The asymptotic of curvature of direct image bundle associated with higher powers of a relatively ample line bundle
Abstract
Let π:X M be a holomorphic fibration with compact fibers and L a relatively ample line bundle over X. We obtain the asymptotic of the curvature of L2-metric and Qullien metric on the direct image bundle π*(Lk KX/M) up to the lower order terms than kn-1 for large k. As an application we prove that the analytic torsion τk(∂) satisfies ∂∂(τk(∂))2=o(kn-1), where n is the dimension of fibers.
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