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TURÁN'S EXTREMAL PROBLEM FOR POSITIVE DEFINITE FUNCTIONS ON GROUPS

Published online by Cambridge University Press:  25 October 2006

MIHAIL N. KOLOUNTZAKIS
Affiliation:
School of Mathematics, Georgia Institute of Technology, 686 Cherry Street NW, Atlanta, GA 30332, USA and Department of Mathematics, University of Crete, Knossos Ave., 714 09 Iraklio, [email protected]
SZILÁRD GY. RÉVÉSZ
Affiliation:
Alfréd Rényi Institute of Mathematics, Hungarian Academy of Sciences, 1364 Budapest, [email protected]
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Abstract

We study the following question: given an open set $\Omega$, symmetric about 0, and a continuous, integrable, positive definite function $f$, supported in $\Omega$ and with $f(0)=1$, how large can $\int f$ be? This problem has been studied so far mostly for convex domains $\Omega$ in Euclidean space. In this paper we study the question in arbitrary locally compact abelian groups and for more general domains. Our emphasis is on finite groups as well as Euclidean spaces and ${\mathbb Z}^d$. We exhibit upper bounds for $\int f$ assuming geometric properties of $\Omega$ of two types: (a) packing properties of $\Omega$ and (b) spectral properties of $\Omega$. Several examples and applications of the main theorems are shown. In particular, we recover and extend several known results concerning convex domains in Euclidean space. Also, we investigate the question of estimating $\int_{\Omega}f$ over possibly dispersed sets solely in dependence of the given measure $m:=|\Omega|$ of $\Omega$. In this respect we show that in ${\mathbb R}$ and ${\mathbb Z}$ the integral is maximal for intervals.

Type
Notes and Papers
Copyright
The London Mathematical Society 2006

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Footnotes

The first author was supported in part by European Commission Harmonic Analysis and Related Problems 2002–2006 IHP Network (Contract Number: HPRN-CT-2001-00273—HARP). The second author was supported in part through the Hungarian–French Scientific and Technological Governmental Cooperation, Project no. F-10/04 and by the Hungarian National Foundation for Scientific Research, Project nos T-049301, T-049693 and K-61908.