Q-points, selective ultrafilters, and idempotents, with an application to choiceless set theory

Abstract

We study ultrafilters from the perspective of the algebra in the Cech-Stone compactification of the natural numbers, and idempotent elements therein. The first two results that we prove establish that, if p is a Q-point (resp. a selective ultrafilter) and Fp (resp. Gp) is the smallest family containing p and closed under iterated sums (resp. closed under Blass--Frol\'k sums and Rudin--Keisler images), then Fp (resp. Gp) contains no idempotent elements. The second of these results about a selective ultrafilter has the following interesting consequence: assuming a conjecture of Blass, in models of the form L( R)[p] where L( R) is a Solovay model (of ZF without choice) and p is a selective ultrafilter, there are no idempotent elements. In particular, the theory ZF plus the existence of a nonprincipal ultrafilter on ω does not imply the existence of idempotent ultrafilters, which answers a question of DiNasso and Tachtsis (Proc. Amer. Math. Soc. 146, 397-411). Following the line of obtaining independence results in ZF, we finish the paper by proving that ZF plus "every additive filter can be extended to an idempotent ultrafilter" does not imply the Ultrafilter Theorem over R, answering another question of DiNasso and Tachtsis from the same paper.

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