A singular symplectic variety of dimension 6 with a Lagrangian Prymian fibration
Abstract
A projective symplectic variety P of dimension 6, with only finite quotient singularities, π(P)=0 and h(2,0)(Psmooth)=1, is described as a relative compactified Prym variety of a family of genus 4 curves with involution. It is a Lagrangian fibration associated to a K3 surface double cover of a generic cubic surface. It has no symplectic desingularization.
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