A generalization of a Baire theorem concerning barely continuous functions
Abstract
We prove that if X is a paracompact space, Y is a metric space and f:X Y is a functionally fragmented map, then (i) f is σ-discrete and functionally Fσ-measurable; (ii) f is a Baire-one function, if Y is weak adhesive and weak locally adhesive for X; (iii) f is countably functionally fragmented, if X is Lindel\"off. This result generalizes one theorem of Rene Baire on classification of barely continuous functions.
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