Line Bundle Resolutions via the Coherent-Constructible Correspondence
Abstract
We consider a finite collection of line bundles introduced by Bondal on a smooth, projective toric variety X. For any coherent sheaf F on X, we construct minimal resolutions of F by line bundles in , up to twist, with length bounded by the dimension of X and provide explicit formulae for their Betti numbers. For a toric subvariety Y ⊂ X of codimension k, we give a construction of the minimal resolution of f*OY of length k by line bundles in and relate their Betti numbers to the topology of a stratified real torus. Additionally, we recover a (generally non-minimal) cellular resolution of f*OY constructed in Hanlon-Hicks-Lazarev. Aspects of our proof run through the Coherent Constructible Correspondence, a form of homological mirror symmetry for toric varieties.
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