Principal ideal

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 ideals in commutative unital rings depends only on the ideal, viewed abstractly as a module over the commutative unital ring. The corresponding module property that the ideal must satisfy is: cyclic module
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Definition for commutative rings

Symbol-free definition

An ideal in a commutative unital ring is termed a principal ideal if it is the ideal generated by a single element of the ring.

Definition with symbols

An ideal ${\displaystyle I}$ in a ring ${\displaystyle R}$ is termed a principal ideal if there exists an ${\displaystyle x}$ in ${\displaystyle R}$ such that ${\displaystyle I=Rx}$.

Definition for noncommutative rings

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