I know that every finite Engel group is a nilpotent group. Then, if $G$ is a residually finite Engel group, every finite quotient group of $G$ is a nilpotent group. Is necesseraly true that $G$ is a nilpotent group?
1 Answer
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The examples by Golod, of groups on $d\geq 3$ generators, whose $(d-1)$-generator subgroups are all nilpotent (see example 18.3.2 in "Fundamentals of the theory of groups" by Kargapolov and Merzljakov for an exposition of the construction and properties) give $p$-groups that are residually finite, Engel, yet not nilpotent.
See this survey by G. Traustason on Engel groups, for other conditions one might add to guarantee nilptency.
answered Jan 6, 2020 at 20:41