Proof of the geometric Langlands conjecture IV: ambidexterity

arXiv - MATH - Algebraic Geometry Pub Date : 2024-09-13 DOI:arxiv-2409.08670

D. Arinkin, D. Beraldo, L. Chen, J. Faergeman, D. Gaitsgory, K. Lin, S. Raskin, N. Rozenblyum

引用次数: 0

Abstract

This paper performs the following steps toward the proof of GLC in the de Rham setting: (i) We deduce GLC for G=GL_n; (ii) We prove that the Langlands functor L_G constructed in [GLC1], when restricted to the cuspidal category, is ambidextrous; (iii) We reduce GLC to the study of a certain classical vector bundle with connection on the stack of irreducible local systems; (iv) We prove that GLC is equivalent to the contractibility of the space of generic oper structures on irreducible local systems; (v) Using [BKS], we deduce GLC for classical groups.

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几何朗兰兹猜想的证明IV：伏羲性

本文将采取以下步骤来证明 deRham 背景下的 GLC：(i) 我们推导出了 G=GL_n 的 GLC；(ii) 我们证明了[GLC1]中构造的朗兰兹函子 L_G，当被限制在簕杜鹃类时，它是ambidextrous 的；(iii) 我们把 GLC 简化为研究不可还原局部系统栈上的某个经典向量束与连接；(iv) 我们证明 GLC 等价于不可还原局部系统上一般 oper 结构空间的可收缩性； (v) 利用[BKS]，我们推导出经典群的 GLC。

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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arXiv - MATH - Algebraic Geometry

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