Structure of the $C^*$-Algebras of Nilpotent Lie Groups

Takahiro Sudo

Type: Article

Publication Date: 1996-06-01

Citations: 5

DOI: https://doi.org/10.3836/tjm/1270043230

Abstract

We show that the algebraic structure of the group $C^*$-algebra $C^*(G)$ of a simply connected, connected nilpotent Lie group $G$ is described as repeating finitely the extension of $C^*$-algebras with $T_{2^-}$ spectrums by themselves and one more extension by a commutative $C^*$-algebra on the fixed point space $(\mathfrak{G}^*)^G$ of $\mathfrak{G}^*$ under the coadjoint action of $G$. Using this result, we show that $C^*(G)$ has no non-trivial projections.

Locations

Tokyo Journal of Mathematics - View - PDF

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Works That Cite This (5)

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+	Structure of group C∗-algebras of the generalized disconnected Mautner groups	2002	Takahiro Sudo
+	On C⁎-algebras of exponential solvable Lie groups and their real ranks	2016	Ingrid Beltiţă Daniel Beltiţă
+ PDF Chat	The Structure of Group $C^∗$-algebras of the Generalized Dixmier Groups	2003	Takahiro Sudo
+ PDF Chat	Structure of group $C^*$-algebras of the generalized Mautner groups	2002	Takahiro Sudo
+	On $C^*$-algebras of exponential solvable Lie groups and their real ranks	2015	Ingrid Beltiţă Daniel Beltiţă

Works Cited by This (2)

Action	Title	Year	Authors
+	STABLE RANK OF THE C*-ALGEBRAS OF NILPOTENT LIE GROUPS	1995	Takahiro Sudo Hiroshi Takai
+	UNITARY REPRESENTATIONS OF NILPOTENT LIE GROUPS	1962	A. A. Kirillov