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Title: | Quasi-continuous selections | ||||||||||
Author: | Matejdes, Milan | ||||||||||
Document type: | Peer-reviewed article (English) | ||||||||||
Source document: | Real Analysis Exchange. 2009, vol. 34, issue 1, p. 109-113 | ||||||||||
ISSN: | 0147-1937 (Sherpa/RoMEO, JCR) | ||||||||||
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Abstract: | In this paper we will study the existence of a quasi-continuous selection for a multifunction F: X → Y which is upper Baire continuous with respect to compact complement topology. The upper Baire continuity means that for any open set V the upper inverse image F+(V ) = (x: F(x) ⊂ V ) is of the form (G \ S) ∪ T, where G is of second category and open, S; T are of first category and T is a subset of the closure of G. This type of continuity seems to be very close to the Baire property of mappings, and the upper Baire continuity has three nice features. | ||||||||||
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