A converse of Berndtsson's theorem on the positivity of direct images
Abstract
Berndtsson's famous theorem asserts that, for a compact K\"ahler fibration p:X Y, the direct image bundle p*(KX/Y L) of a semi-positive Hermitian holomorphic line bundle L X is Nakano semi-positive. As a continuation of our previous work, we prove a converse of Berndtsson's theorem in the case of a projective fibration: if p*(KX/Y L E) is Griffiths semi-positive for every semi-positive Hermitian holomorphic line bundle E X, then the curvature of L must be semi-positive.
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