Connections between Kuratowski partitions of Baire spaces, measurable cardinals and precipitous ideals
Abstract
In this paper we present a few properties of K-partitions, which are partitions of Baire spaces such that all subfamilies of such a partition sum to a set with the Baire property. Among the result proven we have general existence result that state that the existence of any K-partition implies the existence of K-partition of a metrizable space as well as existence of K-partition of a compact space implies the existence of K-partition of a completely metrizable space. We also prove some connections between existence of K-partitions and existence of precipitous ideals as well as measurable cardinals. There are also outlined possible connection with real-measurable cardinals, extensions of Lebesgue measure on the closed interval and density topologies.
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