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On the Dales–Żelazko conjecture for Beurling algebras on discrete groups

Part of: Abstract harmonic analysis Topological algebras, normed rings and algebras, Banach algebras Special aspects of infinite or finite groups Structure and classification of infinite or finite groups

Published online by Cambridge University Press:  03 July 2023

Jared T. White
Jared T. White*
Affiliation:
School of Mathematics and Statistics, The Open University, Milton Keynes, United Kingdom ([email protected])
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Abstract

Let G be a group that is either virtually soluble or virtually free, and let ω be a weight on G. We prove that if G is infinite, then there is some maximal left ideal of finite codimension in the Beurling algebra $\ell^1(G, \omega)$, which fails to be (algebraically) finitely generated. This implies that a conjecture of Dales and Żelazko holds for these Banach algebras. We then go on to give examples of weighted groups for which this property fails in a strong way. For instance, we describe a Beurling algebra on an infinite group in which every closed left ideal of finite codimension is finitely generated and which has many such ideals in the sense of being residually finite dimensional. These examples seem to be hard cases for proving Dales and Żelazko’s conjecture.

Keywords

Banach algebravirtually free groupvirtually soluble groupmaximal left idealfinitely generatedweightBeurling algebra

MSC classification

Primary: 43A20: $L^1$-algebras on groups, semigroups, etc. 46H10: Ideals and subalgebras
Secondary: 20E05: Free nonabelian groups 20E08: Groups acting on trees 20F16: Solvable groups, supersolvable groups
Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 66 , Issue 3 , August 2023 , pp. 613 - 624
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Copyright
© The Author(s), 2023. Published by Cambridge University Press on Behalf of The Edinburgh Mathematical Society.

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