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A baire-type theorem for cardinals
Journal of Symbolic Logic 48 (4):1082-1089 (1983)
Abstract
We shall prove the following theorem: If κ is an infinite cardinal and $\Gamma: P(\kappa) \rightarrow \operatorname{cf} \kappa$ a partition of the power-set of κ then we can find a homogeneous ▵-system of size κ such that the kernel of the ▵-system is in the same partition class as all the members of the ▵-systemLinks
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Citations of this work
Some coloring properties for uncountable cardinals.Pierre Matet - 1987 - Annals of Pure and Applied Logic 33 (C):297-307.
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