On Twisted Fourier Analysis and Convergence of Fourier Series on Discrete Groups |
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| Authors: | Erik Bédos Roberto Conti |
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| Affiliation: | (1) Institute of Mathematics, University of Oslo, P.B. 1053 Blindern, 0316 Oslo, Norway;(2) Mathematics, School of Mathematical and Physical Sciences, University of Newcastle, Callaghan, NSW, 2308, Australia;(3) Present address: Department of Mathematics, University of Rome 2 Tor Vergata, via della Ricerca Scientifica, 00133 Rome, Italy |
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| Abstract: | We study norm convergence and summability of Fourier series in the setting of reduced twisted group C *-algebras of discrete groups. For amenable groups, Følner nets give the key to Fejér summation. We show that Abel-Poisson summation holds for a large class of groups, including e.g. all Coxeter groups and all Gromov hyperbolic groups. As a tool in our presentation, we introduce notions of polynomial and subexponential H-growth for countable groups w.r.t. proper scale functions, usually chosen as length functions. These coincide with the classical notions of growth in the case of amenable groups. |
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| Keywords: | Twisted group C *-algebra Fourier series Fejér summation Abel-Poisson summation Amenable group Haagerup property Length function Polynomial growth Subexponential growth |
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