English

Characterizing sequences for precompact group topologies

Group Theory 2012-06-05 v1

Abstract

A precompact group topology τ\tau on an abelian group GG is called {\em single sequence characterized} (for short, {\em ss-characterized}) if there is a sequence u=(un)\mathbf{u}= (u_n) in GG such that τ\tau is the finest precompact group topology on GG making u=(un)\mathbf{u}=(u_n) converge to zero. It is proved that a metrizable precompact abelian group (G,τ)(G,\tau) is ssss-characterized iff it is countable. For every metrizable precompact group topology τ\tau on a countably infinite abelian group GG there exists a group topology η\eta such that η\eta is strictly finer than τ\tau and the groups (G,τ)(G,\tau) and (G,η)(G,\eta) have the equal Pontryagin dual groups. We give a complete description of all ssss-characterized precompact abelian groups modulo countable ssss-characterized groups from which we derive: (1) No infinite pseudocompact abelian group is ssss-characterized. (2) An ssss-characterized precompact abelian group is hereditarily disconnected.

Keywords

Cite

@article{arxiv.1206.0587,
  title  = {Characterizing sequences for precompact group topologies},
  author = {D. Dikranjan and S. S. Gabriyelyan and V. Tarieladze},
  journal= {arXiv preprint arXiv:1206.0587},
  year   = {2012}
}

Comments

13 pages

R2 v1 2026-06-21T21:13:49.227Z