CHANG’S CONJECTURE, GENERIC ELEMENTARY EMBEDDINGS AND INNER MODELS FOR HUGE CARDINALS
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Publication:2795306
DOI10.1017/bsl.2015.19zbMath1371.03054OpenAlexW2579748458WikidataQ123123255 ScholiaQ123123255MaRDI QIDQ2795306
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Publication date: 21 March 2016
Published in: The Bulletin of Symbolic Logic (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/703d782a9b6de6f5fe52952cbba471a4c7aad5d3
Consistency and independence results (03E35) Inner models, including constructibility, ordinal definability, and core models (03E45) Large cardinals (03E55) Other combinatorial set theory (03E05)
Related Items (1)
Cites Work
- Smoke and mirrors: combinatorial properties of small cardinals equiconsistent with huge cardinals
- Chang's conjecture for \(\aleph_\omega\)
- Combinatorial set theory: Partition relations for cardinals
- Martin's maximum, saturated ideals, and nonregular ultrafilters. I
- Aspects of constructibility
- Canonical structure in the universe of set theory. I
- Large cardinals and definable counterexamples to the continuum hypothesis
- Calculating quotient algebras of generic embeddings
- On generic elementary embeddings
- Saturated ideals
- Collapsing successors of singulars
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