Betti numbers of the tangent cones of monomial space curves

Abstract

Let H = n1, n2, n3 be a numerical semigroup. Let H be the interval completion of H, namely the semigroup generated by the interval n1, n1+1, …, n3. Let K be a field and K[H] the semigroup ring generated by H. Let IH* be the defining ideal of the tangent cone of K[H]. In this paper, we describe the defining equations of IH*. From that, we establish the Herzog-Stamate conjecture for monomial space curves stating that βi(IH*) βi(I H*) for all i, where βi(IH*) and βi(I H*) are the ith Betti numbers of IH* and I H* respectively.