Point-cofinite covers in the Laver model
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Publication:4930000
DOI10.1090/S0002-9939-10-10407-9zbMath1200.03038arXiv0910.4063MaRDI QIDQ4930000
Publication date: 27 September 2010
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0910.4063
Consistency and independence results (03E35) Foundations: limits and generalizations, elementary topology of the line (26A03) Cardinal characteristics of the continuum (03E17)
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Selective covering properties of product spaces ⋮ Dowker-type example and Arhangelskii's \(\alpha_2\)-property ⋮ Modifications of sequence selection principles ⋮ PRODUCTS OF HUREWICZ SPACES IN THE LAVER MODEL ⋮ Sequence selection principles for quasi-normal convergence ⋮ Unbounded towers and products ⋮ Principle \(\mathrm{S}_1(\mathcal{P}, \mathcal{R})\): ideals and functions ⋮ Selective covering properties of product spaces, II: $\gamma $ spaces ⋮ Selection principles in the Laver, Miller, and Sacks models ⋮ On Ohta-Sakai's properties of a topological space
Cites Work
- Unnamed Item
- Hereditarily Hurewicz spaces and Arhangel'skii sheaf amalgamations
- \(\gamma\)-sets and other singular sets of real numbers
- The sequence selection properties of \(C_p(X)\)
- Selection principles related to \(\alpha\)-properties
- Some properties of C(X). I
- Subsets of \({}^ \omega\omega\) and the Fréchet-Urysohn and \(\alpha_ i\)-properties
- On the consistency of Borel's conjecture
- \(C_p(X)\) and Arhangel'skiĭ's \(\alpha_i\)-spaces
- The combinatorics of Borel covers
- Combinatorics of open covers. I: Ramsey theory
- The combinatorics of open covers. II
- Menger's and Hurewicz's Problems: Solutions from "The Book" and refinements
- Mapping a set of reals onto the reals
- Combinatorial Cardinal Characteristics of the Continuum
- Two Classes of Frechet-Urysohn Spaces
- Iterated perfect-set forcing
- Hereditary topological diagonalizations and the Menger-Hurewicz Conjectures
- Continuous images of sets of reals
