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Auteurs principaux: Gavalová, Viera, Mejía, Diego Alejandro
Format: Preprint
Publié: 2022
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Accès en ligne:https://arxiv.org/abs/2212.05185
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author Gavalová, Viera
Mejía, Diego Alejandro
author_facet Gavalová, Viera
Mejía, Diego Alejandro
contents We propose a reformulation of the ideal $\mathcal{N}$ of Lebesgue measure zero sets of reals modulo an ideal $J$ on $ω$, which we denote by $\mathcal{N}_J$. In the same way, we reformulate the ideal $\mathcal{E}$ generated by $F_σ$ measure zero sets of reals modulo $J$, which we denote by $\mathcal{N}^*_J$. We show that these are $σ$-ideals and that $\mathcal{N}_J=\mathcal{N}$ iff $J$ has the Baire property, which in turn is equivalent to $\mathcal{N}^*_J=\mathcal{E}$. Moreover, we prove that $\mathcal{N}_J$ does not contain co-meager sets and $\mathcal{N}^*_J$ contains non-meager sets when $J$ does not have the Baire property. We also prove a deep connection between these ideals modulo $J$ and the notion of nearly coherence of filters (or ideals). We also study the cardinal characteristics associated with $\mathcal{N}_J$ and $\mathcal{N}^*_J$. We show their position with respect to Cichoń's diagram and prove consistency results in connection with other very classical cardinal characteristics of the continuum, leaving just very few open questions. To achieve this, we discovered a new characterization of $\mathrm{add}(\mathcal{N})$ and $\mathrm{cof}(\mathcal{N})$. We also show that, in Cohen model, we can obtain many different values to the cardinal characteristics associated with our new ideals.
format Preprint
id arxiv_https___arxiv_org_abs_2212_05185
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Lebesgue measure zero modulo ideals on the natural numbers
Gavalová, Viera
Mejía, Diego Alejandro
Logic
28A05, 03E17, 03E35
We propose a reformulation of the ideal $\mathcal{N}$ of Lebesgue measure zero sets of reals modulo an ideal $J$ on $ω$, which we denote by $\mathcal{N}_J$. In the same way, we reformulate the ideal $\mathcal{E}$ generated by $F_σ$ measure zero sets of reals modulo $J$, which we denote by $\mathcal{N}^*_J$. We show that these are $σ$-ideals and that $\mathcal{N}_J=\mathcal{N}$ iff $J$ has the Baire property, which in turn is equivalent to $\mathcal{N}^*_J=\mathcal{E}$. Moreover, we prove that $\mathcal{N}_J$ does not contain co-meager sets and $\mathcal{N}^*_J$ contains non-meager sets when $J$ does not have the Baire property. We also prove a deep connection between these ideals modulo $J$ and the notion of nearly coherence of filters (or ideals). We also study the cardinal characteristics associated with $\mathcal{N}_J$ and $\mathcal{N}^*_J$. We show their position with respect to Cichoń's diagram and prove consistency results in connection with other very classical cardinal characteristics of the continuum, leaving just very few open questions. To achieve this, we discovered a new characterization of $\mathrm{add}(\mathcal{N})$ and $\mathrm{cof}(\mathcal{N})$. We also show that, in Cohen model, we can obtain many different values to the cardinal characteristics associated with our new ideals.
title Lebesgue measure zero modulo ideals on the natural numbers
topic Logic
28A05, 03E17, 03E35
url https://arxiv.org/abs/2212.05185