The Stone-Cech compactification of the natural numbers bN, or equivalently,
the space of ultrafilters on the subsets of omega, is a well-studied space with
interesting properties. If one replaces the subsets of omega by partitions of
omega, one can define corresponding, non-homeomorphic spaces of partition
ultrafilters. It will be shown that these spaces still have some of the nice
properties of bN, even though none is homeomorphic to bN. Further, in a
particular space, the minimal height of a tree pi-base and P-points are
investigated

Halbeisen, Lorenz

Loewe, Benedikt

English

arXiv

AbstractThe Stone–Čech compactification of the natural numbers βω (or equivalently, the space of ultrafilters on the subsets of ω) is a well-studied space with interesting properties. Replacing the subsets of ω by partitions of ω in the construction of the ultrafilter space gives non-homeomorphic spaces of partition ultrafilters corresponding to βω. We develop a general framework for spaces of this type and show that the spaces of partition ultrafilters still have some of the nice properties of βω, even though none of them is homeomorphic to βω. Further, in a particular space, the minimal height of a tree π-base and P-points are investigate

Löwe, Benedikt

Elsevier - Publisher Connector 

Ultrafilter spaces on the semilattice of partitions 

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Ultrafilter spaces on the semilattice of partitions

Abstract

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Elsevier - Publisher Connector

Elsevier - Publisher Connector