English

Algebraic shifting and graded Betti numbers

Commutative Algebra 2008-02-12 v3

Abstract

Let S=K[x1,...,xn]S = K[x_1, ..., x_n] denote the polynomial ring in nn variables over a field KK with each degxi=1\deg x_i = 1. Let Δ\Delta be a simplicial complex on [n]={1,...,n}[n] = \{1, ..., n \} and IΔSI_\Delta \subset S its Stanley--Reisner ideal. We write Δe\Delta^e for the exterior algebraic shifted complex of Δ\Delta and Δc\Delta^c for a combinatorial shifted complex of Δ\Delta. Let βii+j(IΔ)=dimK\Tori(K,IΔ)i+j\beta_{ii+j}(I_{\Delta}) = \dim_K \Tor_i(K, I_\Delta)_{i+j} denote the graded Betti numbers of IΔI_\Delta. In the present paper it will be proved that (i) βii+j(IΔe)βii+j(IΔc)\beta_{ii+j}(I_{\Delta^e}) \leq \beta_{ii+j}(I_{\Delta^c}) for all ii and jj, where the base field is infinite, and (ii) βii+j(IΔ)βii+j(IΔc)\beta_{ii+j}(I_{\Delta}) \leq \beta_{ii+j}(I_{\Delta^c}) for all ii and jj, where the base field is arbitrary. Thus in particular one has βii+j(IΔ)βii+j(IΔlex)\beta_{ii+j}(I_\Delta) \leq \beta_{ii+j}(I_{\Delta^{lex}}) for all ii and jj, where Δlex\Delta^{lex} is the unique lexsegment simplicial complex with the same ff-vector as Δ\Delta and where the base field is arbitrary.

Keywords

Cite

@article{arxiv.math/0503685,
  title  = {Algebraic shifting and graded Betti numbers},
  author = {Takayuki Hibi and Satoshi Murai},
  journal= {arXiv preprint arXiv:math/0503685},
  year   = {2008}
}

Comments

14 pages; title changed, new section added. To appear in Trans. Amer. Math. Soc