Menger Space

In mathematics, a Menger space is a topological space that satisfies a certain basic selection principle that generalizes σ-compactness. A Menger space is a space in which for every sequence of open covers $\mathcal_1, \mathcal_2, \ldots$ of the space there are finite sets $\mathcal_1 \subset \mathcal_1, \mathcal_2 \subset \mathcal_2, \ldots$ such that the family $\mathcal_1 \cup \mathcal_2 \cup \cdots$ covers the space.

History

In 1924, Karl Menger

introduced the following basis property for metric spaces:
Every basis of the topology contains a countable family of sets with vanishing
diameters that covers the space. Soon thereafter,
Witold Hurewicz
observed that Menger's basis property can be reformulated to the above form using sequences of open covers.

Menger's conjecture

Menger conjectured that in ZFC every Menger metric space is σ-compact.
A. W. Miller and D. H. Fremlin
proved that Menger's conjecture is false, by showing that there is,
in ZFC, a set of real numbers that is Menger but not σ-compact.
The Fremlin-Miller proof was dichotomic, and the set witnessing the failure
of the conjecture heavily depends on whether a certain (undecidable) axiom
holds or not.

Bartoszyński and Tsaban

gave a uniform ZFC example of a Menger subset of the real line that is not σ-compact.

Combinatorial characterization

For subsets of the real line, the Menger property can be characterized using continuous functions into the Baire space $\mathbb^\mathbb$.
For functions $f,g\in \mathbb^\mathbb$, write $f\leq^* g$ if $f(n)\leq g(n)$ for all but finitely many natural numbers $n$. A subset $A$ of $\mathbb^\mathbb$ is dominating if for each function $f\in\mathbb^\mathbb$ there is a function $g\in A$ such that $f\leq^* g$. Hurewicz proved that a subset of the real line is Menger iff every continuous image of that space into the Baire space is not dominating. In particular, every subset of the real line of cardinality less than the dominating number $\mathfrak$ is Menger.

The cardinality of Bartoszyński and Tsaban's counter-example to Menger's conjecture is
$\mathfrak$.

Properties

* Every compact, and even σ-compact, space is Menger.
* Every Menger space is a Lindelöf space
* Continuous image of a Menger space is Menger
* The Menger property is closed under taking $F_\sigma$ subsets
* Menger's property characterizes filters whose Mathias forcing notion does not add dominating functions.

References

{{Topology

Properties of topological spaces
Topology