Stable ordered union ultrafilters and cov(M)< c
Abstract
A union ultrafilter is an ultrafilter over the finite subsets of ω that has a base of sets of the form FU(X), where X is an infinite pairwise disjoint family and FU(X)=\ F|F∈[X]<ω\\\. The existence of these ultrafilters is not provable from the ZFC axioms, but is known to follow from the assumption that cov(M)= c. In this article we obtain various models of ZFC that satisfy the existence of union ultrafilters while at the same time cov(M)< c.
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