Category:Examples of Algebras over Fields
Jump to navigation
Jump to search
This category contains examples of Algebra over Field.
Let $F$ be a field.
An algebra over $F$ is an ordered pair $\struct {A, *}$ where:
- $A$ is a vector space over $F$
- $* : A^2 \to A$ is a bilinear mapping
That is, it is an algebra $\struct {A, *}$ over the ring $F$ where:
- $F$ is a field
- the $F$-module $A$ is a vector space.
Pages in category "Examples of Algebras over Fields"
The following 2 pages are in this category, out of 2 total.