Effective divisors and Newton-Okounkov bodies of Hilbert schemes of points on toric surfaces
Abstract
We compute the (unbounded) Newton-Okounkov body of the Hilbert scheme of points on C2. We obtain an upper bound for the Newton-Okounkov body of the Hilbert scheme of points on any smooth toric surface. We conjecture that this upper bound coincides with the exact Newton-Okounkov body for the Hilbert schemes of points on P2, P1× P1, and Hirzebruch surfaces. These results imply upper bounds for the effective cones of these Hilbert schemes, which are also conjecturally sharp in the above cases.
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