On the sequential closure of the set of continuous functions in the space of separately continuous functions

Abstract

For separable metrizable spaces X,Y and a metrizable topological group Z by S(X× Y,Z) we denote the space of all separately continuous functions f:X× Y Z endowed with the topology of layer-wise uniform convergence, generated by the subbase consisting of the sets [KX× KY,U]=\f∈ S(X× Y,Z):f(KX× KY)⊂ U\, where U is an open subset of Z and KX⊂ X, KY⊂ Y are compact sets one of which is a singleton. We prove that every separately continuous function f:X× Y Z with zero-dimensional image f(X× Y) is a limit of a sequence of jointly continuous functions in the topology of layer-wise uniform convergence.