Diamond on ladder systems and countably metacompact topological spaces

Abstract

The property of countable metacompactness of a topological space gets its importance from Dowker's 1951 theorem that the product of a normal space X with the unit interval is again normal iff X is countably metacompact. In a recent paper, Leiderman and Szeptycki studied -spaces, which are a subclass of the class of countably metacompact spaces. They proved that a single Cohen real introduces a ladder system L over the first uncountable cardinal for which the corresponding space XL is not a -space, and asked whether there is a ZFC example of a ladder system L over some cardinal for which XL is not countably metacompact, in particular, not a -space. We prove that an affirmative answer holds for the cardinal =cf(ω+1). Assuming ω=ω, we get an example at a much lower cardinal, namely =2220, and our ladder system L is moreover ω-bounded.