Jack Huizenga
Published 2012-10-24, updated 2013-10-29Version 3
We compute the cone of effective divisors on the Hilbert scheme of points in the projective plane. We show the sections of many stable vector bundles satisfy a natural interpolation condition, and that these bundles always give rise to the edge of the effective cone of the Hilbert scheme. To do this, we give a generalization of Gaeta's theorem on the resolution of the ideal sheaf of a general collection of points in the plane. This resolution has a natural interpretation in terms of Bridgeland stability, and we observe that ideal sheaves of collections of points are destabilized by exceptional bundles. By studying the Bridgeland stability of exceptional bundles, we also show that our computation of the effective cone of the Hilbert scheme is consistent with a conjecture which predicts a correspondence between Mori and Bridgeland walls for the Hilbert scheme.
Comments: Final version to appear in the Journal of Algebraic Geometry. Sections 6 and 7 greatly simplified due to referee comments
Effective divisors and Newton-Okounkov bodies of Hilbert schemes of points on toric surfaces
Universal formulas for characteristic classes on the Hilbert schemes of points on surfaces
On the Cobordism Class of the Hilbert Scheme of a Surface
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