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On the Kaehler metrics over ${mathrm{Sym}^{d}(X)$

Let $X$ be a compact connected Riemann surface of genus $g$, with $g \geq 2$. For each $d <η(X)$, where $η(X)$ is the gonality of $X$, the symmetric product $\text{Sym}^d(X)$ embeds into $\text{Pic}^d(X)$ by sending an effective divisor of degree $d$ to the corresponding holomorphic line bundle. Therefore, the restriction of the flat Kähler metric on $\text{Pic}^d(X)$ is a Kähler metric on $\text{Sym}^d(X)$. We investigate this Kähler metric on $\text{Sym}^d(X)$. In particular, we estimate it&#39;s Bergman kernel. We also prove that any holomorphic automorphism of $\text{Sym}^d(X)$ is an isometry.