De-noetherizing Cohen-Macaulay rings
Abstract
We introduce a new class of commutative {non-noetherian} rings, called -subperfect rings, generalizing the almost perfect rings that have been studied recently by Fuchs-Salce. For an integer , the ring is -subperfect if every maximal regular sequence in has length and the total ring of quotients of for any ideal generated by a regular sequence is a perfect ring in the sense of Bass. We define an extended Cohen-Macaulay ring as a commutative ring that has noetherian prime spectrum and each localization at a maximal ideal is ht()-subperfect. In the noetherian case, these are precisely the classical Cohen-Macaulay rings. Several relevant properties are proved reminiscent of those shared by Cohen-Macaulay rings.
Cite
@article{arxiv.1712.01753,
title = {De-noetherizing Cohen-Macaulay rings},
author = {Laszlo Fuchs and Bruce Olberding},
journal= {arXiv preprint arXiv:1712.01753},
year = {2017}
}
Comments
30 pages, comments welcome