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Main Authors: Herbera, Dolors, hoda, Pavel Pří
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.12459
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author Herbera, Dolors
hoda, Pavel Pří
author_facet Herbera, Dolors
hoda, Pavel Pří
contents We thoroughly investigate the trace ideals of projective modules over the endomorphism ring of a uniserial module. After the work of Dubrovin and Puninski, it is known that this class of rings provides examples of trace ideals of projective right modules that are not trace ideals of projective left modules. In this paper we further investigate when this happens, giving an intrinsic description of such trace ideals and their properties. We also use the theory associated to lifting projective modules modulo a trace ideal to give an alternative approach to Puninski's construction of a direct summand of a serial module that is not serial.
format Preprint
id arxiv_https___arxiv_org_abs_2605_12459
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Trace ideals and uniserial modules
Herbera, Dolors
hoda, Pavel Pří
Rings and Algebras
16D40, 16D70, 16L30
We thoroughly investigate the trace ideals of projective modules over the endomorphism ring of a uniserial module. After the work of Dubrovin and Puninski, it is known that this class of rings provides examples of trace ideals of projective right modules that are not trace ideals of projective left modules. In this paper we further investigate when this happens, giving an intrinsic description of such trace ideals and their properties. We also use the theory associated to lifting projective modules modulo a trace ideal to give an alternative approach to Puninski's construction of a direct summand of a serial module that is not serial.
title Trace ideals and uniserial modules
topic Rings and Algebras
16D40, 16D70, 16L30
url https://arxiv.org/abs/2605.12459