On the geometry of the LLSvS eightfold

Abstract

In this note we make a few remarks about the geometry of the holomorphic symplectic manifold Z constructed by C.Lehn, M.Lehn, C.Sorger and D. van Straten as a two-step contraction of the variety of twisted cubic curves on a cubic fourfold Y in P5. We show that Z is birational to a component of a moduli space of stable sheaves in the Calabi-Yau subcategory of the derived category of Y. Using this description we deduce that the twisted cubics contained in a hyperplane section YH of Y give rise to a Lagrangian subvariety ZH in Z. For a generic choice of the hyperplane, ZH is birational to the theta-divisor in the intermediate Jacobian of YH.