$p$-nilpotency criteria for some verbal subgroups

Yerko Contreras Rojas; Valentina Grazian; Carmine Monetta

arXiv:2105.14474·math.GR·November 3, 2025

$p$-nilpotency criteria for some verbal subgroups

Yerko Contreras Rojas, Valentina Grazian, Carmine Monetta

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TL;DR

This paper establishes criteria based on verbal subgroup properties to determine p-nilpotency of certain terms in the lower central and derived series of finite groups, linking group-word conditions to p-nilpotency.

Contribution

It introduces new criteria connecting verbal subgroup conditions with p-nilpotency of specific series terms in finite groups, extending previous understanding.

Findings

01

p-nilpotency of lower central series terms characterized by P(γ_k,p)

02

p-nilpotency of derived series terms in soluble groups characterized by P(δ_k,p)

03

Provides necessary and sufficient conditions for p-nilpotency based on verbal subgroup properties

Abstract

Let $G$ be a finite group, let $p$ be a prime and let $w$ be a group-word. We say that $G$ satisfies $P (w, p)$ if the prime $p$ divides the order of $x y$ for every $w$ -value $x$ in $G$ of $p^{'}$ -order and for every non-trivial $w$ -value $y$ in $G$ of order divisible by $p$ . If $k \geq 2$ , we prove that the $k$ th term of the lower central series of $G$ is $p$ -nilpotent if and only if $G$ satisfies $P (γ_{k}, p)$ . In addition, if $G$ is soluble, we show that the $k$ th term of the derived series of $G$ is $p$ -nilpotent if and only if $G$ satisfies $P (δ_{k}, p)$ .

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Taxonomy

TopicsFinite Group Theory Research · Coding theory and cryptography · graph theory and CDMA systems