On the primitivity of birational transformations of irreducible symplectic manifolds
Abstract
Let f X X be a bimeromorphic transformation of a complex irreducible symplectic manifold X. Some important dynamical properties of f are encoded by the induced linear automorphism f* of H2(X, Z). Our main result is that a bimeromorphic transformation such that f* has at least one eigenvalue with modulus >1 doesn't admit any invariant fibration (in particular its generic orbit is Zariski-dense).
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