Associative algebra: Difference between revisions

This article is about a standard (though not very rudimentary) definition in an area related to, but not strictly part of, group theory

Definition

An associative algebra over a base ring ${\displaystyle R}$ is defined as a ring ${\displaystyle A}$, along with the structure of a ${\displaystyle R}$-module to ${\displaystyle A}$.

In the particular case when ${\displaystyle R}$ and ${\displaystyle A}$ are both unital rings, this is equivalent to saying that we require an embedding of ${\displaystyle R}$ as a sub (unital ring) of ${\displaystyle A}$.

We typically studiy algebras over a field, which are just vector spaces over the field equipped with a suitable compatible multiplication.

Sometimes, we also look at the non-associative notion of algebra, where we do not assume associativity of the multiplication for ${\displaystyle A}$.

Related notions

• Coalgebra
• Bialgebra
• Hopf algebra
• Group algebra