Large cardinals and large dilators
Copyright policy )Large cardinals and large dilators
AbstractApplying Woodin's non-stationary tower notion of forcing, I prove that the existence of a supercompact cardinal κ in V and a Ramsey dilator in some small forcing extension V[G] implies the existence in V of a measurable dilator of size κ, measurable by κ-complete measures.
- Virginia Commonwealth University United States
Determinacy principles, Large cardinals, Other aspects of forcing and Boolean-valued models, Ordinal and cardinal numbers, small forcing extension, measurable dilator, Categories of sets, characterizations, Ramsey dilator, supercompact cardinal
Determinacy principles, Large cardinals, Other aspects of forcing and Boolean-valued models, Ordinal and cardinal numbers, small forcing extension, measurable dilator, Categories of sets, characterizations, Ramsey dilator, supercompact cardinal
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