Wolfgang Wohofsky scite author profile

The notion of strong measure zero is studied in the context of Polish groups and general separable metric spaces. An extension of a theorem of Galvin, Mycielski and Solovay is given, whereas the theorem is shown to fail for the Baer-Specker group Z ω . The uniformity number of the ideal of strong measure zero subsets of a separable metric space is examined, providing solutions to several problems of Miller and Steprāns (Ann Pure Appl Logic 140(1-3): [52][53][54][55][56][57][58][59] 2006).

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Cofinalities of Marczewski-like ideals

Brendle

Khomskii

Wohofsky

2017

Colloq. Math.

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Games on base matrices

Fischer¹,

Koelbing²,

Wohofsky³

2022

Preprint

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A Sacks amoeba preserving distributivity of $\mathcal {P}(\omega )/\mathrm {fin}$

Spinas

Wohofsky

2021

Fund. Math.

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By iterating an increasing amoeba for Sacks forcing (implicitly introduced by Louveau, Shelah, and Veličković), we obtain a model in which h (i.e., the distributivity of P(ω)/fin) is smaller than the additivity of the Marczewski ideal (the ideal associated with Sacks forcing). The forcing is different from the usual amoeba for Sacks forcing: Unlike the latter, it has the pure decision and the Laver property, and therefore does not add Cohen reals. In our model, h < hω holds true, which answers a question by Repický who asked whether hω equals h in ZFC.

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