On seminormal monoid rings
| Autor(en): | Bruns, Winfried Li, Ping Roemer, Tim |
Stichwörter: | AFFINE SEMIGROUPS; COHEN-MACAULAY; INVARIANTS; Mathematics; MONOMIALS | Erscheinungsdatum: | 2006 | Herausgeber: | ACADEMIC PRESS INC ELSEVIER SCIENCE | Journal: | JOURNAL OF ALGEBRA | Volumen: | 302 | Ausgabe: | 1 | Startseite: | 361 | Seitenende: | 386 | Zusammenfassung: | Given a seminormal affine monoid M we consider several monoid properties of M and their connections to ring properties of the associated affine monoid ring K[M] over a field K. We characterize when K[M] satisfies Serre's condition (S-2) and analyze the local cohomology of K[AI]. As an application we present criteria which imply that K[M] is Cohen-Macaulay and we give lower bounds for the depth of K[M]. Finally, the seminormality of an arbitrary affine monoid M is studied with characteristic p methods. (c) 2005 Elsevier Inc. All rights reserved. |
ISSN: | 00218693 | DOI: | 10.1016/j.jalgebra.2005.11.012 |
Show full item record
