Chern scalar curvature and symmetric products of compact Riemann surfaces
Abstract
Let X be a compact connected Riemann surface of genus g≥ 0, and let Symd(X), d 1, denote the d-fold symmetric product of X. We show that Symd(X) admits a Hermitian metric with negative Chern scalar curvature if and only if g ≥ 2, and positive Chern scalar curvature if and only if d > g.
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