Norms of inner derivations for multiplier algebras of C*-algebras and   group C*-algebras, II

Robert J. Archbold; Eberhard Kaniuth; Douglas W. B. Somerset

arXiv:1504.07030·math.OA·August 27, 2015

Norms of inner derivations for multiplier algebras of C-algebras and group C-algebras, II

Robert J. Archbold, Eberhard Kaniuth, Douglas W. B. Somerset

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TL;DR

This paper studies the derivation constant for multiplier algebras of non-unital C*-algebras, especially group C*-algebras of motion groups, revealing explicit formulas based on the group's dimension.

Contribution

It extends the understanding of derivation constants to multiplier algebras of non-unital C*-algebras, with explicit results for motion group C*-algebras.

Findings

01

For N ≥ 3, K(M(C*(G_N))) = (1/2) * ceil(N/2)

02

General results on derivation constants for multiplier algebras

03

Application to C*-algebras of motion groups G_N

Abstract

The derivation constant $K (A) \geq \frac{1}{2}$ has been extensively studied for \emph{unital} non-commutative $C^{*}$ -algebras. In this paper, we investigate properties of $K (M (A))$ where $M (A)$ is the multiplier algebra of a non-unital $C^{*}$ -algebra $A$ . A number of general results are obtained which are then applied to the group $C^{*}$ -algebras $A = C^{*} (G_{N})$ where $G_{N}$ is the motion group $R^{N} ⋊ S O (N)$ . Utilising the rich topological structure of the unitary dual $G_{N}$ , it is shown that, for $N \geq 3$ , $K (M (C^{*} (G_{N}))) = \frac{1}{2} ⌈ \frac{N}{2} ⌉ .$

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