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Reduction type of smooth quartics
Let \(C/K\) be a smooth plane quartic over a discrete valuation field. We characterize the type of reduction (i.e. smooth plane quartic, hyperelliptic genus 3 curve or bad) over \(K\) in terms of the existence of a special plane quartic model and, over \(\bar{K}\), in terms of the valuations of cert...
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Published in: | arXiv.org 2020-08 |
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Main Authors: | , , , |
Format: | Article |
Language: | English |
Subjects: | |
Online Access: | Get full text |
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Summary: | Let \(C/K\) be a smooth plane quartic over a discrete valuation field. We characterize the type of reduction (i.e. smooth plane quartic, hyperelliptic genus 3 curve or bad) over \(K\) in terms of the existence of a special plane quartic model and, over \(\bar{K}\), in terms of the valuations of certain algebraic invariants of \(C\) when the characteristic of the residue field is not \(2,\,3,\,5\) or \(7\). On the way, we gather several results of general interest on geometric invariant theory over an arbitrary ring \(R\) in the spirit of (Seshadri 1977). For instance when \(R\) is a discrete valuation ring, we show the existence of a homogeneous system of parameters over \(R\). We exhibit explicit ones for ternary quartic forms under the action of \(\textrm{SL}_{3,R}\) depending only on the characteristic \(p\) of the residue field. We illustrate our results with the case of Picard curves for which we give simple criteria for the type of reduction. |
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ISSN: | 2331-8422 |
DOI: | 10.48550/arxiv.1803.05816 |