On the law of the iterated logarithm for permuted lacunary sequences

Abstract

It is known that for any smooth periodic function f the sequence (f(2kx))k 1 behaves like a sequence of i.i.d.\ random variables, for example, it satisfies the central limit theorem and the law of the iterated logarithm. Recently Fukuyama showed that permuting (f(2kx))k 1 can ruin the validity of the law of the iterated logarithm, a very surprising result. In this paper we present an optimal condition on (nk)k 1, formulated in terms of the number of solutions of certain Diophantine equations, which ensures the validity of the law of the iterated logarithm for any permutation of the sequence (f(nk x))k ≥ 1. A similar result is proved for the discrepancy of the sequence (\nk x\)k ≥ 1, where \ · \ denotes fractional part.