Pushforwards of pluricanonical bundles under morphisms to abelian varieties
Abstract
Let f X A be a morphism from a smooth projective variety to an abelian variety (over the field of complex numbers). We show that the sheaves f* ωX m become globally generated after pullback by an isogeny. We use this to deduce a decomposition theorem for these sheaves when m 2, analogous to that obtained by Chen-Jiang when m = 1. This is in turn applied to effective results for pluricanonical linear series on irregular varieties with canonical singularities.
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