Complex Lagrangians in a hyperKaehler manifold and the relative Albanese
Abstract
Let M be the moduli space of complex Lagrangian submanifolds of a hyperK\"ahler manifold X, and let : A → M be the relative Albanese over M. We prove that A has a natural holomorphic symplectic structure. The projection defines a completely integrable structure on the symplectic manifold A. In particular, the fibers of are complex Lagrangians with respect to the symplectic form on A. We also prove analogous results for the relative Picard over M.
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