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On groups with large verbal quotients

Francesca Lisi, Luca Sabatini

Abstract

Let $w=w(x_1,...,x_n)$ be a word, i.e. an element of the free group $F = \langle x_1,...,x_n \rangle$. The verbal subgroup $w(G)$ of a group $G$ is the subgroup generated by the set $\{ w(x_1,...,x_n) : x_1,...,x_n \in G \}$ of all $w$-values in $G$. Following J. González-Sánchez and B. Klopsch, a group $G$ is $w$-maximal if $|H:w(H)| < |G:w(G)|$ for every $H<G$. In this paper we give new results on $w$-maximal groups, and study the weaker condition in which the previous inequality is not strict. Some applications are given: for example, if a finite group has a solvable (resp. nilpotent) section of size $n$, then it has a solvable (resp. nilpotent) subgroup of size at least $n$.

On groups with large verbal quotients

Abstract

Let be a word, i.e. an element of the free group . The verbal subgroup of a group is the subgroup generated by the set of all -values in . Following J. González-Sánchez and B. Klopsch, a group is -maximal if for every . In this paper we give new results on -maximal groups, and study the weaker condition in which the previous inequality is not strict. Some applications are given: for example, if a finite group has a solvable (resp. nilpotent) section of size , then it has a solvable (resp. nilpotent) subgroup of size at least .
Paper Structure (11 sections, 21 theorems, 23 equations)

This paper contains 11 sections, 21 theorems, 23 equations.

Key Result

Proposition 1.1

Let $G$ be a finite group. If $G$ has a solvable (resp. nilpotent) section of size $n$, then it has a solvable (resp. nilpotent) subgroup of size at least $n$.

Theorems & Definitions (45)

  • Definition
  • Definition
  • Proposition 1.1
  • Theorem 1.2
  • Theorem 1.3
  • Lemma 2.1
  • proof
  • Remark 2.2
  • Lemma 2.3
  • proof
  • ...and 35 more