Definition:Special Linear Group

Definition
Let $R$ be a commutative ring with unity whose zero is $0$ and unity is $1$.

The special linear group of order $n$ on $R$ is the set of square matrices of order $n$ whose determinant is $1$.

It is a group under (conventional) matrix multiplication.

It is denoted $\operatorname{SL} \left({n, R}\right)$, or $\operatorname{SL} \left({n}\right)$ if the ring is implicit.

The ring itself is usually a standard number field, but can be any commutative ring with unity.

Also known as
Some authors prefer $\operatorname{SL}_n \left({R}\right)$ and $\operatorname{SL}_n$ over $\operatorname{SL} \left({n, R}\right)$.

Also see

 * Special Linear Group is Subgroup of General Linear Group