On the stable Harbourne conjecture for ideals defining space monomial curves
Abstract
For the ideal p in k[x, y, z] defining a space monomial curve, we show that p(2 n - 1) ⊂eq m pn for some positive integer n, where m is the maximal ideal (x, y, z). Moreover, the smallest such n is determined. It turns out that there is a counterexample to a claim due to Grifo, Huneke, and Mukundan, which states that p(3) ⊂eq m p2 if k is a field of characteristic not 3; however, the stable Harbourne conjecture holds for space monomial curves as they claimed.
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