On stable pairs of Hahn and extremal sections of separately continuous functions on the products with a scattered multiplier

Abstract

The minimal and the maximal sections f,\!f:X R of a function f:X× Y R are defined by f(x)=∈fy∈ Yf(x,y) and \!\!f(x)=y∈ Yf(x,y) for any x∈ X. A pair (g,h) of functions on X is called a stable pair of Hahn if there exists a sequence of continuous functions un on X such that h(x)=n∈Nun(x) and g(x)=n∈Nun(x) for any x∈ X. Evidently, every stable pair of Hahn is a countable pair of Hahn, and hence a pair of Hahn. We prove that for any separately continuous function f on the product of compact spaces X and Y such that Y is scattered and at least one of them has the countable chain property, the pair (f,\!f) is a stable pair of Hahn. We prove that for any stable pair of Hahn (g,h) on the product of a topological space X and an infinity completely regular space Y there exists a separately continuous function f on X× Y such that f=g and \!f=h.