Non-permutation invariant Borel quantifiers
Abstract
Every permutation invariant Borel subset of the space of countable structures is definable in ω1ω by a theorem of Lopez-Escobar. We prove variants of this theorem relative to fixed relations and fixed non-permutation invariant quantifiers. Moreover we show that for every closed subgroup G of the symmetric group S∞, there is a closed binary quantifier Q such that the G-invariant subsets of the space of countable structures are exactly the ω1ω(Q)-definable sets.
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