English

On TFU extensions in LCA groups

Group Theory 2024-03-05 v1 General Topology

Abstract

Let \ell be the category of all locally compact abelian (LCA) groups. Let GG\in\ell and HGH\subseteq G. The first Ulm subgroup of GG is denoted by G(1)G^{(1)} and the closure of HH by H\overline{H}. A proper short exact sequence 0AϕBψC00\to A\stackrel{\phi}{\to} B\stackrel{\psi}{\to} C\to 0 in \ell is said to be a TFUTFU extension if 0A(1)ϕB(1)ψC(1)00\to \overline{A^{(1)}}\stackrel{\overline{\phi}}{\to} \overline{B^{(1)}}\stackrel{\overline{\psi}}{\to} \overline{C^{(1)}}\to 0 is a proper short exact sequence where ϕ=ϕA(1)\overline{\phi}=\phi\mid_{\overline{A^{(1)}}} and ψ=ψB(1)\overline{\psi}=\psi\mid_{\overline{B^{(1)}}}. We introduce some results on TFUTFU extensions. Also, we establish conditions under which the TFUTFU extensions split.

Cite

@article{arxiv.2210.16526,
  title  = {On TFU extensions in LCA groups},
  author = {Aliakbar Alijani},
  journal= {arXiv preprint arXiv:2210.16526},
  year   = {2024}
}
R2 v1 2026-06-28T04:45:44.489Z