# Equivalence of definitions of Cohen-Macaulay ring

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Revision as of 04:34, 18 July 2013 by Vipul (talk | contribs) (Vipul moved page Equivalence of definitions of Cohen-Macaulay to Equivalence of definitions of Cohen-Macaulay ring)

This article gives a proof/explanation of the equivalence of multiple definitions for the term Cohen-Macaulay ringView a complete list of pages giving proofs of equivalence of definitions

## The definitions that we have to prove as equivalent

The ring is assumed to be Noetherian.

- For every maximal ideal, the depth equals the codimension
- For every prime ideal, the depth equals the codimension
- For every ideal, the depth equals the codimension

Note that (3) implies (2) implies 1, so we need to show that (1) implies (3). In other words, we need to show that assuming depth = codimension for *maximal* ideals is enough to show that depth = codimension for *all* ideals.