The combinatorics of open covers II

Winfried Just; Arnold W. Miller; Marion Scheepers; Paul J. Szeptycki

doi:10.1016/s0166-8641(96)00075-2

The combinatorics of open covers II

Winfried Just
, Arnold W. Miller
, Marion Scheepers
, Paul J. Szeptycki

Mathematics Department

Ohio University
University of Wisconsin-Madison

Research output: Contribution to journal › Article › peer-review

293 Scopus citations

Abstract

We continue to investigate various diagonalization properties for sequences of open covers of separable metrizable spaces introduced in Part I. These properties generalize classical ones of Rothberger, Menger, Hurewicz, and Gerlits-Nagy. In particular, we show that most of the properties introduced in Part I are indeed distinct. We characterize two of the new properties by showing that they are equivalent to saying all finite powers have one of the classical properties above (Rothberger property in one case and in Menger property in the other). We consider for each property the smallest cardinality of a metric space which fails to have that property. In each case this cardinal turns out to equal another well-known cardinal less than the continuum. We also disprove (in ZFC) a conjecture of Hurewicz which is analogous to the Borel conjecture. Finally, we answer several questions from Part I concerning partition properties of covers.

Original language	English
Pages (from-to)	241-266
Number of pages	26
Journal	General Topology and its Applications
Volume	73
Issue number	3
DOIs	https://doi.org/10.1016/s0166-8641(96)00075-2
State	Published - 1996

Keywords

Gerlits-Nagy property γ-sets
Hurewicz property
Lusin set
Menger property
Rothberger property C″
Sierpiński set
γ-cover
ω-cover

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10.1016/s0166-8641(96)00075-2

Cite this

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title = "The combinatorics of open covers II",

abstract = "We continue to investigate various diagonalization properties for sequences of open covers of separable metrizable spaces introduced in Part I. These properties generalize classical ones of Rothberger, Menger, Hurewicz, and Gerlits-Nagy. In particular, we show that most of the properties introduced in Part I are indeed distinct. We characterize two of the new properties by showing that they are equivalent to saying all finite powers have one of the classical properties above (Rothberger property in one case and in Menger property in the other). We consider for each property the smallest cardinality of a metric space which fails to have that property. In each case this cardinal turns out to equal another well-known cardinal less than the continuum. We also disprove (in ZFC) a conjecture of Hurewicz which is analogous to the Borel conjecture. Finally, we answer several questions from Part I concerning partition properties of covers.",

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TY - JOUR

T1 - The combinatorics of open covers II

AU - Just, Winfried

AU - Miller, Arnold W.

AU - Scheepers, Marion

AU - Szeptycki, Paul J.

PY - 1996

Y1 - 1996

N2 - We continue to investigate various diagonalization properties for sequences of open covers of separable metrizable spaces introduced in Part I. These properties generalize classical ones of Rothberger, Menger, Hurewicz, and Gerlits-Nagy. In particular, we show that most of the properties introduced in Part I are indeed distinct. We characterize two of the new properties by showing that they are equivalent to saying all finite powers have one of the classical properties above (Rothberger property in one case and in Menger property in the other). We consider for each property the smallest cardinality of a metric space which fails to have that property. In each case this cardinal turns out to equal another well-known cardinal less than the continuum. We also disprove (in ZFC) a conjecture of Hurewicz which is analogous to the Borel conjecture. Finally, we answer several questions from Part I concerning partition properties of covers.

AB - We continue to investigate various diagonalization properties for sequences of open covers of separable metrizable spaces introduced in Part I. These properties generalize classical ones of Rothberger, Menger, Hurewicz, and Gerlits-Nagy. In particular, we show that most of the properties introduced in Part I are indeed distinct. We characterize two of the new properties by showing that they are equivalent to saying all finite powers have one of the classical properties above (Rothberger property in one case and in Menger property in the other). We consider for each property the smallest cardinality of a metric space which fails to have that property. In each case this cardinal turns out to equal another well-known cardinal less than the continuum. We also disprove (in ZFC) a conjecture of Hurewicz which is analogous to the Borel conjecture. Finally, we answer several questions from Part I concerning partition properties of covers.

KW - Gerlits-Nagy property γ-sets

KW - Hurewicz property

KW - Lusin set

KW - Menger property

KW - Rothberger property C″

KW - Sierpiński set

KW - γ-cover

KW - ω-cover

UR - https://www.scopus.com/pages/publications/0001729944

U2 - 10.1016/s0166-8641(96)00075-2

DO - 10.1016/s0166-8641(96)00075-2

M3 - Article

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VL - 73

SP - 241

EP - 266

JO - General Topology and its Applications

JF - General Topology and its Applications

IS - 3

ER -

The combinatorics of open covers II

Abstract

Keywords

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