Curvature of higher direct image sheaves
Abstract
Given a family (F,h) X × S of Hermite-Einstein bundles on a compact K\"ahler manifold (X,g) we consider the higher direct image sheaves Rq p* O(F) on S, where p: X × S S is the projection. On the complement of an analytic subset these sheaves are locally free and carry a natural metric, induced by the L2 inner product of harmonic forms on the fibers. We compute the curvature of this metric which has a simpler form for families with fixed determinant and families of endomorphism bundles. Furthermore, we discuss the metric for moduli spaces of stable vector bundles.
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