Real entropy rigidity under quasi-conformal deformations

Abstract

We set up a real entropy function hR on the space M'd of M\"obius conjugacy classes of real rational maps of degree d by assigning to each class the real entropy of a representative f∈R(z); namely, the topological entropy of its restriction fR to the real circle. We prove a rigidity result stating that hR is locally constant on the subspace determined by real maps quasi-conformally conjugate to f. As examples of this result, we analyze real analytic stable families of hyperbolic and flexible Latt\`es maps with real coefficients along with numerous families of degree d real maps of real entropy (d). The latter discussion moreover entails a complete classification of maps of maximal real entropy.