Countable Fréchet Boolean groups: An independence result
From MaRDI portal
Publication:3399192
DOI10.2178/JSL/1245158099zbMath1233.03053OpenAlexW1982929971MaRDI QIDQ3399192
Publication date: 29 September 2009
Published in: The Journal of Symbolic Logic (Search for Journal in Brave)
Full work available at URL: http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.989.166
Structure of general topological groups (22A05) Metric spaces, metrizability (54E35) Consistency and independence results (03E35)
Related Items (16)
Mathias-Prikry and Laver type forcing; summable ideals, coideals, and \(+\)-selective filters ⋮ Intersection numbers of families of ideals ⋮ No interesting sequential groups ⋮ MORE ON FRÉCHET–URYSOHN IDEALS ⋮ Convergent sequences in topological groups ⋮ Katětov order on Borel ideals ⋮ Co-analytic mad families and definable wellorders ⋮ Mathias-Prikry and Laver-Prikry type forcing ⋮ WAYS OF DESTRUCTION ⋮ Malykhin's problem ⋮ A model with no strongly separable almost disjoint families ⋮ Precompact Fréchet topologies on abelian groups ⋮ Pseudo P-points and splitting number ⋮ TOWERS IN FILTERS, CARDINAL INVARIANTS, AND LUZIN TYPE FAMILIES ⋮ The ultrafilter and almost disjointness numbers ⋮ Invariant Ideal Axiom
Cites Work
- Fréchet--Urysohn for finite sets
- Forcing with quotients
- Some properties of C(X). I
- Subsets of \({}^ \omega\omega\) and the Fréchet-Urysohn and \(\alpha_ i\)-properties
- Spaces Fréchet-Urysohn with respect to families of subsets
- Fréchet-Urysohn for finite sets, II
- Van Douwen's diagram for dense sets of rationals
This page was built for publication: Countable Fréchet Boolean groups: An independence result
