Namioka spaces and topological games
Abstract
We introduce a class of β-v-unfavorable spaces, which contains some known classes of β-unfavorable spaces for topological games of Choquet type. It is proved that every β-v-unfavorable space X is a Namioka space, that is for any compact space Y and any separately continuous function f:X× Y R there exists a dense in X Gδ-set A⊂eq X such that f is jointly continuous at each point of A× Y.
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