arXiv:1909.08078 Abstract | arXiv Analytics

arXiv:1909.08078 [math.LO]Abstract References Reviews Resources

Mad families of vector subspaces and the smallest nonmeager set of reals

Published 2019-09-17Version 1

We show that a parametrized $\diamondsuit$ principle, corresponding to the uniformity of the meager ideal, implies that the minimum cardinality of an infinite maximal almost disjoint family of block subspaces in a countable vector space is $\aleph_1$. Consequently, this cardinal invariant is $\aleph_1$ in the Miller model.

Comments: 8 pages

Categories: math.LO

Subjects: 03E17, 15A03

Keywords: smallest nonmeager set, mad families, vector subspaces, cardinal invariant, meager ideal

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arXiv:1909.08078 [math.LO]Abstract References Reviews Resources

Mad families of vector subspaces and the smallest nonmeager set of reals

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arXiv:1909.08078 [math.LO]AbstractReferencesReviewsResources

Mad families of vector subspaces and the smallest nonmeager set of reals

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arXiv:1909.08078 [math.LO]Abstract References Reviews Resources