Definition:Unital Associative Commutative Algebra

Definition
Let $R$ be a commutative ring with unity.

Equivalence of Definitions
While, strictly speaking, the above definitions do define different objects, they are equivalent in the following sense:
 * An algebra $\left({A, *}\right)$ over $R$ that is unital, associative and commutative and whose underlying module is unitary, is identified with the ring under $R$ equal to its underlying ring together with its canonical mapping $R \to A$
 * A ring under $R$, $(A, f)$, is identified with the algebra defined by $f$.

For the detailed statements, see Equivalence of Definitions of Unital Associative Commutative Algebra.

Also see

 * Equivalence of Definitions of Unital Associative Commutative Algebra
 * Definition:Unital Associative Commutative Algebra Homomorphism