Catenary ring: Difference between revisions

This article defines a property of commutative unital rings; a property that can be evaluated for a commutative unital ring
View all properties of commutative unital rings
VIEW RELATED: Commutative unital ring property implications | Commutative unital ring property non-implications |Commutative unital ring metaproperty satisfactions | Commutative unital ring metaproperty dissatisfactions | Commutative unital ring property satisfactions | Commutative unital ring property dissatisfactions

Definition

A commutative unital ring is said to be catenary if it is Noetherian satisfies the following condition:

If ${\displaystyle P<P_{1}<P_{2}<Q}$ is a strictly ascending chain of prime ideals, and ${\displaystyle P'}$ is a prime ideal between ${\displaystyle P}$ and ${\displaystyle Q}$, then there is either a prime ideal between ${\displaystyle P}$ and ${\displaystyle P'}$ or a prime ideal between ${\displaystyle P'}$ and ${\displaystyle Q}$.

Relation with other properties

Stronger properties

• Polynomial ring over a field
• Affine ring over a field: For full proof, refer: Affine implies catenary
• Principal ideal domain
• Universally catenary ring
• Cohen-Macaulay ring

Weaker properties

• Noetherian ring