The Igusa quartic and the Prym map, with some rational moduli

Abstract

In this paper the ubiquity of the Igusa quartic B ⊂ P4 shows up again, this time related to the Prym map p : R6 A5. We introduce the moduli space X of those quartic threefolds X cutting twice a quadratic section of B. A general X is 30-nodal and the intermediate Jacobian J(X) of its natural desingularization is a 5-dimensional p.p. abelian variety. Let j: X A5 be the period map sending X to J(X), in the paper we study j and its relation to p. As is well known the degree of p is 27 and its monodromy group endows any smooth fibre F of p with the incidence configuration of 27 lines of a cubic surface. Then the same monodromy defines a map j': D6 A5 of degree 36, with fibre the configuration of 36 'double-six' sets of lines of a cubic surface. We prove that j = j' φ, where φ: X D6 is birational. This provides a geometric description of j'. Finally we describe the relations between the different moduli spaces considered and prove that some, including X, are rational.