Marian Aprodu, Andrea Bruno, Edoardo Sernesi
Published 2017-08-27Version 1
We prove that a canonical curve $C$ of genus $\ge 11$ is bielliptic if and only if its second syzygy scheme $\mathrm{Syz}_2(C)$ is different from $C$.
Bielliptic curves of genus three and the Torelli problem for certain elliptic surfaces
The characterization of Hermitian surfaces by the number of points
A characterization of certain irreducible symplectic 4-folds
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