Connectedness modulo an ideal

Abstract

For a topological space X and an ideal H of subsets of X we introduce the notion of connectedness modulo H. This notion of connectedness naturally generalizes the notion of connectedness in its usual sense. In the case when X is completely regular, we introduce a subspace γ H X of the Stone--Cech compactification β X of X, such that connectedness modulo H is equivalent to connectedness of β Xγ H X. In particular, we prove that when H is the ideal generated by the collection of all open subspaces of X with pseudocompact closure, then X is connected modulo H if and only if clβ X(β X X) is connected, and when X is normal and H is the ideal generated by the collection of all closed realcompact subspaces of X, then X is connected modulo H if and only if clβ X( X X) is connected. Here X is the Hewitt realcompactification of X.