Strong conciseness and equationally Noetherian groups

Abstract: A word $w$ is said to be concise in a class of groups if, for every $G$ in that class such that the set of $w$-values $w{G}$ is finite, the verbal subgroup $w(G)$ is also finite. In the context of profinite groups, the notion of strong conciseness imposes a more demanding condition on $w$, requiring that $w(G)$ is finite whenever $|w{G}|< 2^{\aleph_0}$. We investigate the relation between these two properties and the notion of equationally Noetherian groups, by proving that in a profinite group $G$ with a dense equationally Noetherian subgroup, $w{G}$ is finite whenever $|w{G}|< 2^{\aleph_0}$. Consequently, we conclude that every word is strongly concise in the classes of profinite linear groups, pro-$\mathcal{C}$ completions of residually $\mathcal{C}$ linear groups and pro-$\mathcal{C}$ completions of virtually abelian-by-polycyclic groups, thereby extending well-known conciseness properties of these classes of groups.