The locally free locus of Quot schemes on P1
Abstract
We characterize components of the locally free locus Quotn,dP1(O(e)) of the Quot scheme associated to any vector bundle on P1. Specifically, we show that the components are in bijection with certain combinatorial objects which we call strongly stable pairs. Using our explicit understanding of the components, we prove that Quotn,dP1(O(e)) is connected, and we give an explicit bound for when Quotn,dP1(O(e)) is irreducible. The key ingredient is a combinatorial criterion for when a triple of vector bundles on P1 arises in a short exact sequence. As a consequence, we prove that in codimension 2, all integral lattice points in the Boij-S\"oderberg cone are Betti diagrams of actual modules.
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