Bergman kernel on Riemann surfaces and Kaehler metric on symmetric products

Abstract

Let X be a compact hyperbolic Riemann surface equipped with the Poincar\'e metric. For any integer k≥ 2, we investigate the Bergman kernel associated to the holomorphic Hermitian line bundle kX, where is the holomorphic cotangent bundle of X. Our first main result estimates the corresponding Bergman metric on X in terms of the Poincar\'e metric. We then consider a certain natural embedding of the symmetric product of X into a Grassmannian parametrizing subspaces of fixed dimension of the space of all global holomorphic sections of kX. The Fubini-Study metric on the Grassmannian restricts to a K\"ahler metric on the symmetric product of X. The volume form for this restricted metric on the symmetric product is estimated in terms of the Bergman kernel of kX and the volume form for the orbifold K\"ahler form on the symmetric product given by the Poincar\'e metric on X.