String algebras over local rings: admissibility and biseriality

For a path algebra over a noetherian local ground ring, the notion of an admissible ideal was defined by Raggi-C{á}rdenas and Salmer{ó}n. We provide sufficient conditions for admissibility and use them to study semiperfect module-finite algebras over local rings whose quotient by the radical is a pr...

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Bibliographic Details
Published in:arXiv.org 2023-07
Main Author: Bennett-Tennenhaus, Raphael
Format: Article
Language:English
Subjects:
Algebra
Rings (mathematics)
Strings
Online Access:Get full text
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Summary:For a path algebra over a noetherian local ground ring, the notion of an admissible ideal was defined by Raggi-C{á}rdenas and Salmer{ó}n. We provide sufficient conditions for admissibility and use them to study semiperfect module-finite algebras over local rings whose quotient by the radical is a product of copies of the residue field. We define string algebras over local ground rings and recover the notion introduced by Butler and Ringel when the ground ring is a field. We prove they are biserial in a sense of Kiričenko and Kostyukevich. We describe the syzygies of uniserial summands of the radical. We give examples of B\"{a}ckstr\"{o}m orders that are string algebras over discrete valuation rings.
ISSN:2331-8422