Perfect set dichotomy theorem in generalized Solovay model
Abstract
We prove that the perfect set dichotomy theorem holds in the Solovay model V ((ωω)V[G]). Namely, for every equivalence relation E on R, either R/E is well-orderable or there exists a perfect set consisting of E-inequivalent reals. Furthermore we consider a generalization of the Solovay model for an uncountable regular cardinal μ and show the perfect set dichotomy theorem for μμ also holds in that model. We establish the three element basis theorem for uncountable linear orders in the Solovay model for a weakly compact cardinal, in a general form covering the uncountable case.
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