Minimal Graded Free Resolution for Monomial Curves in A4 defined by almost arithmetic sequences

Abstract

Let =(m0,m1,m2,n) be an almost arithmetic sequence, i.e., a sequence of positive integers with gcd(m0,m1,m2,n) = 1, such that m0<m1<m2 form an arithmetic progression, n is arbitrary and they minimally generate the numerical semigroup = m0 + m1 + m2 + n. Let k be a field. The homogeneous coordinate ring k[] of the affine monomial curve parametrically defined by X0=tm0,X1=tm1,X2=tm3,Y=tn is a graded R-module, where R is the polynomial ring k[X0,X1,X3, Y] with the grading Xi:=mi, Y:=n. In this paper, we construct a minimal graded free resolution for k[].