Publication: Fixed point property and normal structure for banach spaces associated to locally compact groups
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Mah, Peter F
Lau, Anthony To-Ming
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Abstract
In this paper we investigate when various Danach spaces associated to a locally compact group G have the fixed point property for nonexpansive mappings or normal structure. We give sufficient conditions and some necessary conditions about G for the Fourier and Fourier-Stieltjes algebras to have the fixed point property. We also show that if a C*-algebra 21 has the fixed point property then for any normal element a of 21, the spectrum a (a) is countable and that the group C*-algebra C* (G) has weak normal structure if and only if G is finite. © 1997 American Mathematical Society.
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Publisher
American Mathematical Society (AMS)
Subject
Mathematics
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Has Part
Source
Proceedings of the American Mathematical Society
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DOI
10.1090/s0002-9939-97-03773-8