On degenerations of $\mathbb Z/2$-Godeaux surfaces

20 Feb 2020 · Dias Eduardo, Rito Carlos, Urzúa Giancarlo ·

We compute equations for Coughlan's family of Godeaux surfaces with torsion $\mathbb Z/2$, which we call $\mathbb Z/2$-Godeaux surfaces, and we show that it is (at most) 7 dimensional. We classify non-rational KSBA degenerations $W$ of $\mathbb Z/2$-Godeaux surfaces with one Wahl singularity, showing that $W$ is birational to particular either Enriques surfaces, or $D_{2,n}$ elliptic surfaces, with $n=3,4$ or $6$. We present examples for all possibilities in the first case, and for $n=3,4$ in the second.

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On degenerations of $\mathbb Z/2$-Godeaux surfaces

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