English

Rigidity of linear strands and generic initial ideals

Commutative Algebra 2007-06-18 v2

Abstract

Let KK be a field, SS a polynomial ring and EE an exterior algebra over KK, both in a finite set of variables. We study rigidity properties of the graded Betti numbers of graded ideals in SS and EE when passing to their generic initial ideals. First, we prove that if the graded Betti numbers βii+kS(S/I)=βii+kS(S/\Gin(I))\beta_{ii+k}^S(S/I)=\beta_{ii+k}^S(S/\Gin(I)) for some i>1i>1 and k0k \geq 0, then βqq+kS(S/I)=βqq+kS(S/\Gin(I))\beta_{qq+k}^S(S/I)= \beta_{qq+k}^S(S/\Gin(I)) for all qiq \geq i, where ISI\subset S is a graded ideal. Second, we show that if βii+kE(E/I)=βii+kE(E/\Gin(I))\beta_{ii+k}^E(E/I)= \beta_{ii+k}^E(E/\Gin(I)) for some i>1i>1 and k0k \geq 0, then βqq+kE(E/I)=βqq+kE(E/\Gin(I))\beta_{qq+k}^E(E/I)= \beta_{qq+k}^E(E/\Gin(I)) for all q1q \geq 1, where IEI\subset E is a graded ideal. In addition, it will be shown that the graded Betti numbers βii+kR(R/I)=βii+kR(R/\Gin(I))\beta_{ii+k}^R(R/I)= \beta_{ii+k}^R(R/\Gin(I)) for all i1i \geq 1 if and only if I<k>I_{< k >} and I<k+1>I_{< k+1 >} have a linear resolution. Here I<d>I_{< d >} is the ideal generated by all homogeneous elements in II of degree dd, and RR can be either the polynomial ring or the exterior algebra.

Keywords

Cite

@article{arxiv.math/0608628,
  title  = {Rigidity of linear strands and generic initial ideals},
  author = {Satoshi Murai and Pooja Singla},
  journal= {arXiv preprint arXiv:math/0608628},
  year   = {2007}
}

Comments

20 pages, the title was changed and some minor corrections were made. To apper Nagoya Mathematical Journal