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Minimal Graded Free Resolutions for Monomial Curves Defined by Arithmetic Sequences

Commutative Algebra 2011-08-17 v1

Abstract

Let \mm=(m0,...,mn)\mm=(m_0,...,m_n) be an arithmetic sequence, i.e., a sequence of integers m0<...<mnm_0<...<m_n with no common factor that minimally generate the numerical semigroup i=0nmiN\sum_{i=0}^{n}m_i\N and such that mimi1=mi+1mim_i-m_{i-1}=m_{i+1}-m_i for all i{1,...,n1}i\in\{1,...,n-1\}. The homogeneous coordinate ring Γ\mm\Gamma_\mm of the affine monomial curve parametrically defined by X0=tm0,...,Xn=tmnX_0=t^{m_0},...,X_n=t^{m_n} is a graded RR-module where RR is the polynomial ring k[X0,...,Xn]k[X_0,...,X_n] with the grading obtained by setting degXi:=mi\deg{X_i}:=m_i. In this paper, we construct an explicit minimal graded free resolution for Γ\mm\Gamma_\mm and show that its Betti numbers depend only on the value of m0m_0 modulo nn. As a consequence, we prove a conjecture of Herzog and Srinivasan on the eventual periodicity of the Betti numbers of semigroup rings under translation for the monomial curves defined by an arithmetic sequence.

Keywords

Cite

@article{arxiv.1108.3203,
  title  = {Minimal Graded Free Resolutions for Monomial Curves Defined by Arithmetic Sequences},
  author = {Philippe Gimenez and Indranath Sengupta and Hema Srinivasan},
  journal= {arXiv preprint arXiv:1108.3203},
  year   = {2011}
}

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