Rothberger space explained

In mathematics, a Rothberger space is a topological space that satisfies a certain a basic selection principle. A Rothberger space is a space in which for every sequence of open covers

l{U}_1,l{U}_2,\ldots

of the space there are sets

U₁\inl{U}_1,U₂\inl{U}_2,\ldots

such that the family

\{U_n:n\inN\}

covers the space.

History

In 1938, Fritz Rothberger introduced his property known as

C''

.^[1]

Characterizations

Combinatorial characterization

N^N

. A subset

N^N

is guessable if there is a function

g\inA

such that the sets

\{n:f(n)=g(n)\}

are infinite for all functions

f\inA

. 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

cov(l{M})

^[2] is Rothberger.

Topological game characterization

Let

be a topological space. The Rothberger game

G_1(O,O)

played on

is a game with two players Alice and Bob.

1st round: Alice chooses an open cover

l{U}₁

. Bob chooses a set

U_1\inl{U}₁

2nd round: Alice chooses an open cover

l{U}₂

. Bob chooses a set

U_2\inl{U}₂

etc.

If the family

\{U_n:n\inN\}

is a cover of the space

, then Bob wins the game

G_1(O,O)

. Otherwise, Alice wins.

A player has a winning strategy if he knows how to play in order to win the game

G_1(O,O)

(formally, a winning strategy is a function).

A topological space is Rothberger iff Alice has no winning strategy in the game

G_1(O,O)

played on this space.^[3]

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

G_1(O,O)

played on the space

iff the space

is countable.^[4] ^[5]

Properties

Every countable topological space is Rothberger
Every Luzin set is Rothberger
Every Rothberger subset of the real line has strong measure zero.
In the Laver model for the consistency of the Borel conjecture every Rothberger subset of the real line is countable

Notes and References

Rothberger. Fritz. 1938-01-01. Eine Verschärfung der Eigenschaft C. Fundamenta Mathematicae. DE. 30. 1. 50–55. 10.4064/fm-30-1-50-55. 0016-2736. free.
Book: Set Theory: On the Structure of the Real Line. Bartoszynski. Tomek. Judah. Haim. 1995-08-15. Taylor & Francis. 9781568810447. en.
Pawlikowski. Janusz. Undetermined sets of point-open games. Fundamenta Mathematicae. 144. 3. 0016-2736.
Scheepers. Marion. 1995-01-01. A direct proof of a theorem of Telgársky. Proceedings of the American Mathematical Society. 123. 11. 3483–3485. 10.1090/S0002-9939-1995-1273523-1. 0002-9939. free.
Telgársky. Rastislav. 1984-06-01. On games of Topsoe. Mathematica Scandinavica. 54. 170–176. 10.7146/math.scand.a-12050. 1903-1807. free.