A non-separable Christensen's theorem and set tri-quotient maps

Abstract

For every space X let K(X) be the set of all compact subsets of X. Christensen c:74 proved that if X, Y are separable metrizable spaces and F(X)(Y) is a monotone map such that any L∈K(Y) is covered by F(K) for some K∈K(X), then Y is complete provided X is complete. It is well known bgp that this result is not true for non-separable spaces. In this paper we discuss some additional properties of F which guarantee the validity of Christensen's result for more general spaces.