A smooth but non-symplectic moduli of sheaves on a hyperk\"ahler variety
Abstract
For an abelian surface A, we consider stable vector bundles on a generalized Kummer variety Kn(A) with n>1. We prove that the connected component of the moduli space which contains the tautological bundles associated to line bundles of degree 0 is isomorphic to the blowup of the dual abelian surface in one point. We believe that this is the first explicit example of a component which is smooth with a non-trivial canonical bundle.
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