Ergodic maximization problem for expanding maps with differentiable observables

Abstract

We show that for an expanding map, the maximizing measures of a generic (open and dense) Cr (r∈N) differentiable functions are supported on a single periodic orbit. [There is a gap in the discussions. For the C∞ approximation of the Lipschitz functions, we can only control the C1 derivative, but we can not control the Cr derivatives for r≥2. Elegant approximation methods might be needed to solve this problem.]