在反射场上定义的二属CM曲线的例子

Q1 Mathematics

Lms Journal of Computation and Mathematics Pub Date : 2013-07-01 DOI:10.1112/S1461157015000121

F. Bouyer, Marco Streng

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引用次数: 23

摘要

Van Wamelen[数学]第68(1999)号22,307 - 320]用复乘法(CM)列出了$\mathbf{Q}$上的19条2属曲线。然而，对于每条曲线，CM-field都是$\mathbf{Q}$上的循环伽罗瓦，而非伽罗瓦四次CM-field的一般情况并没有出现在这个列表中。原因是在这种情况下定义的场总是包含反射场的实二次子场。我们将Van Wamelen列表扩展到包含在这个实数二次域上定义的2属曲线。因此，我们的列表包含了最小的2属CM曲线的“一般”例子。我们解释了获得这个列表的方法，包括一种新的全实数域上任意超椭圆曲线的高度降低算法。与Van Wamelen不同的是，我们还通过实现Lauter和Viray对Igusa类多项式的分母界来证明我们的列表。

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Examples of CM curves of genus two defined over the reflex field

Van Wamelen [Math. Comp. 68 (1999) no. 225, 307–320] lists 19 curves of genus two over $\mathbf{Q}$ with complex multiplication (CM). However, for each curve, the CM-field turns out to be cyclic Galois over $\mathbf{Q}$ , and the generic case of a non-Galois quartic CM-field did not feature in this list. The reason is that the field of definition in that case always contains the real quadratic subfield of the reflex field. We extend Van Wamelen’s list to include curves of genus two defined over this real quadratic field. Our list therefore contains the smallest ‘generic’ examples of CM curves of genus two. We explain our methods for obtaining this list, including a new height-reduction algorithm for arbitrary hyperelliptic curves over totally real number fields. Unlike Van Wamelen, we also give a proof of our list, which is made possible by our implementation of denominator bounds of Lauter and Viray for Igusa class polynomials.

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来源期刊

Lms Journal of Computation and Mathematics MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.60

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： LMS Journal of Computation and Mathematics has ceased publication. Its final volume is Volume 20 (2017). LMS Journal of Computation and Mathematics is an electronic-only resource that comprises papers on the computational aspects of mathematics, mathematical aspects of computation, and papers in mathematics which benefit from having been published electronically. The journal is refereed to the same high standard as the established LMS journals, and carries a commitment from the LMS to keep it archived into the indefinite future. Access is free until further notice.