BunG(X)的轨迹公式

Weil's Conjecture for Function Fields Pub Date : 2019-02-19 DOI:10.2307/j.ctv4v32qc.7

D. Gaitsgory, J. Lurie

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摘要

本章的目的是证明定理1.4.4.1，其表述如下:定理5.0.0.3，设X是F q上的代数曲线，设G是X上的光滑仿射群格式，设G的光纤是连通的，且G的一般光纤是半单光纤。则模栈BunG(X)满足Grothendieck-Lefschetz迹公式。然而，定理5.0.0.3不能直接从全局商栈的Grothendieck-Lefschetz迹公式中推导出来，因为模栈BunG(X)通常不是拟紧的。取而代之的策略是将BunG(X)分解为局部封闭的子堆栈BunG(X)[P，ν]，这些子堆栈更直接地适合于分析。

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The Trace Formula for BunG(X)

This chapter aims to prove Theorem 1.4.4.1, which is formulated as follows: Theorem 5.0.0.3, let X be an algebraic curve over F q and let G be a smooth affine group scheme over X. Suppose that the fibers of G are connected and that the generic fiber of G is semisimple. Then the moduli stack BunG(X) satisfies the Grothendieck–Lefschetz trace formula. However, Theorem 5.0.0.3 cannot be deduced directly from the Grothendieck–Lefschetz trace formula for global quotient stacks because the moduli stack BunG(X) is usually not quasi-compact. The strategy instead will be to decompose BunG (X) into locally closed substacks BunG(X)[P,ν‎] which are more directly amenable to analysis.

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Weil's Conjecture for Function Fields

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Chapter Five The Trace Formula for BunG(X) Chapter Two. The Formalism of ℓ-adic Sheaves Frontmatter Chapter Four. Computing the Trace of Frobenius Chapter Three. E∞-Structures on ℓ-Adic Cohomology