The two-disjoint-copies property for compact spaces, homogeneity and connection with Cp-theory

Abstract

A Tychonoff space X has the two-disjoint-copies property (2DCP) if there exists a sequence (Kn)n∈ω of non-empty compact subsets of X such that each Kn contains two disjoint subsets homeomorphic to Kn+1. Banakh, Kąkol and Śliwa showed that 2DCP yields an infinite-dimensional metrizable quotient of Cp(X), while it is still a long-standing open question whether Cp(X) has such a quotient for any infinite compact space X. The above concept as well as the last problem are closely related to Efimov's problem that has remained open for 40 years. We will discuss a number of conditions that imply 2DCP. For example, every locally homogeneous compact space, every space containing a copy of βω or 2ω has 2DCP although compact h-homogeneous spaces with 2DCP without such copies exist in ZFC. We prove that no scattered compact space has 2DCP and there exist in ZFC compact perfect spaces without 2DCP. This implies that for compact metric spaces X the 2DCP is equivalent to uncountability of X. There exist explicit uncountable separable compact spaces failing 2DCP, for example the Isbell-Mrówka compacta. We give positive classes among zero-dimensional compact spaces; for example, the Brech, as well as the Sobota-Zdomskyy compact spaces of Efimov type have 2DCP. Open questions are included.