On the CLT for rotations and BV functions

Abstract

Let x x+ α be a rotation on the circle and let be a step function. We denote by \n (x) the corresponding ergodic sums Σ\j=0n-1 (x+j α). Under an assumption on α, for example when α has bounded partial quotients, and a Diophantine condition on the discontinuity points of , we show that \n/\|\n\|\2 is asymptotically Gaussian for n in a set of density 1. The method is based on decorrelation inequalities for the ergodic sums taken at times q\k, where the q\k's are the denominators of α.