On the Kaehler metrics over mathrmSymd(X)
Abstract
Let X be a compact connected Riemann surface of genus g, with g ≥ 2. For each d <η(X), where η(X) is the gonality of X, the symmetric product Symd(X) embeds into Picd(X) by sending an effective divisor of degree d to the corresponding holomorphic line bundle. Therefore, the restriction of the flat K\"ahler metric on Picd(X) is a K\"ahler metric on Symd(X). We investigate this K\"ahler metric on Symd(X). In particular, we estimate it's Bergman kernel. We also prove that any holomorphic automorphism of Symd(X) is an isometry.
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