Coloring Cantor sets and resolvability of pseudocompact spaces

Abstract

Let us denote by (λ,μ) the statement that B(λ) = D(λ)ω, i.e. the Baire space of weight λ, has a coloring with μ colors such that every homeomorphic copy of the Cantor set C in B(λ) picks up all the μ colors. We call a space X\, π-regular if it is Hausdorff and for every non-empty open set U in X there is a non-empty open set V such that V ⊂ U. We recall that a space X is called feebly compact if every locally finite collection of open sets in X is finite. A Tychonov space is pseudocompact iff it is feebly compact. The main result of this paper is the following. Theorem. Let X be a crowded feebly compact π-regular space and μ be a fixed (finite or infinite) cardinal. If (λ,μ) holds for all λ < c(X) then X is μ-resolvable, i.e. contains μ pairwise disjoint dense subsets. (Here c(X) is the smallest cardinal such that X does not contain many pairwise disjoint open sets.) This significantly improves earlier results of van Mill , resp. Ortiz-Castillo and Tomita.