One-dimensional stable rings
Abstract
A commutative ring is stable provided every ideal of containing a nonzerodivisor is projective as a module over its ring of endomorphisms. The class of stable rings includes the one-dimensional local Cohen-Macaulay rings of multiplicity at most , as well as certain rings of higher multiplicity, necessarily analytically ramified. The former are important in the study of modules over Gorenstein rings, while the latter arise in a natural way from generic formal fibers and derivations. We characterize one-dimensional stable local rings in several ways. The characterizations involve the integral closure of and the completion of in a relevant ideal-adic topology. For example, we show: If is a reduced stable ring, then there are exactly two possibilities for : (1) is a {\it Bass ring}, that is, is a reduced Noetherian local ring such that is finitely generated over and every ideal of is generated by two elements; or (2) is a {\it bad stable domain}, that is, is a one-dimensional stable local domain such that is not a finitely generated -module.
Cite
@article{arxiv.1603.02173,
title = {One-dimensional stable rings},
author = {Bruce Olberding},
journal= {arXiv preprint arXiv:1603.02173},
year = {2016}
}
Comments
to appear in Journal of Algebra, 31 pages