Containments of symbolic powers of ideals of generic points in 3
Abstract
We show that the Conjecture of Harbourne and Huneke, I(Nr-(N-1)) ⊂ M(r-1)(N-1)Ir holds for ideals of generic (simple) points in 3. As a result, for such ideals we prove the following bounds, which can be recognized as generalizations of Chudnovsky bounds: α(I(3m-k)) ≥ mα(I)+2m-k, for any m ≥ 1 and k=0,1,2. Moreover, we obtain lower bounds for the Waldshmidt constant for such ideals.
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