Can ideals without ccc be interesting?
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Publication:1315471
DOI10.1016/0166-8641(94)90040-XzbMath0795.54052OpenAlexW2043667610MaRDI QIDQ1315471
Publication date: 10 March 1994
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0166-8641(94)90040-x
Descriptive set theory (03E15) Classes of sets (Borel fields, (sigma)-rings, etc.), measurable sets, Suslin sets, analytic sets (28A05) Descriptive set theory (topological aspects of Borel, analytic, projective, etc. sets) (54H05)
Related Items (12)
A Fubini theorem ⋮ Covering properties of ideals ⋮ Fubini Property for Microscopic Sets ⋮ Differentiability of continuous functions in terms of Haar-smallness ⋮ On Borel sets belonging to every invariant ccc $\sigma $-ideal on $2^{\mathbb {N}}$ ⋮ Ideals without ccc ⋮ Solution of the Baire Order Problem of Mauldin ⋮ AN APPLICATION OF RECURSION THEORY TO ANALYSIS ⋮ On some $\sigma $-ideal without ccc ⋮ Ideals with bases of unbounded Borel complexity ⋮ Haar-smallest sets ⋮ Ideals without ccc and without property $ \boldsymbol( \mathbf{M} \boldsymbol)$
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