On a bounded remainder set for a digital Kronecker sequence

Abstract

Let x0, x1,... be a sequence of points in [0,1)s. A subset S of [0,1)s is called a bounded remainder set if there exist two real numbers a and C such that, for every integer N, | card\n <N \; | \; xn ∈ S \ - a N| <C . Let ( xn)n ≥ 0 be an s-dimensional digital Kronecker-sequence in base b ≥ 2, γ =(γ1,...,γs), γi ∈ [0, 1) with b-adic expansion\\ γi= γi,1b-1+ γi,2b-2+..., i=1,...,s. In this paper, we prove that [0,γ1) × ...× [0,γs) is the bounded remainder set with respect to the sequence ( xn)n ≥ 0 if and only if equation 1 ≤ i ≤ s \ j ≥ 1 \; | \; γi,j ≠ 0 \ < ∞. equation