Definition:Conjugation on Algebra

Definition
Let $A = \left({A_F, \oplus}\right)$ be an algebra over a field.

Let $C: A_F \to A_F$ be a mapping such that:
 * $\forall a \in A: C \left({C \left({a}\right)}\right) = a$
 * $\forall a, b \in A: C \left({a \oplus b}\right) = C \left({b}\right) \oplus C \left({a}\right)$

Then $C$ is a conjugation on $A$.

Conjugate
If $a \in A$, then $C \left({a}\right)$ is the conjugate of $a$.

Notation
$C \left({a}\right)$ is usually written $a^*$ in the general context of algebras.

When $A$ is the set of complex numbers, $C \left({a}\right)$ is usually written $\overline a$ and is referred to as the complex conjugate of $a$.