Galvin's property at large cardinals and an application to partition calculus

Abstract

In the first part of this paper, we explore the possibility for a very large cardinal to carry a -complete ultrafilter without Galvin's property. In this context, we prove the consistency of every ground model -complete ultrafilter extends to a non-Galvin one. Oppositely, it is also consistent that every ground model -complete ultrafilter extends to a P-point ultrafilter, hence to another one satisfying Galvin's property. Finally, we apply this property to obtain consistently new instances of the classical problem in partition calculus λ→(λ,ω+1)2.

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