Adjoint L-functions, congruence ideals, and Selmer groups over GL n.

IF 0.8 Q3 MATHEMATICS

Research in Number Theory Pub Date : 2026-01-01 Epub Date: 2026-02-27 DOI:10.1007/s40993-026-00721-6

Ho Leung Fong

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引用次数: 0

Abstract

The study of special values of adjoint L-functions and congruence ideals is gradually becoming a classical theme in number theory, driven by the Bloch-Kato conjecture and generalisations of Wiles-Lenstra's numerical criterion. In this paper, we relate $L (1, π, {Ad}^{\circ})$ to the congruence ideals for cohomological cuspidal automorphic representations $π$ of ${GL}_{n}$ over any number field. We then use this result to deduce relationships between the congruences of automorphic forms and adjoint L-functions. For CM fields, using the existence of Galois representations, we apply the result to obtain a lower bound on the cardinality of certain Selmer groups in terms of $L (1, π, {Ad}^{\circ})$ . This can be viewed as partial progress on the Bloch-Kato conjecture. The main technical ingredients are a careful study of the cohomology associated with the locally symmetric space of ${GL}_{n}$ , its relation to automorphic representations, and the establishment of some algebraic properties of the congruence ideals. We anticipate that the methods developed here will find further applications in related problems, particularly in the study of congruence modules and their relation to the arithmetic of automorphic forms.

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伴随l函数，同余理想，和GL n上的Selmer群。

在Bloch-Kato猜想和Wiles-Lenstra数值准则推广的推动下，伴随l函数的特殊值和同余理想的研究逐渐成为数论的一个经典主题。本文将L （1, π, Ad°）与GL n在任意数域上的上同调倒自同构表示π的同余理想联系起来。然后利用这一结果推导出自同构形式的同余与伴随l函数之间的关系。对于CM域，利用伽罗瓦表示的存在性，我们应用这个结果得到了关于L （1, π, Ad°）的某些Selmer群的基数的下界。这可以看作是Bloch-Kato猜想的部分进展。主要的技术成分是仔细研究与局域对称空间GL n相关的上同调，它与自同构表示的关系，以及同余理想的一些代数性质的建立。我们期望在此开发的方法将在相关问题中找到进一步的应用，特别是在同余模及其与自同构形式算法的关系的研究中。

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

Research in Number Theory MATHEMATICS-

CiteScore

0.80

自引率

12.50%

发文量

期刊介绍： Research in Number Theory is an international, peer-reviewed Hybrid Journal covering the scope of the mathematical disciplines of Number Theory and Arithmetic Geometry. The Mission of the Journal is to publish high-quality original articles that make a significant contribution to these research areas. It will also publish shorter research communications (Letters) covering nascent research in some of the burgeoning areas of number theory research. This journal publishes the highest quality papers in all of the traditional areas of number theory research, and it actively seeks to publish seminal papers in the most emerging and interdisciplinary areas here as well. Research in Number Theory also publishes comprehensive reviews.