Abstract
We construct Menger subsets of the real line whose product is not Menger in the plane. In contrast to earlier constructions, our approach is purely combinatorial. The set theoretic hypothesis used in our construction is far milder than earlier ones, and holds in almost all canonical models of set theory of the real line. On the other hand, we establish productive properties for versions of Menger's property parameterized by filters and semifilters. In particular, the Continuum Hypothesis implies that every productively Menger set of real numbers is productively Hurewicz, and each ultrafilter version of Menger's property is strictly between Menger's and Hurewicz's classic properties. We include a number of open problems emerging from this study.
Original language | English |
---|---|
Pages (from-to) | 1-18 |
Number of pages | 18 |
Journal | Annals of Pure and Applied Logic |
Volume | 168 |
Issue number | 1 |
DOIs | |
State | Published - 1 Jan 2017 |
Bibliographical note
Publisher Copyright:© 2016 Elsevier B.V.
Keywords
- Bi-unbounded sets
- Concentrated sets
- Hurewicz property
- Menger property
- Reaping number
- Scales