| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4660413 | Topology and its Applications | 2010 | 9 Pages |
Let f:X×K→R be a separately continuous function and C a countable collection of subsets of K. Following a result of Calbrix and Troallic, there is a residual set of points x∈X such that f is jointly continuous at each point of {x}×Q, where Q is the set of y∈K for which the collection C includes a basis of neighborhoods in K. The particular case when the factor K is second countable was recently extended by Moors and Kenderov to any Čech-complete Lindelöf space K and Lindelöf α-favorable X, improving a generalization of Namioka's theorem obtained by Talagrand. Moors proved the same result when K is a Lindelöf p-space and X is conditionally σ-α-favorable space. Here we add new results of this sort when the factor X is σC(X)-β-defavorable and when the assumption “base of neighborhoods” in Calbrix–Troallic's result is replaced by a type of countable completeness. The paper also provides further information about the class of Namioka spaces.
