Zbl.No: 559.04009
Autor: Baumgartner, James E.; Erdös, Paul; Higgs, D.
Title: Cross-cuts in the power set of an infinite set. (In English)
Source: Order 1, 139-145 (1984).
Review: Authors' abstract: ``In the power set P(E) of a set E, the sets of a fixed finite cardinality k form a ``cross-cut'', that is, a maximal unordered set C such that if X,Y\subseteq E satisfy X\subseteq Y, X\subseteq some X' in C, and Y\supseteq some Y' in C, then X\subseteq Z\subseteq Y for some Z in C. For E = \omega, \omega1 and \omega2, it is shown with the aid of the continuum hypothesis that P(E) has cross-cuts consisting of infinite sets with infinite complements, and somewhat stronger results are proved for \omega and \omega1.''
Reviewer: N.H.Williams
Classif.: * 04A20 Combinatorial set theory 06A06 Partial order 04A30 Continuum hypothesis and generalizations
Keywords: power set; sets of a fixed finite cardinality; cross-cut; maximal unordered set; continuum hypothesis
