Curvatures of direct image sheaves of vector bundles and applications I

Abstract

Let p: be a proper K\"ahler fibration and a Hermitian holomorphic vector bundle. As motivated by the work of Berndtsson(Berndtsson09a), by using basic Hodge theory, we derive several general curvature formulas for the direct image p*(K/S ) for general Hermitian holomorphic vector bundle in a simple way. A straightforward application is that, if the family is infinitesimally trivial and Hermitian vector bundle is Nakano-negative along the base S, then the direct image p*(K/S ) is Nakano-negative. We also use these curvature formulas to study the moduli space of projectively flat vector bundles with positive first Chern classes and obtain that, if the Chern curvature of direct image p*(KX E)--of a positive projectively flat family (E,h(t))t∈ DX--vanishes, then the curvature forms of this family are connected by holomorphic automorphisms of the pair (X,E).