Title of article
Cohen–Host type idempotent theorems for representations on Banach spaces and applications to Figà-Talamanca–Herz algebras ✩
Author/Authors
Volker Runde، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2007
Pages
16
From page
736
To page
751
Abstract
Let G be a locally compact group, and let R(G) denote the ring of subsets of G generated by the left
cosets of open subsets of G. The Cohen–Host idempotent theorem asserts that a set lies in R(G) if and
only if its indicator function is a coefficient function of a unitary representation of G on some Hilbert space.
We prove related results for representations of G on certain Banach spaces.We apply our Cohen–Host type
theorems to the study of the Figà-Talamanca–Herz algebras Ap(G) with p ∈ (1,∞). For arbitrary G, we
characterize those closed ideals of Ap(G) that have an approximate identity bounded by 1 in terms of their
hulls. Furthermore, we characterize those G such that Ap(G) is 1-amenable for some—and, equivalently,
for all—p ∈ (1,∞): these are precisely the abelian groups.
© 2006 Elsevier Inc. All rights reserved.
Keywords
Locally compactgroup , Figà-Talamanca–Herz algebra , Uniformly bounded representation , Smooth Banach space , amenability , Uniform convexity , Coset ring , Bounded approximate identity , Ultrapower
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
2007
Journal title
Journal of Mathematical Analysis and Applications
Record number
935578
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