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A game‐theoretic proof of Shelah's theorem on labeled trees
Mathematical Logic Quarterly 66 (2):190-194 (2020)
Abstract
We give a new proof of a theorem of Shelah which states that for every family of labeled trees, if the cardinality κ of the family is much larger (in the sense of large cardinals) than the cardinality λ of the set of labels, more precisely if the partition relation holds, then there is a homomorphism from one labeled tree in the family to another. Our proof uses a characterization of such homomorphisms in terms of games.Other Versions
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