Theta characteristics and the fixed locus of [-1] on some varieties of Kummer type

Abstract

We study some combinatorial aspects of the fixed loci of symplectic involutions acting on hyperk\"ahler varieties of Kummer type. Given an abelian surface A with a (1,d)-polarization L, there is an isomorphism Kd-1A KA(0,l,-1) between a hyperk\"ahler of Kummer type that parametrizes length-d subschemes of A and one that parametrizes degree d-1 line bundles supported on curves in |L|, where L is the dual (1,d)-polarization on A. We examine the bijection this isomorphism gives between isolated points in the fixed loci of [-1A] when d is odd, which has a combinatorics related to theta characteristics. Along the way, we give a table of numerical values for a formula of Kamenova, Mongardi, and Oblomkov counting the number of components of a symplectic involution acting on a Kummer-type variety.