Persistent Non-Statistical Dynamics in One-Dimensional Maps

Abstract

We study a class F of one-dimensional full branch maps introduced in [Doubly Intermittent Full Branch Maps with Critical Points and Singularities; D. Coates, S. Luzzatto, M. Mubarak, 2022], admitting two indifferent fixed points as well as critical points and/or singularities with unbounded derivative. We show that F can be partitioned into 3 pairwise disjoint subfamilies F = F F F* such that all g ∈ F have a unique physical measure equivalent to Lebesgue, all g ∈ F have a physical measure which is a Dirac-δ measure on one of the (repelling) fixed points, and all g ∈ F* are non-statistical and in particular have no physical measure. Moreover we show that these subfamilies are intermingled: they can all be approximated by maps in the other subfamilies in natural topologies.