Maximal ideal: Difference between revisions

This article defines a property of an ideal in a commutative unital ring |View other properties of ideals in commutative unital rings

This property of an ideal in a ring is equivalent to the property of the quotient ring being a/an: field | View other quotient-determined properties of ideals in commutative unital rings

This article is about a basic definition in commutative algebra. View a complete list of basic definitions in commutative algebra

Definition

Symbol-free definition

An ideal in a commutative unital ring (or more generally, in any commutative ring) is termed maximal if it is proper (not the whole ring) and it satisfies the following equivalent conditions:

• There is no ideal of the ring properly in between this ideal and the whole ring
• The quotient of the ring by this ideal is a field
• The natural action of ${\displaystyle R}$ on ${\displaystyle R/M}$ makes ${\displaystyle R/M}$ into a simple ${\displaystyle R}$-module.

Definition with symbols

An ideal ${\displaystyle M}$ in a commutative ring ${\displaystyle R}$ is termed maximal if it satisfies the following equivalent conditions:

• For any ideal ${\displaystyle J}$ such that ${\displaystyle M}$ ≤ ${\displaystyle J}$ ≤ ${\displaystyle R}$, ${\displaystyle J}$ is equal either to ${\displaystyle M}$ or to ${\displaystyle R}$.
• The quotient ring ${\displaystyle R/M}$ is a field.