Symbolic blowup algebras and invariants associated to certain monomial curves in P3

Abstract

In this paper we explicitly describe the symbolic powers of curves C(q,m) in P3 parametrized by ( xd+2m, xd+m ym, xd y2m, yd+2m), where q,m are positive integers, d=2q+1 and (d,m)=1. The defining ideal of these curves is a set-theoretic complete intersection. We show that the symbolic blowup algebra is Noetherian and Gorenstein. An explicit formula for the resurgence and the Waldschmidt constant of the prime ideal p:= p C(q,m) defining the curve C(q,m) is computed. We also give a formula for the Castelnuovo-Mumford regularity of the symbolic powers p(n) for all n ≥ 1.