Abstract
We show that a Hilbert scheme of conics on a Fano fourfold double cover of P2×P2 ramified along a divisor of bidegree (2,2) admits a P1-fibration with base being a hyper-Kähler fourfold. We investigate the geometry of such fourfolds relating them with degenerated EPW cubes, with elements in the Brauer groups of K3-surfaces of degree 2, and with Verra threefolds. These hyper-Kähler fourfolds admit natural involutions and complete the classification of geometric realizations of antisymplectic involutions on hyper-Kähler fourfolds of type K3[2]. As a consequence we present also three constructions of quartic Kummer surfaces in P3: as Lagrangian and symmetric degeneracy loci and as the base of a fibration of conics in certain threefold quadric bundles over P1.
This is an accepted version of this article. The final version has been published in Proceedings of the London Mathematical Society. © Oxford University Press