English

Finite totally $k$-closed groups

Group Theory 2021-02-15 v2 Combinatorics

Abstract

For a positive integer kk, a group GG is said to be totally kk-closed if in each of its faithful permutation representations, say on a set Ω\Omega, GG is the largest subgroup of Sym(Ω)\operatorname{Sym}(\Omega) which leaves invariant each of the GG-orbits in the induced action on Ω××Ω=Ωk\Omega\times\dots\times \Omega=\Omega^k. We prove that every abelian group GG is totally (n(G)+1)(n(G)+1)-closed, but is not totally n(G)n(G)-closed, where n(G)n(G) is the number of invariant factors in the invariant factor decomposition of GG. In particular, we prove that for each k2k\geq2 and each prime pp, there are infinitely many finite abelian pp-groups which are totally kk-closed but not totally (k1)(k-1)-closed. This result in the special case k=2k=2 is due to Abdollahi and Arezoomand. We pose several open questions about total kk-closure.

Keywords

Cite

@article{arxiv.2012.01773,
  title  = {Finite totally $k$-closed groups},
  author = {Dmitry Churikov and Cheryl E. Praeger},
  journal= {arXiv preprint arXiv:2012.01773},
  year   = {2021}
}
R2 v1 2026-06-23T20:41:52.920Z