On questions which are connected with Talagrand problem

Abstract

We prove the following results. 1. If X is a α-favourable space, Y is a regular space, in which every separable closed set is compact, and f:X× Y R is a separately continuous everywhere jointly discontinuous function, then there exists a subspace Y0⊂eq Y which is homeomorphic to β N. 2. There exist a α-favourable space X, a dense in β N N countably compact space Y and a separately continuous everywhere jointly discontinuous function f:X× Y R. Besides, it was obtained some conditions equivalent to the fact that the space Cp(β N N,\0,1\) of all continuous functions x:β N N\0,1\ with the topology of point-wise convergence is a Baire space.