Cohen-Macaulay implies universally catenary: Difference between revisions
(New page: {{curing property implication}} ==Statement== ===Property-theoretic statement=== The property of commutative unital rings of being a Cohen-Macaulay ring is ''stronger'' than the...) |
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Latest revision as of 16:19, 12 May 2008
This article gives the statement and possibly, proof, of an implication relation between two commutative unital ring properties. That is, it states that every commutative unital ring satisfying the first commutative unital ring property must also satisfy the second commutative unital ring property
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Statement
Property-theoretic statement
The property of commutative unital rings of being a Cohen-Macaulay ring is stronger than the property of being a universally catenary ring.
Verbal statement
Any Cohen-Macaulay ring is universally catenary.
Definitions used
Cohen-Macaulay ring
Further information: Cohen-Macaulay ring
Catenary ring
Further information: Catenary ring
Universally catenary ring
Further information: Universally catenary ring
Facts used
Proof
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References
- Book:Eisenbud, Page 457, Corollary 18.10