Matrix factorizations and intermediate Jacobians of cubic threefolds

Abstract

Results due to Druel and Beauville show that the blowup of the intermediate Jacobian of a smooth cubic threefold X in the Fano surface of lines can be identified with a moduli space of semistable sheaves of Chern classes c1=0, c2=2, c3=0 on X. Here we further identify this space with a space of matrix factorizations. This has the advantage that this description naturally generalizes to singular and even reducible cubic threefolds. In this way, given a degeneration of X to a reducible cubic threefold X0, we obtain an associated degeneration of the above moduli spaces of semistable sheaves.

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