Weak diamond and Galvin’s property

Shimon Garti

doi:https://doi.org/10.1007/s10998-016-0153-0

Weak diamond and Galvin’s property

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

Abstract

Let κ be an infinite cardinal, and 2κ<λ≤2κ+. We prove that if there is a weak diamond on κ⁺ then every {Cα:α<λ}⊆Dκ+ satisfies Galvin’s property. On the other hand, Galvin’s property is consistent with the failure of the weak diamond (and even with Martin’s axiom in the case of ℵ₁). We derive some consequences about weakly inaccessible cardinals. We also prove that the negation of a similar property follows from the proper forcing axiom.

Original language	American English
Pages (from-to)	128-136
Number of pages	9
Journal	Periodica Mathematica Hungarica
Volume	74
Issue number	1
DOIs	https://doi.org/10.1007/s10998-016-0153-0
State	Published - 1 Mar 2017
Externally published	Yes

Keywords

Galvin’s property
Martin’s axiom
Proper forcing axiom
Weak diamond
Weakly inaccessible cardinals

All Science Journal Classification (ASJC) codes

General Mathematics

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https://doi.org/10.1007/s10998-016-0153-0

Cite this

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abstract = "Let κ be an infinite cardinal, and 2κ<λ≤2κ+. We prove that if there is a weak diamond on κ+ then every {Cα:α<λ}⊆Dκ+ satisfies Galvin{\textquoteright}s property. On the other hand, Galvin{\textquoteright}s property is consistent with the failure of the weak diamond (and even with Martin{\textquoteright}s axiom in the case of ℵ1). We derive some consequences about weakly inaccessible cardinals. We also prove that the negation of a similar property follows from the proper forcing axiom.",

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N2 - Let κ be an infinite cardinal, and 2κ<λ≤2κ+. We prove that if there is a weak diamond on κ+ then every {Cα:α<λ}⊆Dκ+ satisfies Galvin’s property. On the other hand, Galvin’s property is consistent with the failure of the weak diamond (and even with Martin’s axiom in the case of ℵ1). We derive some consequences about weakly inaccessible cardinals. We also prove that the negation of a similar property follows from the proper forcing axiom.

AB - Let κ be an infinite cardinal, and 2κ<λ≤2κ+. We prove that if there is a weak diamond on κ+ then every {Cα:α<λ}⊆Dκ+ satisfies Galvin’s property. On the other hand, Galvin’s property is consistent with the failure of the weak diamond (and even with Martin’s axiom in the case of ℵ1). We derive some consequences about weakly inaccessible cardinals. We also prove that the negation of a similar property follows from the proper forcing axiom.

KW - Galvin’s property

KW - Martin’s axiom

KW - Proper forcing axiom

KW - Weak diamond

KW - Weakly inaccessible cardinals

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JO - Periodica Mathematica Hungarica

JF - Periodica Mathematica Hungarica

IS - 1

ER -

Weak diamond and Galvin’s property

Abstract

Keywords

All Science Journal Classification (ASJC) codes

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