy of the Bowen-Series boundary map with respect to its smooth invariant measure. We obtain an explicit formula for the entropy that only depends on the perimeter of the (8g-4)-sided fundamental polygon of the surface S and its genus. Using this, we analyze how the entropy changes in the Teichm\"uller space of S and prove the following flexibility result: the measure-theoretic entropy takes all values between 0 and a maximum that is achieved on the surface that admits a regular (8g-4)-sided fundamental polygon. We also compare the measure-theoretic entropy to the topological entropy of these maps and show that the smooth invariant measure is not the measure of maximal entropy.