在加权齐次平面曲线的切空间上的奇异性

Pub Date : 2020-01-01 DOI:10.4134/JKMS.J180796

J. Sebag, M. Cañón

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引用次数: 1

摘要

设k是特征为0的场。设C = Spec(k[x, y]/ < f >)为切空间πC: TC/k→C的加权齐次平面曲线奇点。本文从计算的角度研究了方程F = 0的形式解(场扩展F (k)在F [[t]]2中)在C上的1-射流集合的Zariski闭包G (C)。我们建立了理想N1(C)的Groebner基，将G (C)定义为TC/k的约化闭子格式，并获得了沿C的对数微分算子(在平面上)的应用。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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On the tangent space of a weighted homogeneous plane curve singularity

Let k be a field of characteristic 0. Let C = Spec(k[x, y]/〈f〉) be a weighted homogeneous plane curve singularity with tangent space πC : TC/k → C . In this article, we study, from a computational point of view, the Zariski closure G (C ) of the set of the 1-jets on C which define formal solutions (in F [[t]]2 for field extensions F of k) of the equation f = 0. We produce Groebner bases of the ideal N1(C ) defining G (C ) as a reduced closed subscheme of TC/k and obtain applications in terms of logarithmic differential operators (in the plane) along C .

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