In mathematics, a -space is a topological space that satisfies a certain a basic selection principle. An infinite cover of a topological space is an -cover if every finite subset of this space is contained in some member of the cover, and the whole space is not a member the cover. A cover of a topological space is a -cover if every point of this space belongs to all but finitely many members of this cover. A -space is a space in which every open -cover contains a -cover.

History

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Gerlits and Nagy introduced the notion of γ-spaces.[1] They listed some topological properties and enumerated them by Greek letters. The above property was the third one on this list, and therefore it is called the γ-property.

Characterizations

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Combinatorial characterization

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Let   be the set of all infinite subsets of the set of natural numbers. A set   is centered if the intersection of finitely many elements of   is infinite. Every set   we identify with its increasing enumeration, and thus the set   we can treat as a member of the Baire space  . Therefore,   is a topological space as a subspace of the Baire space  . A zero-dimensional separable metric space is a γ-space if and only if every continuous image of that space into the space   that is centered has a pseudointersection.[2]

Topological game characterization

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Let   be a topological space. The  -has a pseudo intersection if there is a set game played on   is a game with two players Alice and Bob.

1st round: Alice chooses an open  -cover   of  . Bob chooses a set  .

2nd round: Alice chooses an open  -cover   of  . Bob chooses a set  .

etc.

If   is a  -cover of the space  , then Bob wins the game. Otherwise, Alice wins.

A player has a winning strategy if he knows how to play in order to win the game (formally, a winning strategy is a function).

A topological space is a  -space iff Alice has no winning strategy in the  -game played on this space.[1]

Properties

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  • Let   be a Tychonoff space, and   be the space of continuous functions   with pointwise convergence topology. The space   is a  -space if and only if   is Fréchet–Urysohn if and only if   is strong Fréchet–Urysohn.[1]
  • Let   be a   subset of the real line, and   be a meager subset of the real line. Then the set   is meager.[4]

References

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  1. ^ a b c d Gerlits, J.; Nagy, Zs. (1982). "Some properties of  , I". Topology and Its Applications. 14 (2): 151–161. doi:10.1016/0166-8641(82)90065-7.
  2. ^ Recław, Ireneusz (1994). "Every Lusin set is undetermined in the point-open game". Fundamenta Mathematicae. 144: 43–54. doi:10.4064/fm-144-1-43-54.
  3. ^ Scheepers, Marion (1996). "Combinatorics of open covers I: Ramsey theory". Topology and Its Applications. 69: 31–62. doi:10.1016/0166-8641(95)00067-4.
  4. ^ Galvin, Fred; Miller, Arnold (1984). " -sets and other singular sets of real numbers". Topology and Its Applications. 17 (2): 145–155. doi:10.1016/0166-8641(84)90038-5.