Direct product of UT(3,p) and Zp

This article is about a family of groups with a parameter that is prime. For any fixed value of the prime, we get a particular group.
View other such prime-parametrized groups

Definition

Let ${\displaystyle p}$ be a prime number. This group is defined as the external direct product of unitriangular matrix group:UT(3,p) (order ${\displaystyle p^3}$) and the group of prime order ${\displaystyle {\mathbb{Z}}_p}$. The whole group has order ${\displaystyle p^4}$.

GAP implementation

For ${\displaystyle p\ne 2}$, the group has GAP ID ${\displaystyle (p^4,12)}$. For ${\displaystyle p=2}$, the group is direct product of D8 and Z2 and has GAP ID ${\displaystyle (16,11)}$.