%0 Journal Article
%T Constructions of uniformly distributed sequences using the $ \mathbf{b}$-adic method
%A Peter Hellekalek
%A Harald Niederreiter
%J Uniform Distribution Theory
%D 2011
%I Mathematical Institute of the Slovak Academy of Sciences
%X For bases $\mathbf{b}=(b_1, \ldots, b_s)$ of not necessarily distinct integers $b_i \ge 2$, we employ $\mathbf{b}$-adic arithmetic to study questions in the theory of uniform distribution. A $ \mathbf{b}$-adic function system is constructed and the related Weyl criterionis proved. Relations between the uniform distribution of a sequence in the $\mathbf{b} $-adic integers, on the $s$-dimensional torus, and in the rational integers are established and several constructions of uniformly distributed sequences based on $ \bf{b}$-adic arithmetic are presented.
%K uniform distribution of sequences
%K Weyl criterion
%K b-adic integers
%K b-adic function systems
%K Halton sequence
%K Fibonacci sequence
%U http://www.boku.ac.at/MATH/udt/vol06/no1/92HellNie11-1.pdf