Explicit construction of a plane sextic model for genus-five Howe curves, II

Journal of Computational Algebra Pub Date : 2024-07-17 DOI:10.1016/j.jaca.2024.100019

Momonari Kudo

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Abstract

A Howe curve is defined as the normalization of the fiber product over a projective line of two hyperelliptic curves. Howe curves are very useful to produce important classes of curves over fields of positive characteristic, e.g., maximal, superspecial, or supersingular ones. Determining their feasible equations explicitly is a basic problem, and it has been solved in the hyperelliptic case and in the non-hyperelliptic case with genus not greater than 4. In this paper, we construct an explicit plane sextic model for non-hyperelliptic Howe curves of genus 5. We also determine the number and type of singularities on our sextic model, and prove that the singularities are generically 4 double points. Our results together with Moriya-Kudo's recent ones imply that for each $s \in {2, 3, 4, 5}$ , there exists a non-hyperelliptic curve H of genus 5 with $Aut (H) \supset V_{4}$ such that its associated plane sextic has s double points.

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五属豪曲线平面六分模型的显式构建，II

豪曲线的定义是两条超椭圆曲线在投影线上的纤维积的归一化。豪曲线对于产生正特征域上的重要曲线类别非常有用，例如最大曲线、超特殊曲线或超奇异曲线。明确地确定它们的可行方程是一个基本问题，在超椭圆情况和属不大于 4 的非超椭圆情况下，这个问题已经解决。我们还确定了六分模型上奇点的数量和类型，并证明奇点一般为 4 双点。我们的结果和森谷工藤的最新结果意味着，对于每个 s∈{2,3,4,5}，都存在一条属 5 的非全椭圆曲线 H，其 Aut(H)⊃V4 使得其相关的平面六分仪有 s 个双点。

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Journal of Computational Algebra

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