Statistical Stability for Barge-Martin attractors derived from tent maps

Abstract

Let \ft\t∈(1,2] be the family of core tent maps of slopes t. The parameterized Barge-Martin construction yields a family of disk homeomorphisms t D2 D2, having transitive global attractors t on which t is topologically conjugate to the natural extension of ft. The unique family of absolutely continuous invariant measures for ft induces a family of ergodic t-invariant measures t, supported on the attractors t. We show that this family t varies weakly continuously, and that the measures t are physical with respect to a weakly continuously varying family of background Oxtoby-Ulam measures t. Similar results are obtained for the family t S2 S2 of transitive sphere homeomorphisms, constructed in [17] as factors of the natural extensions of ft.