João Azevedo, Pavel Shumyatsky
Published 2020-09-21Version 1
Given a group-word $w$ and a group $G$, the set of $w$-values in $G$ is denoted by $G_w$ and the verbal subgroup $w(G)$ is the one generated by $G_w$. The word $w$ is concise if $w(G)$ is finite for all groups $G$ in which $G_w$ is finite. We obtain several results supporting the conjecture that the word $[u_1,\dots,u_s]$ is concise whenever the words $u_1,\dots,u_s$ are non-commutator.
On finiteness of some verbal subgroups in profinite groups
A comprehensive characterization of Property A and almost finiteness
On the rank of a verbal subgroup of a finite group
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