Linear extensions of Baire-one and Borel functions
Abstract
Let X and Y be the Hausdorff topological spaces and let A be both an - and - subset of X. Let also f A Y be a function for which the inverse image of every open subset U⊂ Y is in X. We show that f can be linearly extended to a function with the same property defined on X. A similar result is proved for Baire-one function defined on an analogous subset of . We give also an answer when the extension map is (with a supremum norm) an isometry.
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