On Loeb and sequential spaces in ZF

Abstract

A topological space is called Loeb if the collection of all its non-empty closed sets has a choice function. In this article, in the absence of the axiom of choice, connections between Loeb and sequential spaces are investigated. Among other results, it is proved in ZF that if X is a Cantor completely metrizable second-countable space, then Xω is Loeb. If a sequential, sequentially locally compact space X has the property that every infinitely countable family of non-empty closed subsets of X has a choice function, then the Cartesian product X×Y of X with any sequential space Y is sequential. In consequence, it holds true in ZF that the Cartesian product of a sequential locally countably compact space with any sequential space is sequential. If R is sequential, then every second-countable compact Hausdorff space is sequential. It is also proved that, in some models of ZF, a countable product of Cantor completely metrizable second-countable spaces can fail to be Loeb and it is independent of ZF that every sequential subspace of % R is Loeb. Some other sentences are shown to be independent of % ZF. Several open problems are posed, among them, the following question: is Rω sequential if R is sequential?