Symbolic Blowup algebras and invariants of certain monomial curves in an affine space

Abstract

Let d ≥ 2 and m≥ 1 be integers such that (d,m)=1. Let p be the defining ideal of the monomial curve in A kd parametrized by (tn1, …, tnd) where ni = d + (i-1)m for all i = 1, …, d. In this paper, we describe the symbolic powers p(n) for all n ≥ 1. As a consequence we show that the symbolic blowup algebras Rs( p) and Gs( p) are Cohen-Macaulay. This gives a positive answer to a question posed by S.~Goto in goto. We also discuss when these blowup algebras are Gorenstein. Moreover, for d=3, considering p as a weighted homogeneous ideal, we compute the resurgence, the Waldschmidt constant and the Castelnuovo-Mumford regularity of p(n) for all n ≥ 1. The techniques of this paper for computing p(n) are new and we hope that these will be useful to study the symbolic powers of other prime ideals.