Mappings of Baire spaces into function spaces and Kadeč renorming |
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Authors: | I. Namioka R. Pol |
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Affiliation: | (1) Department of Mathematics, University of Washington, 98195 Seattle, WA, USA;(2) Wydzial Matematyki U.W., Banacha 2, 00-913 Warszawa 59, Poland |
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Abstract: | Assuming that there exists in the unit interval [0, 1] a coanalytic set of continuum cardinality without any perfect subset, we show the existence of a scattered compact Hausdorff spaceK with the following properties: (i) For each continuous mapf on a Baire spaceB into (C(K), pointwise), the set of points of continuity of the mapf: B → (C(K), norm) is a denseG δ subset ofB, and (ii)C(K) does not admit a Kadeč norm that is equivalent to the supremum norm. This answers the question of Deville, Godefroy and Haydon under the set theoretic assumption stated above. |
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