Supersolvable group explained

In mathematics, a group is supersolvable (or supersoluble) if it has an invariant normal series where all the factors are cyclic groups. Supersolvability is stronger than the notion of solvability.

Definition

Let G be a group. G is supersolvable if there exists a normal series

\{1\}=H0\triangleleftH1\triangleleft\triangleleftHs-1\triangleleftHs=G

Hi+1/Hi

is cyclic and each

Hi

is normal in

G

.

By contrast, for a solvable group the definition requires each quotient to be abelian. In another direction, a polycyclic group must have a subnormal series with each quotient cyclic, but there is no requirement that each

Hi

be normal in

G

. As every finite solvable group is polycyclic, this can be seen as one of the key differences between the definitions. For a concrete example, the alternating group on four points,

A4

, is solvable but not supersolvable.

Basic Properties

Some facts about supersolvable groups:

References