通过霍奇结构的极限计算高度

IF 0.7 4区 数学 Q2 MATHEMATICS Experimental Mathematics Pub Date : 2022-07-29 DOI:10.1080/10586458.2023.2188318
S. Bloch, R. Jong, Emre Can Sertoz
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引用次数: 1

摘要

研究了在数域上定义的变异上同调平凡环的显式计算Beilinson—Bloch高度的问题。最近的结果已经建立了某种极限混合Hodge结构的高度与从带节点的奇维超曲面上得到的某些Beilinson—Bloch高度之间的同余,直到质数对数的有理张成为止。这个同余式提出了一种计算Beilinson- Bloch高度的新方法。本文解释了如何在实践中计算相关的极限混合Hodge结构,然后将我们的计算方法应用于节点四次曲线和节点三次曲线。在这两种情况下,我们都解释了在同余中出现的质数的性质。
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Computing Heights via Limits of Hodge Structures
We consider the problem of explicitly computing Beilinson--Bloch heights of homologically trivial cycles on varieties defined over number fields. Recent results have established a congruence, up to the rational span of logarithms of primes, between the height of certain limit mixed Hodge structures and certain Beilinson--Bloch heights obtained from odd-dimensional hypersurfaces with a node. This congruence suggests a new method to compute Beilinson--Bloch heights. Here we explain how to compute the relevant limit mixed Hodge structures in practice, then apply our computational method to a nodal quartic curve and a nodal cubic threefold. In both cases, we explain the nature of the primes occurring in the congruence.
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来源期刊
Experimental Mathematics
Experimental Mathematics 数学-数学
CiteScore
1.70
自引率
0.00%
发文量
23
审稿时长
>12 weeks
期刊介绍: Experimental Mathematics publishes original papers featuring formal results inspired by experimentation, conjectures suggested by experiments, and data supporting significant hypotheses. Experiment has always been, and increasingly is, an important method of mathematical discovery. (Gauss declared that his way of arriving at mathematical truths was "through systematic experimentation.") Yet this tends to be concealed by the tradition of presenting only elegant, fully developed, and rigorous results. Experimental Mathematics was founded in the belief that theory and experiment feed on each other, and that the mathematical community stands to benefit from a more complete exposure to the experimental process. The early sharing of insights increases the possibility that they will lead to theorems: An interesting conjecture is often formulated by a researcher who lacks the techniques to formalize a proof, while those who have the techniques at their fingertips have been looking elsewhere. Even when the person who had the initial insight goes on to find a proof, a discussion of the heuristic process can be of help, or at least of interest, to other researchers. There is value not only in the discovery itself, but also in the road that leads to it.
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