On the discrepancy of random subsequences of \nα\ II

Abstract

Let α be an irrational number, let X1, X2, … be independent, identically distributed, integer-valued random variables, and put Sk=Σj=1k Xj. Assuming that X1 has finite variance or heavy tails P (|X1|>t) ct-β, 0<β<2, in Part I of this paper we proved that, up to logarithmic factors, the order of magnitude of the discrepancy DN (Sk α) of the first N terms of the sequence \Sk α\ is O(N-τ), where τ= (1/(β γ), 1/2) (with β=2 in the case of finite variances) and γ is the strong Diophantine type of α. This shows a change of behavior of the discrepancy at βγ=2. In this paper we determine the exact order of magnitude of DN (Sk α) for βγ<1, and determine the limit distribution of N-1/2 DN (Sk α). We also prove a functional version of these results describing the asymptotic behavior of a wide class of functionals of the sequence \Sk α\. Finally, we extend our results to the discrepancy of \Sk\ for general random walks Sk without arithmetic conditions on X1, assuming only a mild polynomial rate on the weak convergence of \Sk\ to the uniform distribution.