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Could we construct the Jacobian variety of a smooth curve $C$ with genus $>2$ from its derived category $D(C)$?
Let's consider a smooth curve $C$ over $\mathbb{C}$. We know that the Jacobian variety $Jac(C)$ of $C$ is the moduli space of the degree $0$ line bundles on $C$. $Jac(C)$ is an abelian variety of ...
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