On the prevalence of the periodicity of maximizing measures

Abstract

For a continuous map T: X→ X on a compact metric space (X,d), we say that a function f: X → R has the property PT if its time averages along forward orbits of T are maximized at a periodic orbit. In this paper, we prove that for the one-side full shift of two symbols, the property PT is prevalent (in the sense of Hunt--Sauer--Yorke) in spaces of Lipschitz functions with respect to metrics with mildly fast decaying rate on the diameters of cylinder sets. This result is a strengthening of [Theorem~A]BZ16, confirms the prediction mentioned in the ICM proceeding contribution of J. Bochi ([Seciton 1]Boc18) suggested by experimental evidence, and is another step towards the Hunt--Ott conjectures in the area of ergodic optimization.