Cliquishness and Quasicontinuity of Two Variables Maps

Abstract

We study the existence of continuity points for mappings f: X× Y Z whose x-sections Y y f(x,y)∈ Z are fragmentable and y-sections X x f(x,y)∈ Z are quasicontinuous, where X is a Baire space and Z is a metric space. For the factor Y, we consider two infinite "point-picking" games G1(y) and G2(y) defined respectively for each y∈ Y as follows: In the nth inning, Player I gives a dense set Dn⊂ Y, respectively, a dense open set Dn⊂ Y, then Player II picks a point yn∈Dn; II wins if y is in the closure of \yn:n∈ N\, otherwise I wins. It is shown that (i) f is cliquish if II has a winning strategy in G1(y) for every y∈ Y, and (ii) f is quasicontinuous if the x-sections of f are continuous and the set of y∈ Y such that II has a winning strategy in G2(y) is dense in Y. Item (i) extends substantially a result of Debs (1986) and item (ii) indicates that the problem of Talagrand (1985) on separately continuous maps has a positive answer for a wide class of "small" compact spaces.