Mathematics – Logic
Scientific paper
2010-03-03
Mathematics
Logic
6 pages
Scientific paper
Assume that there is no quasi-measurable cardinal smaller than $2^\omega$. ($\kappa$ is quasi measurable if there exists $\kappa $-additive ideal $\ci $ of subsets of $\kappa $ such that the Boolean algebra $P(\kappa)/\ci$ satisfies c.c.c.) We show that for a c.c.c. $\sigma $-ideal I with a Borel base of subsets of an uncountable Polish space, if $\cal A$ is a point-finite family of subsets from I then there is an uncountable collection of pairwise disjoint subfamilies of $\cal A$ whose union is completely nonmeasurable i.e. its intersection with every non-small Borel set does not belong to the $\sigma $-field generated by Borel sets and the ideal I. This result is a generalization of Four Poles Theorem.
Ralowski Robert
Zeberski Szymon
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