On the support of measures of large entropy for polynomial-like maps

Abstract

Let f be a polynomial-like map with dominant topological degree dt≥ 2 and let dk-1<dt be its dynamical degree of order k-1. We show that the support of every ergodic measure whose measure-theoretic entropy is strictly larger than dk-1 dt is supported on the Julia set, i.e., the support of the unique measure of maximal entropy μ. The proof is based on the exponential speed of convergence of the measures dt-n(fn)*δa towards μ, which is valid for a generic point a and with a controlled error bound depending on a. Our proof also gives a new proof of the same statement in the setting of endomorphisms of Pk( C) - a result due to de Th\'elin and Dinh - which does not rely on the existence of a Green current.