𝑜-bounded groups and other topological groups with strong combinatorial properties

Tsaban, Boaz

doi:10.1090/S0002-9939-05-08034-2

$o$-bounded groups and other topological groups with strong combinatorial properties
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Proc. Amer. Math. Soc. 134 (2006), 881-891 Request permission

Abstract:

We construct several topological groups with very strong combinatorial properties. In particular, we give simple examples of subgroups of $\mathbb {R}$ (thus strictly $o$-bounded) which have the Menger and Hurewicz properties but are not $\sigma$-compact, and show that the product of two $o$-bounded subgroups of $\mathbb {R}^{\mathbb {N}}$ may fail to be $o$-bounded, even when they satisfy the stronger property $\mathsf {S}_1(\mathcal {B}_{\Omega },\mathcal {B}_{\Omega })$. This solves a problem of Tkačenko and Hernandez, and extends independent solutions of Krawczyk and Michalewski and of Banakh, Nickolas, and Sanchis. We also construct separable metrizable groups $G$ of size continuum such that every countable Borel $\omega$-cover of $G$ contains a $\gamma$-cover of $G$.

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