In this paper we characterize the irreducible curves lying in $C^{(2)}$. We prove that a curve $B$ has a degree one morphism to $C^{(2)}$ with image a curve of degree $d$ with irreducible preimage in $C\times C$ if and only if there exists an irreducible smooth curve $D$ and morphisms from $D$ to $C$ and $B$ of degrees $d$ and $2$ respectively forming a diagram which does not reduce.
A characterization of the U(Omega,m) sets of a hyperelliptic curve as Omega and m vary
The characterization of Hermitian surfaces by the number of points
A characterization of certain irreducible symplectic 4-folds
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