English

Buchsbaum Stanley--Reisner rings with minimal multiplicity

Commutative Algebra 2007-05-23 v1 Combinatorics

Abstract

In this paper, we study non-Cohen--Macaulay Buchsbaum Stanley--Reisner rings with linear free resolution. In particular, for given integers cc, dd, qq with c1c \ge 1, 2qd2 \le q \le d, we give an upper bound hc,d,qh_{c,d,q} on the dimension of the unique non-vanishing homology H~q2(Δ;k)\widetilde{H}_{q-2}(\Delta;k) of a dd-dimensional Buchsbaum ring k[Δ]k[\Delta] with qq-linear resolution and codimension cc. Also, we discuss about existence for such Buchsbaum rings with dimkH~q2(Δ;k)=h\dim_k \widetilde{H}_{q-2}(\Delta;k) = h for any hh with 0hhc,d,q0 \le h \le h_{c,d,q}, and prove an existence theorem in the case of q=d=3q=d=3 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 qq, 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 qq-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