Switch to: References

Citations of:

Possible behaviours for the Mitchell ordering

Annals of Pure and Applied Logic 65 (2):107-123 (1993)

Add citations

You must login to add citations.

Infinite decreasing chains in the Mitchell order.Omer Ben-Neria & Sandra Müller - 2021 - Archive for Mathematical Logic 60 (6):771-781.details It is known that the behavior of the Mitchell order substantially changes at the level of rank-to-rank extenders, as it ceases to be well-founded. While the possible partial order structure of the Mitchell order below rank-to-rank extenders is considered to be well understood, little is known about the structure in the ill-founded case. The purpose of the paper is to make a first step in understanding this case, by studying the extent to which the Mitchell order can be ill-founded. Our (...) Download Export citation Bookmark
The structure of the Mitchell order – II.Omer Ben-Neria - 2015 - Annals of Pure and Applied Logic 166 (12):1407-1432.details Download Export citation Bookmark 3 citations
Indestructibility and measurable cardinals with few and many measures.Arthur W. Apter - 2008 - Archive for Mathematical Logic 47 (2):101-110.details If κ < λ are such that κ is indestructibly supercompact and λ is measurable, then we show that both A = {δ < κ \| δ is a measurable cardinal which is not a limit of measurable cardinals and δ carries the maximal number of normal measures} and B = {δ < κ \| δ is a measurable cardinal which is not a limit of measurable cardinals and δ carries fewer than the maximal number of normal measures} are unbounded (...) Download Export citation Bookmark 7 citations
(1 other version)Possible behaviours for the Mitchell ordering II.James Cummings - 1994 - Journal of Symbolic Logic 59 (4):1196-1209.details We analyse the Mitchell ordering in a model where κ is P 2 κ-hypermeasurable and $2^{2^\kappa} > (2^\kappa)^+$. Download Export citation Bookmark 2 citations
Full reflection at a measurable cardinal.Thomas Jech & Jiří Witzany - 1994 - Journal of Symbolic Logic 59 (2):615-630.details A stationary subset S of a regular uncountable cardinal κ reflects fully at regular cardinals if for every stationary set $T \subseteq \kappa$ of higher order consisting of regular cardinals there exists an α ∈ T such that S ∩ α is a stationary subset of α. Full Reflection states that every stationary set reflects fully at regular cardinals. We will prove that under a slightly weaker assumption than κ having the Mitchell order κ++ it is consistent that Full Reflection (...) Download Export citation Bookmark 1 citation

1