Krull dimension Guide, Meaning , Facts, Information and Description
In commutative algebra, the Krull dimension of a ring R, named after Wolfgang Krull (1899 - 1971), is defined to be the number of strict inclusions in a maximal chain of prime ideals. We take the supremum of chain lengths if no maximal chain can be found. For example, in the ring (Z/8Z)[x,y,z] we can consider the chain
- (2) ⊂ (2,x) ⊂ (2,x,y) ⊂ (2,x,y,z)
An alternate way of phrasing this definition is to say that the Krull dimension of R is the largest height of any prime ideal of R.
According to this convention, a integral domain of dimension zero is a field. Dedekind domains and discrete valuation rings have dimension one.
If a ring R has Krull dimension k, then the polynomial ring R[x] will have dimension between k + 1 and 2k + 1. If R is Noetherian, then the dimension of R[x] will be exactly k + 1.
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