Chief length

Definition

Let ${\displaystyle G}$ be a group. The chief length of ${\displaystyle G}$ is defined to be the length of a chief series for ${\displaystyle G}$, that is, a subgroup series from ${\displaystyle G}$ to the trivial subgroup where all members are normal subgroups of ${\displaystyle G}$, and where the series cannot be refined further. More explicitly:

• A series of subgroups:

${\displaystyle G=N_{0}\geq N_{1}\geq \dots \geq N_{r}=\{e\}}$

is termed a chief series if ${\displaystyle N_{i}}$ are normal in ${\displaystyle G}$ for all ${\displaystyle i}$, ${\displaystyle N_{i+1}}$ is a proper subgroup of ${\displaystyle N_{i}}$, and there is no normal subgroup of ${\displaystyle G}$ that properly contains ${\displaystyle N_{i+1}}$ and is properly contained within ${\displaystyle N_{i}}$. In other words, the normal series cannot be refined further to another normal series.

• A series of subgroups:

${\displaystyle G=N_{0}\geq N_{1}\geq \dots \geq N_{r}=\{e\}}$

is termed a chief series if each ${\displaystyle N_{i}}$ is normal in ${\displaystyle G}$ and ${\displaystyle N_{i-1}/N_{i}}$ is a minimal normal subgroup of ${\displaystyle G/N_{i}}$.

It turns out that for a group of finite chief length, any two chief series have the same length and the lists of chief factors are the same, so this is well-defined.

Facts

• For ${\displaystyle G}$ a p-group, the chief length is equal to the logarithm of the order of the group with that prime as the base. For example, a group of order ${\displaystyle 16}$ has chief length ${\displaystyle 4}$, since ${\displaystyle 16=2^{4}}$.
• Chief length of direct product is sum of chief lengths