nLab
solvable group

A group is solvable if it is a finite iterated extension of an abelian group by abelian groups. In other words, there exists a finite sequence

{1} \subset G_{1} \subset G_{2} \subset \dots \subset G_{k} = G,

in which $G_{j - 1}$ is normal in $G_{j}$ and $G_{j} / G_{j - 1}$ is abelian.

Created on June 16, 2011 17:51:04 by Zoran Škoda (161.53.130.104)