Paul Larson, Saharon Shelah
Published 2010-03-12Version 1
Working in the context of restricted forms of the Axiom of Choice, we consider the problem of splitting the ordinals below $\lambda$ of cofinality $\theta$ into $\lambda$ many stationary sets, where $\theta < \lambda$ are regular cardinals. This is a continuation of \cite{Sh835}.
Journal: Mathematical Logic Quarterly 55 (2009) 3, 299-306
Souslin trees at successors of regular cardinals
Maximal δ-separated sets in separable metric spaces and weak forms of choice
On club-like principles on regular cardinals above $\beth_ω$
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