具有 ISR 特性的无限可化群示例

IF 1 3区数学 Q1 MATHEMATICS Mathematische Zeitschrift Pub Date : 2024-04-29 DOI:10.1007/s00209-024-03495-8

Yongle Jiang, Xiaoyan Zhou

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引用次数: 0

摘要

设 G 是 \(S_{\mathbb {N}}\)，是正整数集合 \(\mathbb {N}}\)上的有限置换（即具有有限支持的置换）群。我们证明了 G 具有阿姆鲁塔姆-蒋（Amrutam-Jiang）著作中提出的不变冯-诺依曼子布拉刚度（简称 ISR）属性。更准确地说，对于某个正常子群（H\lhd G\ ），每个 G 不变的冯-诺依曼子代数（P/subseteq L(G)\）都是 L(H) 的形式，在这种情况下：\(H=\{e\}, A_{\mathbb {N}}\) 或 G，其中 \(A_{\mathbb {N}}\) 表示 \(\mathbb {N}}\) 上的有限交替群，即.e.,S_{\mathbb {N}} 中所有偶数排列的子群。这给出了具有 ISR 特性的无限可调和群的第一个已知例子。

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An example of an infinite amenable group with the ISR property

Let G be \(S_{\mathbb {N}}\), the finitary permutation (i.e., permutations with finite support) group on the set of positive integers \(\mathbb {N}\). We prove that G has the invariant von Neumann subalgebras rigidity (ISR, for short) property as introduced in Amrutam–Jiang’s work. More precisely, every G-invariant von Neumann subalgebra \(P\subseteq L(G)\) is of the form L(H) for some normal subgroup \(H\lhd G\) and in this case, \(H=\{e\}, A_{\mathbb {N}}\) or G, where \(A_{\mathbb {N}}\) denotes the finitary alternating group on \(\mathbb {N}\), i.e., the subgroup of all even permutations in \(S_{\mathbb {N}}\). This gives the first known example of an infinite amenable group with the ISR property.