圆锥曲线上有六个双点的六次曲线

IF 0.6 Q4 MATHEMATICS, APPLIED
K. Konno, Ezio Stagnaro
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引用次数: 0

摘要

设C6为具有6个非节点双点的平面六分曲线。证明了如果它们在二次曲线C2上,那么唯一可能的情况是它们都是普通尖。由此得出C6是不可约的。此外,还存在一条平面三次曲线C3,使得C6 = c32 + C3。这类曲线与一般三次曲面外一点到平面的投影的分支曲线,以及P或P中的正则曲面密切相关,其解量子化具有双分不变量q > 0, pg = 4或pg = 5, P2≤23。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Sextic curves with six double points on a conic
Let C6 be a plane sextic curve with 6 double points that are not nodes. It is shown that if they are on a conic C2, then the unique possible case is that all of them are ordinary cusps. From this it follows that C6 is irreducible. Moreover, there is a plane cubic curve C3 such that C6 = C 3 2 + C 3 . Such curves are closely related to both the branch curve of the projection to a plane of the general cubic surface from a point outside it and canonical surfaces in P or P whose desingularizations have birational invariants q > 0, pg = 4 or pg = 5, P2 ≤ 23.
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来源期刊
Methods and applications of analysis
Methods and applications of analysis MATHEMATICS, APPLIED-
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