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Generic continuity of minimal set-valued mappings

Published online by Cambridge University Press:  09 April 2009

W. B. Moors
Affiliation:
Department of Mathematics The University of Auckland, New Zealand
J. R. Giles
Affiliation:
Department of Mathematics The University of NewcastleNSW 2308, Australia
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Abstract

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We study classes of Banach spaces where every set-valued mapping from a complete metric space into subsets of the Banach space which satisfies certain minimal properties, is single-valued and norm upper semi-continuous at the points of a dense Gδ subset of its domain. Characterisations of these classes are developed and permanence properties are established. Sufficiency conditions for membership of these classes are defined in terms of fragmentability and σ-fragmentability of the weak topology. A characterisation of non membership is used to show that l (N) is not a member of our classe of generic continuity spaces.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 1997

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