Quasi-unmixed ring algebra ,[] specifically in the theory of commutative rings , a quasi-unmixed ring is a Noetherian ring such that for each prime ideal p , the completion of the localization Ap is equidimensional , i.e. for each minimal prime ideal q in the completion, = the Krull dimension of Ap .A Noetherian integral domain is quasi-unmixed if and only if it satisfies Nagata's altitude formula . a ring in which the unmixed theorem , which characterizes a Cohen–Macaulay ring , holds for integral closure of an ideal ; specifically, for a Noetherian ring, the following are equivalent:Noetherian local ring is said to be formally catenary if for every prime ideal, is quasi-unmixed. As it turns out, this notion is redundant: Ratliff has shown that a Noetherian local ring is formally catenary if and only if it is universally catenary .
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