On Bohr compactifications and profinite completions of group extensions

BACHIR BEKKA
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引用次数: 1

Abstract

Abstract Let $G= N\rtimes H$ be a locally compact group which is a semi-direct product of a closed normal subgroup N and a closed subgroup H . The Bohr compactification ${\rm Bohr}(G)$ and the profinite completion ${\rm Prof}(G)$ of G are, respectively, isomorphic to semi-direct products $Q_1 \rtimes {\rm Bohr}(H)$ and $Q_2 \rtimes {\rm Prof}(H)$ for appropriate quotients $Q_1$ of ${\rm Bohr}(N)$ and $Q_2$ of ${\rm Prof}(N).$ We give a precise description of $Q_1$ and $Q_2$ in terms of the action of H on appropriate subsets of the dual space of N . In the case where N is abelian, we have ${\rm Bohr}(G)\cong A \rtimes {\rm Bohr}(H)$ and ${\rm Prof}(G)\cong B \rtimes {\rm Prof}(H),$ where A (respectively B ) is the dual group of the group of unitary characters of N with finite H -orbits (respectively with finite image). Necessary and sufficient conditions are deduced for G to be maximally almost periodic or residually finite. We apply the results to the case where $G= \Lambda\wr H$ is a wreath product of discrete groups; we show in particular that, in case H is infinite, ${\rm Bohr}(\Lambda\wr H)$ is isomorphic to ${\rm Bohr}(\Lambda^{\rm Ab}\wr H)$ and ${\rm Prof}(\Lambda\wr H)$ is isomorphic to ${\rm Prof}(\Lambda^{\rm Ab} \wr H),$ where $\Lambda^{\rm Ab}=\Lambda/ [\Lambda, \Lambda]$ is the abelianisation of $\Lambda.$ As examples, we compute ${\rm Bohr}(G)$ and ${\rm Prof}(G)$ when G is a lamplighter group and when G is the Heisenberg group over a unital commutative ring.
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群扩展的玻尔紧化与无限补全
抽象Let $G= N\rtimes H$ 是闭正规子群N与闭子群H的半直积的局部紧群。玻尔紧化 ${\rm Bohr}(G)$ 和无限的完成 ${\rm Prof}(G)$ 分别是半直积的同构 $Q_1 \rtimes {\rm Bohr}(H)$ 和 $Q_2 \rtimes {\rm Prof}(H)$ 求合适的商 $Q_1$ 的 ${\rm Bohr}(N)$ 和 $Q_2$ 的 ${\rm Prof}(N).$ 我们对……作了精确的描述 $Q_1$ 和 $Q_2$ 关于H对N的对偶空间的适当子集的作用。在N是阿贝尔的情况下,我们有 ${\rm Bohr}(G)\cong A \rtimes {\rm Bohr}(H)$ 和 ${\rm Prof}(G)\cong B \rtimes {\rm Prof}(H),$ 其中A(分别为B)是有限H轨道(分别为有限像)N的酉元群的对偶群。导出了G是最大概周期或剩余有限的充分必要条件。我们将结果应用于 $G= \Lambda\wr H$ 是离散群的环积;我们特别指出,当H是无穷大时, ${\rm Bohr}(\Lambda\wr H)$ 是同构的 ${\rm Bohr}(\Lambda^{\rm Ab}\wr H)$ 和 ${\rm Prof}(\Lambda\wr H)$ 是同构的 ${\rm Prof}(\Lambda^{\rm Ab} \wr H),$ 在哪里 $\Lambda^{\rm Ab}=\Lambda/ [\Lambda, \Lambda]$ 阿贝尔化是 $\Lambda.$ 作为例子,我们计算 ${\rm Bohr}(G)$ 和 ${\rm Prof}(G)$ 当G是点灯群和G是单位交换环上的海森堡群时。
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来源期刊
CiteScore
1.70
自引率
0.00%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Papers which advance knowledge of mathematics, either pure or applied, will be considered by the Editorial Committee. The work must be original and not submitted to another journal.
期刊最新文献
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