Universally Baire sets in 2^
Abstract
We generalize the basic theory of universally Baire sets of 2ω to a theory of universally Baire subsets of 2. We show that the fundamental characterizations of the property of being universally Baire have natural generalizations that can be formulated also for subsets of 2, in particular we provide four equivalent uniform definitions in the parameter (for an infinite cardinal) characterizing for each such the class of universally Baire subsets of 2. For =ω, these definitions bring us back to the original notion of universally Baire sets of reals given by Feng, Magidor and Woodin [2].
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