On Monoid Graded Local Rings
Rings and Algebras
2011-08-19 v2
Abstract
Let be a cancelation monoid with the neutral element . Consider a -graded ring , which is not necessarily commutative. It is proved that , the degree- part of , is a local ring in the classical sense if and only if the graded two-sided ideal of generated by all non-invertible homogeneous elements is a proper ideal. Defining a -graded local ring in terms of this equivalence, it is proved that any two minimal homogeneous generating sets of a finitely generated -graded -module have the same number of generators, and furthermore, that most of the basic homological properties of the local ring hold true for (at least) in the -graded context.
Cite
@article{arxiv.1108.0258,
title = {On Monoid Graded Local Rings},
author = {Huishi Li},
journal= {arXiv preprint arXiv:1108.0258},
year = {2011}
}
Comments
24 pages with a few corrections and minor changes