General linear group over a finite field

This article defines a natural number-parametrized system of algebraic matrix groups. In other words, for every field and every natural number, we get a matrix group defined by a system of algebraic equations. The definition may also generalize to arbitrary commutative unital rings, though the default usage of the term is over fields.
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For the more general family of groups over *any* field, see General linear group over a field.

Definition

In terms of dimension (finite-dimensional case)

Let ${\displaystyle n}$ be a natural number and ${\displaystyle k}$ a finite field. The general linear group of degree ${\displaystyle n}$ over ${\displaystyle k}$, denoted ${\displaystyle GL(n,k)}$, is defined in the following equivalent ways:

• ${\displaystyle GL(n,k)}$ is the group of all invertible ${\displaystyle k}$-linear maps from the vector space ${\displaystyle k^{n}}$ to itself, under composition. In other words, it is the group of automorphisms of ${\displaystyle k^{n}}$ as a ${\displaystyle k}$-vector space.
• ${\displaystyle GL(n,k)}$ is the group of all invertible ${\displaystyle n\times n}$ matrices with entries over ${\displaystyle k}$

Arithmetic functions

${\displaystyle q=p^{a}}$ here denotes the size of the finite field ${\displaystyle k}$.

Function	Value	Explanation
order	${\displaystyle (q^{n}-1)(q^{n}-q)...(q^{n}-q^{n-1})}$	In order for the matrix to have non-zero determinant, the vector in the first column cannot be the zero vector, so we have ${\displaystyle (q^{n}-1)}$ choices for such a vector. The vector in the second column must be linearly independent with the first column, giving ${\displaystyle (q^{n}-q)}$ choices. In general, the vector in the ith column must be independent of the first, second, ..., i-1th column, giving ${\displaystyle (q^{n}-q^{i-1})}$ choices. Make such a choice of vector for each column.

Particular cases

Size of field	Order of matrices	Common name for the general linear group	Order of group	Comment
2	1	Trivial group	${\displaystyle 1}$	Trivial
3	1	Cyclic group:Z2	${\displaystyle 2}$	group of prime order
4	1	Cyclic group:Z3	${\displaystyle 3}$	group of prime order
5	1	Cyclic group:Z4	${\displaystyle 4=2^{2}}$	cyclic group
2	2	Symmetric group:S3	${\displaystyle 6=2\cdot 3}$	supersolvable but not nilpotent
3	2	General linear group:GL(2,3)	${\displaystyle 48=2^{4}\cdot 3}$	solvable but not supersolvable
4	2	Alternating group:A5	${\displaystyle 60=2^{2}\cdot 3\cdot 5}$	simple non-abelian group
5	2	General linear group:GL(2,5)	${\displaystyle 480=2^{5}\cdot 3\cdot 5}$	not solvable, has a simple non-abelian subquotient.
2	3	General linear group:GL(3,2)	${\displaystyle 168=2^{3}\cdot 3\cdot 7}$	simple non-abelian group