Unitary Representations of Groups, Duals, and Characters

Bachir Bekka, P. Harpe
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引用次数: 38

Abstract

This is an expository book on unitary representations of topological groups, and of several dual spaces, which are spaces of such representations up to some equivalence. The most important notions are defined for topological groups, but a special attention is paid to the case of discrete groups. The unitary dual of a group $G$ is the space of equivalence classes of its irreducible unitary representations; it is both a topological space and a Borel space. The primitive dual is the space of weak equivalence classes of unitary irreducible representations. The normal quasi-dual is the space of quasi-equivalence classes of traceable factor representations; it is parametrized by characters, which can be finite or infinite. The theory is systematically illustrated by a series of specific examples: Heisenberg groups, affine groups of infinite fields, solvable Baumslag-Solitar groups, lamplighter groups, and general linear groups. Operator algebras play an important role in the exposition, in particular the von Neumann algebras associated to a unitary representation and C*-algebras associated to a locally compact group.
群、对偶和字符的统一表示
这是一本关于拓扑群的酉表示和若干对偶空间的说明性的书,对偶空间是这种表示达到某种等价的空间。最重要的概念是为拓扑群定义的,但特别注意离散群的情况。群$G$的酉对偶是其不可约酉表示的等价类的空间;它既是拓扑空间又是波雷尔空间。原始对偶是酉不可约表示的弱等价类的空间。正规拟对偶是可迹因子表示的拟等价类的空间;它是参数化的字符,可以是有限的或无限的。该理论通过一系列具体的例子系统地说明:海森堡群,无限场的仿射群,可解的Baumslag-Solitar群,lamplighter群和一般线性群。算子代数在论述中起着重要的作用,特别是与酉表示相关的von Neumann代数和与局部紧群相关的C*-代数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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