English

Rigid resolutions and big Betti numbers

Commutative Algebra 2007-05-23 v1

Abstract

In the first part of the paper we answer (positively) a question raised by the first author which has to do with some sort of rigity of the tail of resolution of an ideal. Let II be a homogeneous ideal in a polynomial ring over a field of characteristic 0. Denote by βi(I)\beta_i(I) the ii-th Betti number of II and by Gin(I)Gin(I) the revlex generic initial ideal of II. In general one has βi(I)βi(Gin(I))\beta_i(I)\leq \beta_i(Gin(I)) and we show that if βi(I)=βi(Gin(I))\beta_i(I)=\beta_i(Gin(I)) for some ii then βj(I)=βj(Gin(I))\beta_j(I)=\beta_j(Gin(I)) for all j>ij>i. In the second part of the paper we answer a question of Eisenbud and Huneke. We prove that if II is mm-primary and ImdI\subset m^d then βi(md)βi(Gin(I))\beta_i(m^d)\leq \beta_i(Gin(I)) for all ii.

Keywords

Cite

@article{arxiv.math/0306236,
  title  = {Rigid resolutions and big Betti numbers},
  author = {Aldo Conca and Juergen Herzog and Takayuki Hibi},
  journal= {arXiv preprint arXiv:math/0306236},
  year   = {2007}
}