Associative ring

This article defines a non-associative ring property: a property that an be evaluated to true or false for any non-associative ring.
View other non-associative ring properties

This article gives a basic definition in the following area: ring theory
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Definition

An associative ring, sometimes termed a ring, is a set ${\displaystyle R}$ equipped with the following operations:

• An infix binary operation ${\displaystyle +}$, called addition.
• A prefix unary operation ${\displaystyle -}$, called the negative.
• A constant element ${\displaystyle 0}$, called zero.
• A binary operation ${\displaystyle *}$, called the multiplication.

satisfying the following compatibility conditions:

• ${\displaystyle R}$ forms an abelian group with group operation ${\displaystyle +}$, inverse operation ${\displaystyle -}$, and identity element ${\displaystyle 0}$.
• ${\displaystyle R}$ satisfies the two distributivity laws:
  • ${\displaystyle a*(b+c)=(a*b)+(a*c)\ \forall \ a,b,c\in R}$
  • ${\displaystyle (a+b)*c=(a*c)+(b*c)\ \forall \ a,b,c\in R}$
• Associativity: ${\displaystyle a*(b*c)=(a*b)*c\ \forall \ a,b,c\in R}$

However, in many contexts, it is useful to study the situation where ${\displaystyle *}$ is possibly non-associative, i.e., we want to remove the last condition from the definition. We use the term non-associative ring for a ring that is not necessarily associative. Note that associative rings are non-associative rings by this definition.

A unital ring or unitary ring is a ring with an identity for multiplication, denoted ${\displaystyle 1}$. A commutative ring is a ring where the multiplication is commutative. A commutative unital ring is a ring where the multiplication is both commutative and has a unit.

Stronger notions

• An integral domain is a ring in which any product of non-zero elements is non-zero.