Characterized subgroups on the unit circle

Abstract

Given an ideal I on ω, a subgroup H of the unit circle T is said to be I-characterized if there exists an integer sequence a=(an: n ∈ ω) such that H=Ha(I):= \x∈T: I-n ∞ anx=0\. We also consider the corresponding I-version. We provide upper bounds for the topological complexities of those subgroups in terms of the complexity of I. Moreover, we prove that Rudin--Keisler and Rudin--Blass reductions between ideals induce inclusions between the corresponding families of characterized subgroups. As a consequence, every characterized subgroup, and in particular every countable subgroup of T, is I-characterized for every meager ideal I. We also show that if the image of (an: n ∈ ω) contains arbitrarily large intervals, then every subgroup of T can be written as Ha(J) for some ideal J=JH,a. We analyze the descriptive complexity and P-properties of these ideals. Finally, we study when the equality Ha(I)=T forces supp(a)∈I. We prove this for a class of ideals satisfying a Katetov-type condition involving ED, including nowhere tall ideals as well as the ideals nwd and null. We also obtain non-inclusion results between families of I-characterized subgroups: for instance, we show that if the ideal I is tall and translation invariant then the subgroup H(2n)(I) cannot be characterized. We use our results to answer several open problems posed in the literature.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…