On multiple ergodicity of affine cocycles over irrational rotations

Abstract

Let Tα denote the rotation Tαx=x+α (mod 1) by an irrational number α on the additive circle T=[0,1). Let β1,..., βd be d≥slant 1 parameters in [0, 1). One of the goals of this paper is to describe the ergodic properties of the cocycle (taking values in R(d+1)) generated over Tα by the vectorial function d+1(x):=(φ(x), φ(x+β1),..., φ(x+βd)), with φ(x)=x-1/2. It was already proved in LeMeNa03 that 2 is regular for α with bounded partial quotients. In the present paper we show that 2 is regular for any irrational α. For higher dimensions, we give sufficient conditions for regularity. While the case d=2 remains unsolved, for d=3 we provide examples of non-regular cocycles 4 for certain values of the parameters β1,β2,β3. We also show that the problem of regularity for the cocycle d+1 reduces to the regularity of the cocycles of the form d =(1[0, βj] - βj)j= 1, ..., d (taking values in Rd). Therefore, a large part of the paper is devoted to the classification problems of step functions with values in Rd.