Hilbert模变中非紧曲线的有效andr - oort

IF 0.8 4区 数学 Q2 MATHEMATICS
Gal Binyamini, D. Masser
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引用次数: 7

摘要

在大多数andr - oort猜想的证明中,有两个不同的步骤,其有效性尚不清楚:使用Brauer-Siegel的概括和使用Pila-Wilkie的概括。目前只有C曲线的情况是有效的(通过其他方法)。我们给出了非紧曲线在每一个Hilbert模曲面和每一个奇属Hilbert模变体上的andr - oort的有效证明(在一个次要的一般简单性条件下)。特别地,我们证明了在这些情况下,第一步可以用w stholz和第二作者的自同态估计以及andr通过g函数的专门化方法来代替,第二步可以用Novikov、Yakovenko和第一作者的q函数来实现。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Effective André–Oort for non-compact curves in Hilbert modular varieties
In the proofs of most cases of the André-Oort conjecture, there are two different steps whose effectivity is unclear: the use of generalizations of Brauer-Siegel and the use of Pila-Wilkie. Only the case of curves in C is currently known effectively (by other methods). We give an effective proof of André-Oort for non-compact curves in every Hilbert modular surface and every Hilbert modular variety of odd genus (under a minor generic simplicity condition). In particular we show that in these cases the first step may be replaced by the endomorphism estimates of Wüstholz and the second author together with the specialization method of André via G-functions, and the second step may be effectivized using the Q-functions of Novikov, Yakovenko and the first author.
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
115
审稿时长
16.6 weeks
期刊介绍: The Comptes Rendus - Mathématique cover all fields of the discipline: Logic, Combinatorics, Number Theory, Group Theory, Mathematical Analysis, (Partial) Differential Equations, Geometry, Topology, Dynamical systems, Mathematical Physics, Mathematical Problems in Mechanics, Signal Theory, Mathematical Economics, … Articles are original notes that briefly describe an important discovery or result. The articles are written in French or English. The journal also publishes review papers, thematic issues and texts reflecting the activity of Académie des sciences in the field of Mathematics.
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