Large groups and their periodic quotients

A. Yu. Olshanskii, D. V. Osin

Published 2006-01-24, updated 2006-07-31Version 2

We first give a short group theoretic proof of the following result of Lackenby. If $G$ is a large group, $H$ is a finite index subgroup of $G$ admitting an epimorphism onto a non--cyclic free group, and $g$ is an element of $H$, then the quotient of $G$ by the normal subgroup generated by $g^n$ is large for all but finitely many $n\in \mathbb Z$. In the second part of this note we use similar methods to show that for every infinite sequence of primes $(p_1, p_2, ...)$, there exists an infinite finitely generated periodic group $Q$ with descending normal series $Q=Q_0\rhd Q_1\rhd ... $, such that $\bigcap_i Q_i=\{1\} $ and $Q_{i-1}/Q_i$ is either trivial or abelian of exponent $p_i$.