Classifying invariants for E1: A tail of a generic real
Abstract
Let E be an analytic equivalence relation on a Polish space. We introduce a framework for studying the possible "reasonable" complete classifications and the complexity of possible classifying invariants for E, such that: (1) the standard results and intuitions regarding classifications by countable structures are preserved in this framework; (2) this framework respects Borel reducibility; (3) this framework allows for a precise study of the possible invariants of certain equivalence relations which are not classifiable by countable structures, such as E1. In this framework we show that E1 can be classified, with classifying invariants which are -sequences of E0-classes where =b, and it cannot be classified in such a manner if <add(B). These results depend on analyzing the following sub-model of a Cohen real extension, introduced by Kanovei-Sabok-Zapletal (2013) and Larson-Zapletal (2020). Let <cn:\,n<ω> be a generic sequence of Cohen reals, and define the tail intersection model M=n<ωV[<cm:\,m≥ n>]. An analysis of reals in M will provide lower bounds for the possible invariants for E1. We also extend the characterization of turbulence from Larson-Zapletal (2020) in terms of intersection models.
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