arXiv:1306.4940 Abstract | arXiv Analytics

arXiv:1306.4940 [math.LO]Abstract References Reviews Resources

Weak Rudin-Keisler reductions on projective ideals

Published 2013-06-20, updated 2014-06-18Version 5

We consider a slightly modified form of the standard Rudin-Keisler order on ideals and demonstrate the existence of complete (with respect to this order) ideals in various projective classes. Using our methods, we obtain a simple proof of Hjorth's theorem on the existence of a complete $\mathbf \Pi^1_1$ equivalence relation. Our proof of Hjorth's theorem enables us (under PD) to generalize his result to the classes of $\mathbf \Pi^1_{2n+1}$ equivalence relations.

Comments: 11 pages

Categories: math.LO, math.GR

Subjects: 03E15, 03E60, 03E05, 28A05

Keywords: weak rudin-keisler reductions, projective ideals, equivalence relation, hjorths theorem enables, standard rudin-keisler order

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