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Birational geometry of the intermediate Jacobian fibration of a cubic fourfold

Giulia Saccà

2023Geometry & Topology18 citationsDOIOpen Access PDF

Abstract

We show that the intermediate Jacobian fibration associated to any smooth cubic fourfold $X$ admits a hyper-K\"ahler compactification $J(X)$ with a regular Lagrangian fibration $J \to \mathbb P^5$. This builds upon arXiv:1602.05534, where the result is proved for general $X$, as well as on the degeneration techniques on arXiv:1704.02731 and techniques from the minimal model program. We then study some aspects of the birational geometry of $J(X)$: for very general $X$ we compute the movable and nef cones of $J(X)$, showing that $J(X)$ is not birational to the twisted version of the intermediate Jacobian fibration arXiv:1611.06679, nor to an OG$10$-type moduli space of objects in the Kuznetsov component of $X$; for any smooth $X$ we show, using normal functions, that the Mordell-Weil group $MW(\pi)$ of the abelian fibration $\pi: J \to \mathbb P^5$ is isomorphic to the integral degree $4$ primitive algebraic cohomology of $X$, i.e., $MW(\pi) = H^{2,2}(X, \mathbb Z)_0$.

Topics & Concepts

FibrationMathematicsBirational geometryModuli spaceAbelian groupPure mathematicsCohomologyCompactification (mathematics)Jacobian matrix and determinantAlgebraic geometryModuliGeometryPhysicsQuantum mechanicsHomotopyApplied mathematicsAlgebraic Geometry and Number TheoryGeometry and complex manifoldsGeometric and Algebraic Topology
Birational geometry of the intermediate Jacobian fibration of a cubic fourfold | Litcius