Minimal free resolutions for certain affine monomial curve

Abstract

Given an arbitrary field k and an arithmetic sequence of positive integers m0<...<mn, we consider the affine monomial curve parameterized by X0=tm0,...,Xn=tmn. In this paper, we conjecture that the Betti numbers of its coordinate ring are completely determined by n and the value of m0 modulo n. We first show that the defining ideal of the monomial curve can be written as a sum of two determinantal ideals. Using this fact, we describe the minimal free resolution of the coordinate ring in the following three cases: when m0 is 1 modulo n (determinantal), when m0 is n modulo n (almost determinantal), and when m0 is 2 modulo n and n=4 (Gorenstein of codimension 4).