Birational geometry of the intermediate Jacobian fibration of a cubic fourfold

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 P5. 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 OG10-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(π) of the abelian fibration π: J P5 is isomorphic to the integral degree 4 primitive algebraic cohomology of X, i.e., MW(π) = H2,2(X, Z)0.