Local Noetherian domain implies equidimensional
Statement
Any local Noetherian domain is equidimensional.
Definitions used
Local Noetherian domain
Further information: local Noetherian domain
A Noetherian ring is termed a local Noetherian domain if:
- 0 is a prime ideal (and hence the unique minimal prime ideal)
- There is a unique maximal ideal
Equidimensional ring
Further information: Equidimensional ring
A Noetherian ring is termed equidimensional if:
- All its minimal prime ideals have the same dimension
- All its maximal ideals have the same codimension
Proof
The proof is by definition: in a local Noetherian domain, there is a unique maximal ideal, and a unique minimal prime ideal. Hence, by definition, all maximal ideals have the same codimension, and all minimal primes have the same dimension, so the ring is equidimensional.