Square compactness and Lindelöf trees

Archive for Mathematical Logic 63 (5):741-757 (2024)
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Abstract

We prove that every weakly square compact cardinal is a strong limit cardinal, and therefore weakly compact. We also study Aronszajn trees with no uncountable finitely splitting subtrees, characterizing them in terms of being Lindelöf with respect to a particular topology. We prove that the class of such trees is consistently non-empty and lies between the classes of Suslin and Aronszajn trees.

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10.1007/s00153-024-00918-5

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