$\varepsilon $-Kronecker and $I_{0}$ sets in abelian groups, IV:
 interpolation by non-negative measures

Colin C. Graham; Kathryn E. Hare

doi:10.4064/sm177-1-2

Instytut Matematyczny Polskiej Akademii Nauk / Institute of Mathematics / Publishing house / Journals and Serials / Studia Mathematica / All issues

$\varepsilon $-Kronecker and $I_{0}$ sets in abelian groups, IV: interpolation by non-negative measures

Volume 177 / 2006

Colin C. Graham, Kathryn E. Hare Studia Mathematica 177 (2006), 9-24 MSC: Primary 42A55, 43A46; Secondary 43A05, 43A25, 42A82. DOI: 10.4064/sm177-1-2

Abstract

A subset $E$ of a discrete abelian group is a “Fatou–Zygmund interpolation set” ($F\kern-.75pt ZI_0$ set) if every bounded Hermitian function on $E$ is the restriction of the Fourier–Stieltjes transform of a discrete, non-negative measure. We show that every infinite subset of a discrete abelian group contains an $F\kern-.75pt ZI_0$ set of the same cardinality (if the group is torsion free, a stronger interpolation property holds) and that $\varepsilon $-Kronecker sets are $F\kern-.75pt ZI_0$ (with that stronger interpolation property).

Authors

Colin C. GrahamDepartment of Mathematics
University of British Columbia
Vancouver, B.C., Canada
and
RR#1–D-156
Bowen Island, B.C., Canada V0N 1G0
e-mail
Kathryn E. HareDepartment of Pure Mathematics
University of Waterloo
Waterloo, Ont., Canada N2L 3G1
e-mail

Free download under CC-BY license

Search for IMPAN publications