Krull dimension: Difference between revisions

Template:Curing-dimension notion

Definition

Symbol-free definition

The Krull dimension of a commutative unital ring is the supremum of lengths of descending chains of distinct prime ideals.

Definition with symbols

Let ${\displaystyle R}$ be a commutative unital ring. The Krull dimension of ${\displaystyle R}$, denoted ${\displaystyle dim(R)}$ is the supremum over all ${\displaystyle n}$ for which there exist strictly descending chains of prime ideals:

${\displaystyle P_{0}\supset P_{1}\supset \ldots \supset P_{n}}$

Related ring properties

• Zero-dimensional ring is a ring whose Krull dimension is zero. Particular examples of such rings are Artinian rings and completely local rings.
• Any integral domain which is not a field must have dimension at least one. A one-dimensional domain is an integral domain which has Krull dimension at most one. Any principal ideal domain, and more generally, any Dedekind domain, is one-dimensional.
• A finite-dimensional ring is a ring with finite Krull dimension; a finite-dimensional domain is an integral domain with finite Krull dimension.

Facts

• The polynomial ring over any Noetherian ring of finite dimension, has dimension one more than the original ring. Thus, we see that the polynomial ring in ${\displaystyle n}$ variables over a field, has dimension ${\displaystyle n}$, while the polynomial ring in ${\displaystyle n}$ variables over a principal ideal domain (or Dedekind domain) which is not a field, has dimension ${\displaystyle n+1}$
• For a Noetherian local ring, the Krull dimension equals the degree of its Hilbert-Samuel polynomial.