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Ideal Spaces of Banach Algebras

Authors:	Somerset D. W. B.

Affiliation:	Department of Mathematical Sciences, University of Aberdeen Aberdeen, AB24 3UE, U.K. E-mail: ds{at}maths.abdn.ac.uk

Abstract:	The ideal space Id(A) of a Banach algebra A is studied as abitopological space Id(A), ${tau}$ _u, ${tau}$ _n, where ${tau}$ _u is the weakest topologyfor which all the norm functions I $->$ \|\| a + I\|\| (with a $isin$ A andI $isin$ Id(A)) are upper semi-continuous, and ${tau}$ _n is the de Groot dualof ${tau}$ _u. When A is separable, ${tau}$ _n ${vee}$ ${tau}$ _u is either a compact, metrizabletopology, or it is neither Hausdorff nor first countable. TAF-algebrasare shown to exhibit the first type of behaviour. Applicationsto Banach bundles (which motivate the study), and to PI-Banachalgebras, are given. 1991 Mathematics Subject Classification:46H10, 46J20.

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