Densities and Weights of Quotients of Precompact Abelian Groups
Abstract
The topological group version of the celebrated Banach-Mazur problem asks wether every infinite topological group has a non-trivial separable quotient group. It is known that compact groups have infinite separable metrizable quotient groups. However, as dense subgroups of compact groups, precompact groups may admit no non-trivial metrizable quotient groups, so also no non-trivial separable quotient groups. In this paper, we study the least cardinal m (resp. n) such that every infinite precompact abelian group admits a quotient group with density character ≤ m (resp. with weight ≤ n). It is shown that if 2<c=c, then m=c and n=2c. A more general problem is to describe the set QW(G) of all possible weights of infinite proper quotient groups of a precompact abelian group G. We prove that for every subset E of the interval [ω, c], there exists a precompact abelian group G with QW(G)=E. If ω∈ E, then G can be chosen to be pseudocompact. In an appendix, we give an example to show that a non-totally disconnected locally compact group may admit no separable quotient groups. This answers an open problem posed in LMT.
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.