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On certain Glasner sets

Published online by Cambridge University Press:  12 July 2007

H. Kamarul Haili
Affiliation:
School of Mathematical Sciences, University Science Malaysia, Minden 11800, Penang, Malaysia
R. Nair
Affiliation:
Mathematical Sciences, University of Liverpool, PO Box 147, Liverpool L69 7ZL, UK

Abstract

A sequence of integers S is called Glasner if, given any ε > 0 and any infinite subset A of T = R/Z, and given y in T, we can find an integer nS such that there is an element of {nx : xA} whose distance to y is not greater than ε. In this paper we show that if a sequence of integers is uniformly distributed in the Bohr compactification of the integers, then it is also Glasner. The theorem is proved in a quantitative form.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2003

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