Classification of groups of order four times a prime

We split the classification of groups of order ${\displaystyle 4p}$, ${\displaystyle p}$ prime into three cases:

• Classification of groups of order 8 (${\displaystyle p=2}$, which is more generally classified as a group of prime-cubed order.)
• Classification of groups of order four times a prime congruent to 1 modulo 4
• Classification of groups of order four times a prime congruent to 3 modulo 4

Summary of results

• The groups of order 8 are dihedral group:D8, quaternion group, cyclic group:Z8, elementary abelian group:E8 and Direct product of Z4 and Z2.

• Otherwise, in both the ${\displaystyle p\equiv 1,3\mod 4}$ cases, there are the cyclic, dihedral and dicyclic groups of order ${\displaystyle 4p}$ as well as the direct product of the cyclic group of order ${\displaystyle 2p}$ and cyclic group:Z2.

• • If ${\displaystyle p\equiv 1\mod 4}$ there is an additional group - the semidirect product of cyclic group of order ${\displaystyle p}$ by unique cyclic subgroup of order 4 in its automorphism group (which is the multiplicative group mod ${\displaystyle p}$)

See also

• Classification of groups of order a power of two times a prime