20 research outputs found
Ramseyan ultrafilters
We investigate families of partitions of omega which are related to special
coideals, so-called happy families, and give a dual form of Ramsey ultrafilters
in terms of partitions. The combinatorial properties of these
partition-ultrafilters, which we call Ramseyan ultrafilters, are similar to
those of Ramsey ultrafilters. For example it will be shown that dual Mathias
forcing restricted to a Ramseyan ultrafilter has the same features as Mathias
forcing restricted to a Ramsey ultrafilter. Further we introduce an ordering on
the set of partition-filters and consider the dual form of some cardinal
characteristics of the continuum
Survey on the Tukey theory of ultrafilters
This article surveys results regarding the Tukey theory of ultrafilters on
countable base sets. The driving forces for this investigation are Isbell's
Problem and the question of how closely related the Rudin-Keisler and Tukey
reducibilities are. We review work on the possible structures of cofinal types
and conditions which guarantee that an ultrafilter is below the Tukey maximum.
The known canonical forms for cofinal maps on ultrafilters are reviewed, as
well as their applications to finding which structures embed into the Tukey
types of ultrafilters. With the addition of some Ramsey theory, fine analyses
of the structures at the bottom of the Tukey hierarchy are made.Comment: 25 page