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Base matrices of various heights

Part of: Set theory

Published online by Cambridge University Press:  20 April 2023

Jörg Brendle Open the ORCID record for Jörg Brendle [Opens in a new window]
Jörg Brendle*
Affiliation:
Graduate School of System Informatics, Kobe University, Rokko-dai 1-1, Nada-ku, Kobe 657-8501, Japan
*
e-mail: brendle@kobe-u.ac.jp
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Abstract

A classical theorem of Balcar, Pelant, and Simon says that there is a base matrix of height ${\mathfrak h}$, where ${\mathfrak h}$ is the distributivity number of ${\cal P} (\omega ) / {\mathrm {fin}}$. We show that if the continuum ${\mathfrak c}$ is regular, then there is a base matrix of height ${\mathfrak c}$, and that there are base matrices of any regular uncountable height $\leq {\mathfrak c}$ in the Cohen and random models. This answers questions of Fischer, Koelbing, and Wohofsky.

Keywords

Base matrixrefining matrixdistributivity numbersplitting number

MSC classification

Primary: 03E17: Cardinal characteristics of the continuum
Secondary: 03E05: Other combinatorial set theory 03E35: Consistency and independence results
Type
Article
Information
Canadian Mathematical Bulletin , Volume 66 , Issue 4 , December 2023 , pp. 1237 - 1243
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Copyright
© The Author(s), 2023. Published by Cambridge University Press on behalf of The Canadian Mathematical Society

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Footnotes

This work was partially supported by Grant-in-Aid for Scientific Research (C) 18K03398 from the Japan Society for the Promotion of Science.

References

Balcar, B., Pelant, J., and Simon, P., The space of ultrafilters on N covered by nowhere dense sets . Fund. Math. 110(1980), 1124.CrossRefGoogle Scholar
Bartoszyński, T. and Judah, H., Set theory: On the structure of the real line, A K Peters, Wellesley, MA, 1995.CrossRefGoogle Scholar
Baumgartner, J. and Dordal, P., Adjoining dominating functions , J. Symbolic Logic 50(1985), 94101.CrossRefGoogle Scholar
Blass, A., Combinatorial cardinal characteristics of the continuum . In: Foreman, M. and Kanamori, A. (eds.), Handbook of set theory , Springer, Dordrecht, 2010, pp. 395489.CrossRefGoogle Scholar
Brendle, J. and Fischer, V., Mad families, splitting families, and large continuum . J. Symbolic Logic 76(2011), 198208.CrossRefGoogle Scholar
Dow, A. and Shelah, S., On the cofinality of the splitting number . Indag. Math. 29(2018), 382395.CrossRefGoogle Scholar
Fischer, V., Koelbing, M., and Wohofsky, W., Refining systems of mad families. Israel J. Math. (to appear).Google Scholar
Fischer, V., Koelbing, M., and Wohofsky, W., Games on base matrices. Notre Dame J. Formal Logic (to appear).Google Scholar
Halbeisen, L. (ed.), Combinatorial set theory: With a gentle introduction to forcing, 2nd ed., Springer, London, 2017.CrossRefGoogle Scholar