Semisimplicity of Some Class of Operator Algebras on Banach Space期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Semisimplicity of Some Class of Operator Algebras on Banach Space

Authors:	H S Mustafayev

Institution:	(1) Faculty of Arts and Sciences, Department of Mathematics, Yuzuncu Yil University, 65080 Van, Turkey

Abstract:	Let G be a locally compact abelian group and let ${\bf T}{\text{ = }}{\left\{ {T{\left( g \right)}} \right\}}_{{g \in G}}$ be a representation of G by means of isometries on a Banach space. We define W_T as the closure with respect to the weak operator topology of the set ${\left\{ {\ifmmode\expandafter\hat\else\expandafter\^\fi{f}{\left( {\text{T}} \right)}:f \in L^{1} {\left( G \right)}} \right\}},$ where $\ifmmode\expandafter\hat\else\expandafter\^\fi{f}{\left( {\text{T}} \right)} = {\int\limits_G {f{\left( g \right)}T{\left( g \right)}dg} }$ is the Fourier transform of f ∈L¹(G) with respect to the group T. Then W_T is a commutative Banach algebra. In this paper we study semisimlicity problem for such algebras. The main result is that if the Arveson spectrum sp(T) of T is scattered (i.e. it does not contain a nonempty perfect subset) then the algebra W_T is semisimple. Some related problems are also discussed.

Keywords:	47Dxx 46J05
本文献已被 SpringerLink 等数据库收录！