Groups of symplectic involutions on symplectic varieties of Kummer type and their fixed loci

Abstract

We describe the Galois action on the middle -adic cohomology of smooth, projective fourfolds KA(v) that occur as a fiber of the Albanese morphism on moduli spaces of sheaves on an abelian surface A with Mukai vector v. We show this action is determined by the action on H2\'et(Ak,Q(1)) and on a subgroup GA(v) ≤slant (A× A)[3], which depends on v. This generalizes the analysis carried out by Hassett and Tschinkel [HT13] over C. As a consequence, over number fields, we give a condition under which K2(A) and K2(A) are not derived equivalent. The points of GA(v) correspond to involutions of KA(v). Over C, they are known to be symplectic and contained in the kernel of the map Aut(KA(v)) O(H2(KA(v),Z)). We describe this kernel for all varieties KA(v) of dimension at least 4. When KA(v) is a fourfold over a field of characteristic 0, the fixed-point loci of the involutions contain K3 surfaces whose cycle classes span a large portion of the middle cohomology. We examine the fixed loci in fourfolds KA(0,l,s) over C where l is a (1,3)-polarization, finding the K3 surface to be elliptically fibered under a Lagrangian fibration of KA(0,l,s).

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