Large entropy implies existence of a maximal entropy measure for interval maps

Abstract

We give a new type of sufficient condition for the existence of measures with maximal entropy for an interval map f, using some non-uniform hyperbolicity to compensate for a lack of smoothness of f. More precisely, if the topological entropy of a C1 interval map is greater than the sum of the local entropy and the entropy of the critical points, then there exists at least one measure with maximal entropy. As a corollary, we obtain that any Cr interval map f such that h top(f)>2\|f'\|∞/r possesses measures with maximal entropy.