Counter-example to global Torelli problem for irreducible symplectic manifolds
Abstract
We shall give an example of irreducible symplectic manifolds X and Y which are not bimeromorphic, but have the same periods in the second cohomologies. More explicitly, X and Y are generalized Kummer varieties of dim 4 for a general complex torus T of dim 2 and its dual torus T*. A key result is an observation of Shioda for the periods of T and T*. As a concluding remark, we shall discuss the difference between our case and Kummer surfaces.
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