Raymond van Bommel, Jordan Docking, Vladimir Dokchitser, Reynald Lercier, Elisa Lorenzo García
Published 2023-09-29Version 1
We give a conjectural characterisation of the stable reduction of plane quartics over local fields in terms of their Cayley octads. This results in p-adic criteria that efficiently give the stable reduction type amongst the 42 possible types, and whether the reduction is hyperelliptic or not. These criteria are in the vein of the machinery of "cluster pictures" for hyperelliptic curves. We also construct explicit families of quartic curves that realise all possible stable types, against which we test these criteria. We give numerical examples that illustrate how to use these criteria in practice.
Comments: Comments are welcome, 651 pictures
The local-global property for bitangents of plane quartics
Conductors of wild extensions of local fields, especially in mixed characteristic (0,2)
On the indices of curves over local fields
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