Trace ideals, normalization chains, and endomorphism rings
Abstract
In this paper we consider reduced (non-normal) commutative noetherian rings . With the help of conductor ideals and trace ideals of certain -modules we deduce a criterion for a reflexive -module to be closed under multiplication with scalars in an integral extension of . Using results of Greuel and Kn\"orrer this yields a characterization of plane curves of finite Cohen--Macaulay type in terms of trace ideals. Further, we study one-dimensional local rings such that that their normalization is isomorphic to the endomorphism ring : we give a criterion for this property in terms of the conductor ideal, and show that these rings are nearly Gorenstein. Moreover, using Grauert--Remmert normalization chains, we show the existence of noncommutative resolutions of singularities of low global dimensions for curve singularities.
Cite
@article{arxiv.1901.04766,
title = {Trace ideals, normalization chains, and endomorphism rings},
author = {Eleonore Faber},
journal= {arXiv preprint arXiv:1901.04766},
year = {2019}
}
Comments
V2: revision following a referee report. Final version to appear in PAMQ. V1:17 pages