Supercompactness and level by level equivalence are compatible with indestructibility for strong compactness
Abstract
It is known that if $\kappa< \lambda$ are such that κ is indestructibly supercompact and λ is 2λ supercompact, then level by level equivalence between strong compactness and supercompactness fails. We prove a theorem which points towards this result being best possible. Specifically, we show that relative to the existence of a supercompact cardinal, there is a model for level by level equivalence between strong compactness and supercompactness containing a supercompact cardinal κ in which κ’s strong compactness is indestructible under κ-directed closed forcingOther Versions
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How can I increase my downloads?Citations of this work
Indestructible strong compactness and level by level inequivalence.Arthur W. Apter -2013 -Mathematical Logic Quarterly 59 (4-5):371-377.
Indestructibility under adding Cohen subsets and level by level equivalence.Arthur W. Apter -2009 -Mathematical Logic Quarterly 55 (3):271-279.
A universal indestructibility theorem compatible with level by level equivalence.Arthur W. Apter -2015 -Archive for Mathematical Logic 54 (3-4):463-470.
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How large is the first strongly compact cardinal? or a study on identity crises.Menachem Magidor -1976 -Annals of Mathematical Logic 10 (1):33-57.
On certain indestructibility of strong cardinals and a question of Hajnal.Moti Gitik &Saharon Shelah -1989 -Archive for Mathematical Logic 28 (1):35-42.
Indestructibility and the level-by-level agreement between strong compactness and supercompactness.Arthur W. Apter &Joel David Hamkins -2002 -Journal of Symbolic Logic 67 (2):820-840.
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