Classification of finite 2-groups of maximal class

This article gives a classification statement for certain kinds of groups of prime power order, subject to additional constraints.
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Statement

Let ${\displaystyle G}$ be a group of order ${\displaystyle 2^{n}}$ and nilpotency class ${\displaystyle n-1}$, where ${\displaystyle n\geq 4}$. In other words, ${\displaystyle G}$ is a 2-group that is also a Maximal class group (?). Then, ${\displaystyle G}$ has a cyclic maximal subgroup ${\displaystyle M\cong \mathbb {Z} /2^{n-1}\mathbb {Z} }$, and it is one of the following groups:

1. A dihedral group: it is a semidirect product of ${\displaystyle M}$ and a cyclic group of order two, which acts on ${\displaystyle M}$ via multiplication by -1.
2. A semidihedral group: a semidirect product of ${\displaystyle M}$ and a cyclic group of order two, which acts on ${\displaystyle M}$ via multiplication by ${\displaystyle 2^{n-2}-1}$.
3. A generalized quaternion group.

Note that in the case ${\displaystyle n=3}$, we only get the dihedral group:D8 and the quaternion group, and no semidihedral group.

Related facts

• Classification of finite p-groups with cyclic maximal subgroup
• Classification of finite 3-groups of maximal class
• Finite non-abelian 2-group has maximal class iff its abelianization has order four

References

Textbook references

• Finite Groups by Daniel Gorenstein, ISBN 0821843427, Page 194, Section 5.4 (p-groups of small depth), Theorem 4.5, ^{More info}