Some extensions of the modular method and Fermat equations of signature $(13,13,n)$

IF 0.8 3区数学 Q2 MATHEMATICS

Publicacions Matematiques Pub Date : 2018-02-12 DOI:10.5565/publmat6722309

Nicolas Billerey, I. Chen, Lassina Dembélé, L. Dieulefait, Nuno Freitas

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引用次数: 9

Abstract

We provide several extensions of the modular method which were motivated by the problem of completing previous work to prove that, for any integer $n \geq 2$, the equation \[ x^{13} + y^{13} = 3 z^n \] has no non-trivial solutions. In particular, we present four elimination techniques which are based on: (1) establishing reducibility of certain residual Galois representations over a totally real field; (2) generalizing image of inertia arguments to the setting of abelian surfaces; (3) establishing congruences of Hilbert modular forms without the use of often impractical Sturm bounds; and (4) a unit sieve argument which combines information from classical descent and the modular method. The extensions are of broader applicability and provide further evidence that it is possible to obtain a complete resolution of a family of generalized Fermat equations by remaining within the framework of the modular method. As a further illustration of this, we complete a theorem of Anni-Siksek to show that, for $\ell, m\ge 5$, the only solutions to the equation $x^{2\ell} + y^{2m} = z^{13}$ are the trivial ones.

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符号$(13,13,n)$的模方法和费马方程的一些推广

我们提供了模块化方法的几个扩展，这些扩展是由完成先前工作的问题所激发的，以证明对于任何整数$n \geq 2$，方程\[ x^{13} + y^{13} = 3 z^n \]没有非平凡解。特别地，我们提出了四种消除技术，它们基于:(1)在全实域上建立某些残差伽罗瓦表示的可约性;(2)将惯性参数像推广到阿贝尔曲面的设置;(3)在不使用通常不切实际的Sturm界的情况下建立Hilbert模形式的同余;(4)结合经典下降法和模数法的单元筛参数。这些扩展具有更广泛的适用性，并进一步证明了在模方法的框架内获得一类广义费马方程的完全解是可能的。为了进一步说明这一点，我们完成了annie - siksek的一个定理，证明对于$\ell, m\ge 5$，方程$x^{2\ell} + y^{2m} = z^{13}$的唯一解是平凡解。

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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来源期刊

Publicacions Matematiques 数学-数学

CiteScore

1.60

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Publicacions Matemàtiques is a research mathematical journal published by the Department of Mathematics of the Universitat Autònoma de Barcelona since 1976 (before 1988 named Publicacions de la Secció de Matemàtiques, ISSN: 0210-2978 print, 2014-4369 online). Two issues, constituting a single volume, are published each year. The journal has a large circulation being received by more than two hundred libraries all over the world. It is indexed by Mathematical Reviews, Zentralblatt Math., Science Citation Index, SciSearch®, ISI Alerting Services, COMPUMATH Citation Index®, and it participates in the Euclid Project and JSTOR. Free access is provided to all published papers through the web page. Publicacions Matemàtiques is a non-profit university journal which gives special attention to the authors during the whole editorial process. In 2019, the average time between the reception of a paper and its publication was twenty-two months, and the average time between the acceptance of a paper and its publication was fifteen months. The journal keeps on receiving a large number of submissions, so the authors should be warned that currently only articles with excellent reports can be accepted.