In mathematics, a Rothberger space is a

topological space In mathematics, a topological space is, roughly speaking, a geometrical space in which closeness is defined but cannot necessarily be measured by a numeric distance. More specifically, a topological space is a set whose elements are called po ...

that satisfies a certain a basic

selection principle In mathematics, a selection principle is a rule asserting the possibility of obtaining mathematically significant objects by selecting elements from given sequences of sets. The theory of selection principles studies these principles and their r ...

. A Rothberger space is a space in which for every sequence of open covers

\mathcal_1, \mathcal_2, \ldots

of the space there are sets

U_1 \in \mathcal_1, U_2 \in \mathcal_2, \ldots

such that the family

\

covers the space.

History

In 1938, Fritz Rothberger introduced his property known as

C''

Characterizations

Combinatorial characterization

For subsets of the real line, the Rothberger property can be characterized using continuous functions into the

Baire space In mathematics, a topological space X is said to be a Baire space if countable unions of closed sets with empty interior also have empty interior. According to the Baire category theorem, compact Hausdorff spaces and complete metric spaces are ...

\mathbb^\mathbb

. A subset

A

\mathbb^\mathbb

is guessable if there is a function

g\in A

such that the sets

\

are infinite for all functions

f\in A

. A subset of the real line is Rothberger iff every continuous image of that space into the Baire space is guessable. In particular, every subset of the real line of cardinality less than

\mathrm(\mathcal)

is Rothberger.

Topological game characterization

Let

X

be a topological space. The Rothberger game

\text_1(\mathbf,\mathbf)

played on

X

is a game with two players Alice and Bob. 1st round: Alice chooses an open cover

\mathcal_1

X

. Bob chooses a set

U_1\in \mathcal_1

. 2nd round: Alice chooses an open cover

\mathcal_2

X

. Bob chooses a set

U_2\in\mathcal_2

. etc. If the family

\

is a cover of the space

X

, then Bob wins the game

\text_1(\mathbf,\mathbf)

. Otherwise, Alice wins. A player has a winning strategy if he knows how to play in order to win the game

\text_1(\mathbf,\mathbf)

(formally, a winning strategy is a function). * A topological space is Rothberger iff Alice has no winning strategy in the game

\text_1(\mathbf,\mathbf)

played on this space. * Let

X

be a metric space. Bob has a winning strategy in the game

\text_1(\mathbf,\mathbf)

played on the space

X

iff the space

X

is countable.

Properties

* Every countable topological space is Rothberger * Every

Luzin set In mathematics, a Luzin space (or Lusin space), named for N. N. Luzin, is an uncountable topological T1 space without isolated points in which every nowhere-dense subset is countable. There are many minor variations of this definition in use: th ...

is Rothberger * Every Rothberger subset of the real line has strong measure zero. * In the Laver model for the consistency of the

Borel conjecture In mathematics, specifically geometric topology, the Borel conjecture (named for Armand Borel) asserts that an aspherical closed manifold is determined by its fundamental group, up to homeomorphism. It is a rigidity conjecture, asserting that ...

every Rothberger subset of the real line is countable

References

{{Topology Properties of topological spaces Topology