The influence of the maximal summand on ergodic sums of non-integrable observables over rotations

Abstract

For Rα being an irrational rotation of angle α on the one torus T and φ(x)=1x-11-x, we compare the behavior of the Birkhoff sum SN(φ)=Σk=0N-1(φ Rαk)(x) with the successive entry (φ RαN)(x). In particular, we are interested in the almost sure limsup behavior of (φ RαN)(x)SN(φ)(x). We show that depending on the Diophantine properties of α we have that the limsup either equals 0 or ∞. Moreover, we show that those α for which the limsup equals 0 form an atypical set in the sense that its Hausdorff dimension equals 12. These results have consequences in studying a reparametrization (Tt) of the linear flow (Lt) with direction (1,α) on the two torus T2 with function , where is a smooth non-negative function that has exactly two (non-degenerate) zeros at p and q. We prove that for a full measure set (α, p, q)∈ T× T2× T2 the special flow (Tt) exhibits extreme historic behavior proving a conjecture given by Andersson and Guih\'eneuf.