Normal numbers and nested perfect necklaces

Abstract

M. B. Levin used Sobol-Faure low discrepancy sequences with Pascal matrices modulo 2 to construct, for each integer b, a real number x such that the first N terms of the sequence (bn x 1)n≥ 1 have discrepancy O(( N)2/N). This is the lowest discrepancy known for this kind of sequences. In this note we characterize Levin's construction in terms of nested perfect necklaces, which are a variant of the classical de Bruijn necklaces. Moreover, we show that every real number x whose base b expansion is the concatenation of nested perfect necklaces of exponentially increasing order satisfies that the first N terms of (bn x 1)n≥ 1 have discrepancy O(( N)2/N). For base 2 and the order being a power of 2, we give the exact number of nested perfect necklaces and an explicit method based on matrices to construct each of them.