Parabolic nef currents on hyperkaehler manifolds
Abstract
Let M be a compact, holomorphically symplectic Kahler manifold, and η a (1,1)-current which is nef (a limit of Kahler forms). Assume that the cohomology class of η is parabolic, that is, its top power vanishes. We prove that all Lelong sets of η are coisotropic. When M is generic, this is used to show that all Lelong numbers of η vanish. We prove that any hyperkahler manifold with Pic(M) of rank 1 has non-trivial coisotropic subvarieties, if a generator of Pic(M) is parabolic.
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