Some measure rigidity and equidistribution results for β-maps

Abstract

We prove × a × b measure rigidity for multiplicatively independent pairs when a∈N and b>1 is a ``specified'' real number (the b-expansion of 1 has a tail or bounded runs of 0's) under a positive entropy condition. This is done by proving a mean decay of the Fourier series of the point masses average along × b orbits. We also prove a quantitative version of this decay under stronger conditions on the × a invariant measure. The quantitative version together with the × b invariance of the limit measure is a step toward a general Host-type pointwise equidistribution theorem in which the equidistribution is for Parry measure instead of Lebesgue. We show that finite memory length measures on the a-shift meet the mentioned conditions for mean convergence. Our main proof relies on techniques of Hochman.