Buchsbaum Stanley--Reisner rings with minimal multiplicity
Abstract
In this paper, we study non-Cohen--Macaulay Buchsbaum Stanley--Reisner rings with linear free resolution. In particular, for given integers , , with , , we give an upper bound on the dimension of the unique non-vanishing homology of a -dimensional Buchsbaum ring with -linear resolution and codimension . Also, we discuss about existence for such Buchsbaum rings with for any with , and prove an existence theorem in the case of using the notion of Cohen--Macaulay linear cover. On the other hand, we introduce the notion of Buchsbaum Stanley--Reisner rings with minimal multiplicity of type , which extends the notion of Buchsbaum rings with minimal multiplicity defined by Goto. As an application, we give many examples of Buchsbaum Stanley--Reisner rings with -linear resolution.
Cite
@article{arxiv.math/0312470,
title = {Buchsbaum Stanley--Reisner rings with minimal multiplicity},
author = {Naoki Terai and Ken-ichi Yoshida},
journal= {arXiv preprint arXiv:math/0312470},
year = {2007}
}
Comments
about 25 pages, LaTeX