Reducibility of Equivalence Relations Arising from Nonstationary Ideals under Large Cardinal Assumptions

Pub Date : 2019-11-01 DOI:10.1215/00294527-2019-0024

D. Asperó, Tapani Hyttinen, V. Kulikov, Miguel Moreno

引用次数: 6

Abstract

Working under large cardinal assumptions, we study the Borel-reducibility between equivalence relations modulo restrictions of the non-stationary ideal on some fixed cardinal \kappa. We show the consistency of E^{\lambda^{++},\lambda^{++}}_{\lambda\text{-club}}, the relation of equivalence modulo the non-stationary ideal restricted to S^{\lambda^{++}}_\lambda in the space (\lambda^{++})^{\lambda^{++}}, being continuously reducible to E^{2,\lambda^{++}}_{\lambda^+\text{-club}}, the relation of equivalence modulo the non-stationary ideal restricted to S^{\lambda^{++}}_{\lambda^+} in the space 2^{\lambda^{++}}. Then we show that for \kappa ineffable E^{2, \kappa}_{\text{reg}}, the relation of equivalence modulo the non-stationary ideal restricted to regular cardinals in the space 2^{\kappa}, is \Sigma^1_1-complete. We finish by showing, for \Pi_2^1-indescribable \kappa, that the isomorphism relation between dense linear orders of cardinality \kappa is \Sigma^1_1-complete.

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大基数假设下由非平稳理想引起的等价关系的可约性

在大基数假设下，研究了非平稳理想在若干固定基数上的等价关系的模限制之间的borel -约可性 \kappa．我们证明了E^的一致性{\lambda＾{++}，\lambda＾{++}}＿{\lambda\text{-club}}，限制于S^的非平稳理想的等价模关系{\lambda＾{++}}＿\lambda 在空间(\lambda＾{++})^{\lambda＾{++}}，连续可约为E^{2，\lambda＾{++}}＿{\lambda^+\text{-club}}，限制于S^的非平稳理想的等价模关系{\lambda＾{++}}＿{\lambda^+} 在空间2^中{\lambda＾{++}}．然后我们来证明 \kappa 不可言喻的E^{2， \kappa}＿{\text{reg}}，在空间2^的正则基数上的非平稳理想的等价模关系{\kappa}是吗? \Sigma^1＿1-完整。我们以展示结束 \Pi2^1，难以描述 \kappa，稠密线性基序之间的同构关系 \kappa 是 \Sigma^1＿1-完整。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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