Minimal extension property of direct images
Abstract
Given a projective morphism f:X Y from a complex space to a complex manifold, we prove the Griffiths semi-positivity and minimal extension property of the direct image sheaf f(F). Here, F is a coherent sheaf on X, which consists of the Grauert-Riemenschneider dualizing sheaf, a multiplier ideal sheaf, and a variation of Hodge structure (or more generally, a tame harmonic bundle).
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