Unitriangular matrix group

Definition

Definition as matrix group

Suppose $R$ is a commutative unital ring and $n$ is a natural number. The unitriangular matrix group, denoted $U (n, R)$ , $U T (n, R)$ , or $U L (n, R)$ , is the group, under multiplication, with $1$ s on the diagonal, $0$ s below the diagonal, and arbitrary entries above the diagonal.

Note that the symbol $U$ is also used for the unitary group, hence we use $U T$ or $U L$ to avoid confusion.

Explicitly:

$U T (n, R) = {(\begin{matrix} 1 & * & * & \dots & * \\ 0 & 1 & * & \dots & * \\ 0 & 0 & 1 & \dots & * \\ \dots & \dots & \dots & \dots & \dots \\ 0 & 0 & 0 & \dots & 1 \end{matrix}) ∣ all star-marked entries vary arbitrarily over R}$

Definition by presentation

The presentation given here is similar to the presentation used for the Steinberg group over a unital ring. Specifically, we use only those generators and relations that correspond to upper triangular matrices and discard the rest. We denote by $e_{i j} (λ)$ the matrix with 1s on the diagonal, $λ$ in the $(i, j)^{t h}$ entry, and zeros elsewhere. Then:

The following is a generating set: For every element $λ \in R$ and for $1 \leq i < j \leq n$ , include the element $e_{i j} (λ)$ .
We can get a presentation of the group using this generating set, by including the following relations:
- $e_{i j} (λ) e_{i j} (μ) = e_{i j} (λ + μ)$ (note that this in particular implies that $e_{i j} (0)$ is the identity element for all $i, j$ ).
- $[e_{i j} (λ), e_{j k} (μ)] = e_{i k} (λ μ)$ (the Steinberg group version also imposes the condition $i \neq k$ , but this constraint follows automatically in the upper triangular case because $i < j$ and $j < k$ ).
- $[e_{i j} (λ), e_{k l} (μ)] = 1$ (i.e., is the identity element) for $i \neq l, j \neq k$ .

Note that this presentation can be trimmed quite a bit. In fact, if $A$ is a generating set for the additive group of $R$ , the set:

${e_{i, i + 1} (λ) ∣ 1 \leq i \leq n - 1, λ \in A}$

is a generating set for $U T (n, R)$ , and we can work out a presentation in terms of this generating set using the relations above.

Case of a field

When $F$ is a field, the unitriangular matrix group $U T (n, F)$ can also be described as a maximal unipotent subgroup of the general linear group $G L (n, F)$ . It is also a maximal unipotent subgroup of the special linear group $S L (n, F)$ .

Case of a finite field

When $F$ is a finite field with $q$ elements and characteristic $p$ (so $q$ is a power of $p$ ), then $U T (n, F)$ is also denoted $U T (n, q)$ , and is a $p$ -Sylow subgroup of $G L (n, F) = G L (n . q)$ .

Particular cases

Value of $n$	$n (n - 1) / 2$ (the "dimension" of $U T (n, R)$ , the size is $\| R \|^{n (n - 1) / 2}$ )	Nature of unitriangular matrix group $U T (n, R)$ over a ring $R$
1	0	trivial group
2	1	isomorphic to the additive group of $R$
3	3	see unitriangular matrix group of degree three
4	6	see unitriangular matrix group of degree four

Arithmetic functions

We give here the arithmetic functions for $U T (n, R)$ .

Function	Value	Similar groups	Explanation
order	$\| R \|^{n (n - 1) / 2}$
nilpotency class	$n - 1$
derived length	$⌈ \log_{2} n ⌉$ (the smallest integer greater than or equal to $\log_{2} n$
Frattini length	PLACEHOLDER FOR INFORMATION TO BE FILLED IN: [SHOW MORE] One of the people editing this page intended to fill in this information at a later stage, but hasn't gotten around to doing it yet. If you see this placeholder for a long time, file an error report at the error reporting page. (depends both on the nature of $R$ and on $n$ )