Minimal Graded Free Resolutions for Monomial Curves Defined by Arithmetic Sequences

Abstract

Let =(m0,...,mn) be an arithmetic sequence, i.e., a sequence of integers m0<...<mn with no common factor that minimally generate the numerical semigroup Σi=0nmi and such that mi-mi-1=mi+1-mi for all i∈\1,...,n-1\. The homogeneous coordinate ring of the affine monomial curve parametrically defined by X0=tm0,...,Xn=tmn is a graded R-module where R is the polynomial ring k[X0,...,Xn] with the grading obtained by setting Xi:=mi. In this paper, we construct an explicit minimal graded free resolution for and show that its Betti numbers depend only on the value of m0 modulo n. 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.