English

Finiteness conditions for the weak commutativity construction

Group Theory 2019-07-02 v1

Abstract

The operator, χ\chi , of weak commutativity between isomorphic groups GG and GφG^{\varphi } was introduced by Sidki as \begin{equation*} \chi (G)=\left\langle G \cup G^{\varphi }\mid \lbrack g,g^{\varphi }]=1\,\forall \,g\in G\right\rangle \text{.} \end{equation*} It is known that the operator χ\chi preserves group properties such as finiteness, solubility and also nilpotency for finitely generated groups. We prove that if GG is a locally finite group with exp(G)=nexp(G)=n, then χ(G)\chi(G) is locally finite and has finite nn-bounded exponent. Further, we examine some finiteness criteria for the subgroup D(G)=[g1,g2φ]giGχ(G)D(G) = \langle [g_1,g_2^{\varphi}] \mid g_i \in G\rangle \leqslant \chi(G) in terms of the set {[g1,g2φ]giG}\{[g_1,g_2^{\varphi}] \mid g_i \in G\}.

Keywords

Cite

@article{arxiv.1907.00508,
  title  = {Finiteness conditions for the weak commutativity construction},
  author = {Raimundo Bastos and Bruno Lima and Ricardo Nunes},
  journal= {arXiv preprint arXiv:1907.00508},
  year   = {2019}
}
R2 v1 2026-06-23T10:08:08.295Z