海森堡运动群的\(C^*\) -代数 \(U(d) < imes \mathbb {H}_d.\)

IF 0.8 Q2 MATHEMATICS Advances in Operator Theory Pub Date : 2025-01-20 DOI:10.1007/s43036-024-00417-7

Hedi Regeiba, Aymen Rahali

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引用次数: 0

摘要

让 \(\mathbb {H}_d:=\mathbb {C}^d\times \mathbb {R},\) \((d\in \mathbb {N}^*)\) 做一个 \(2d+1\)我们用U(d)（酉群）表示的最大紧连通子群 \(Aut(\mathbb {H}_d),\) 的自同构群 \(\mathbb {H}_d.\) 让 \(G_d:=U(d) < imes \mathbb {H}_d\) 就是海森堡运动群。在这项工作中，我们描述了 \(C^*\)-代数 \(C^*(G_d),\) 的 \(G_d\) 在它的对偶空间上定义的算子域的代数中 \(\widehat{G_d}.\) 这一结果推广了Ludwig和Regeiba （Complex肛门开放理论13(8):3943 - 3978,2019）之前的结果。

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The \(C^*\)-algebra of the Heisenberg motion groups \(U(d) < imes \mathbb {H}_d.\)

Let \(\mathbb {H}_d:=\mathbb {C}^d\times \mathbb {R},\) \((d\in \mathbb {N}^*)\) be the \(2d+1\)-dimensional Heisenberg group and we denote by U(d) (the unitary group) the maximal compact connected subgroup of \(Aut(\mathbb {H}_d),\) the group of automorphisms of \(\mathbb {H}_d.\) Let \(G_d:=U(d) < imes \mathbb {H}_d\) be the Heisenberg motion group. In this work, we describe the \(C^*\)-algebra \(C^*(G_d),\) of \(G_d\) in terms of an algebra of operator fields defined over its dual space \(\widehat{G_d}.\) This result generalizes a previous result in Ludwig and Regeiba (Complex Anal Oper Theory 13(8):3943–3978, 2019).

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Advances in Operator Theory MATHEMATICS-

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1.60

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0.00%

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