On the law of the iterated logarithm for trigonometric series with bounded gaps II

Abstract

It is well-known that for a quickly increasing sequence (nk)k ≥ 1 the functions ( 2 π nk x)k ≥ 1 show a behavior which is typical for sequences of independent random variables. If the growth condition on (nk)k ≥ 1 is relaxed then this almost-independent behavior generally fails. Still, probabilistic constructions show that for some very slowly increasing sequences (nk)k ≥ 1 this almost-independence property is preserved. For example, there exists (nk)k ≥ 1 having bounded gaps such that the normalized sums Σ 2 π nk x satisfy the central limit theorem (CLT). However, due to a ``loss of mass'' phenomenon the variance in the CLT for a sequence with bounded gaps is always smaller than 1/2. In the case of the law of the iterated logarithm (LIL) the situation is different; as we proved in an earlier paper, there exists (nk)k ≥ 1 with bounded gaps such that N ∞ | Σk=1N 2 π nk x |N N = ∞ for almost all x. In the present paper we prove a complementary results showing that any prescribed limsup-behavior in the LIL is possible for sequences with bounded gaps. More precisely, we show that for any real number ≥ 0 there exists a sequence of integers (nk)k ≥ 1 satisfying nk+1 - nk ∈ \1,2\ such that the limsup in the LIL equals for almost all x. Similar results are proved for sums Σ f(nk x) and for the discrepancy of ( nk x )k ≥ 1.