离散群广义群代数双元中的湮没器

Pub Date : 2024-03-27 DOI:10.1007/s11785-024-01506-4
Lav Kumar Singh
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引用次数: 0

摘要

在这篇短文中,我们研究了广义群代数((\ell ^1(G,\mathcal {A}),*))的第二个对偶,它同时具有阿伦积,其中 G 是任意离散群,\(\mathcal {A}\)是一个巴拿赫代数,包含 \((\ell ^1(\mathbb N),\bullet )\) 的一个补代数副本。我们给出了代数 \(\ell ^1(G,\mathcal {A})^{***}\)中由 \({\mathbb {N}}\)上的非主超滤波器产生的、不在顶点逻辑中心的湮没器(与阿伦积)的显式族。因此,我们还推导出了\(\ell ^1(G,\mathcal {A})\)不是强阿伦无规则的事实。
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Annihilators in the Bidual of the Generalized Group Algebra of a Discrete Group

In this short note, the second dual of generalized group algebra \((\ell ^1(G,\mathcal {A}),*)\) equipped with both Arens product is investigated, where G is any discrete group and \(\mathcal {A}\) is a Banach algebra containing a complemented algebraic copy of \((\ell ^1(\mathbb N),\bullet )\). We give an explicit family of annihilators(w.r.t both the Arens product) in the algebra \(\ell ^1(G,\mathcal {A})^{**}\), arising from non-principal ultrafilters on \({\mathbb {N}}\) and which are not in the toplogical center. As a consequence, we also deduce the fact that \(\ell ^1(G,\mathcal {A})\) is not Strongly Arens irregular.

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