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Generalized twisted cubics on a cubic fourfold as a moduli space of stable objects

Paolo StellariMartí LahozEmanuele MacrìManfred Lehn

subject

Connected componentDerived categoryPure mathematicsApplied MathematicsGeneral Mathematics010102 general mathematicsHolomorphic function01 natural sciencesModuli spaceMathematics - Algebraic GeometryMathematics::Algebraic Geometry0103 physical sciencesTorsion (algebra)FOS: Mathematics010307 mathematical physics0101 mathematicsMathematics::Representation TheoryMathematics::Symplectic GeometryAlgebraic Geometry (math.AG)Irreducible componentTwisted cubicMathematicsSymplectic geometry

description

We revisit the work of Lehn-Lehn-Sorger-van Straten on twisted cubic curves in a cubic fourfold not containing a plane in terms of moduli spaces. We show that the blow-up $Z'$ along the cubic of the irreducible holomorphic symplectic eightfold $Z$, described by the four authors, is isomorphic to an irreducible component of a moduli space of Gieseker stable torsion sheaves or rank three torsion free sheaves. For a very general such cubic fourfold, we show that $Z$ is isomorphic to a connected component of a moduli space of tilt-stable objects in the derived category and to a moduli space of Bridgeland stable objects in the Kuznetsov component. Moreover, the contraction between $Z'$ and $Z$ is realized as a wall-crossing in tilt-stability. Finally, $Z$ is birational to an irreducible component of Gieseker stable aCM bundles of rank six.

yearjournalcountryeditionlanguage
2016-09-15
https://dx.doi.org/10.48550/arxiv.1609.04573