\(\omega_1\) and \(-\omega_1\) may be the only minimal uncountable linear orders
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Publication:2469315
DOI10.1307/MMJ/1187647002zbMath1146.03037OpenAlexW1999947171MaRDI QIDQ2469315
Publication date: 5 February 2008
Published in: Michigan Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1307/mmj/1187647002
Consistency and independence results (03E35) Continuum hypothesis and Martin's axiom (03E50) Total orders (06A05)
Related Items (8)
Some results about (+) proved by iterated forcing ⋮ Forcing axioms and the continuum hypothesis ⋮ Forcing axioms and the continuum hypothesis. II: Transcending \(\omega _1\)-sequences of real numbers ⋮ On minimal non-\(\sigma\)-scattered linear orders ⋮ Uncountable strongly surjective linear orders ⋮ The comparison of various club guessing principles ⋮ A NEW MINIMAL NON-σ-SCATTERED LINEAR ORDER ⋮ A model with Suslin trees but no minimal uncountable linear orders other than \(\omega_1\) and \(- \omega_1\)
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