Deformed dimensional reduction

Geometry & Topology Pub Date : 2020-01-10 DOI:10.2140/gt.2022.26.721

Ben Davison, Tudor Puadurariu

引用次数: 6

Abstract

Since its first use by Behrend, Bryan, and Szendr\H{o}i in the computation of motivic Donaldson-Thomas (DT) invariants of $\mathbb{A}_{\mathbb{C}}^3$, dimensional reduction has proved to be an important tool in motivic and cohomological DT theory. Inspired by a conjecture of Cazzaniga, Morrison, Pym, and Szendr\H{o}i on motivic DT invariants, work of Dobrovolska, Ginzburg, and Travkin on exponential sums, and work of Orlov and Hirano on equivalences of categories of singularities, we generalize the dimensional reduction theorem in motivic and cohomological DT theory and use it to prove versions of the Cazzaniga-Morrison-Pym-Szendr\H{o}i conjecture in these settings.

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变形尺寸缩小

自从Behrend, Bryan和Szendr\H{o}i在计算$\mathbb{A}_{\mathbb{C}}^3$的动机Donaldson-Thomas (DT)不变量时首次使用降维法以来，降维法已被证明是动机和上同调DT理论中的一个重要工具。受Cazzaniga、Morrison、Pym和Szendr\H{o}i关于动机DT不变量的猜想，Dobrovolska、Ginzburg和Travkin关于指数和的工作，以及Orlov和Hirano关于奇点类别等价的工作的启发，我们推广了动机和上同调DT理论中的降维定理，并用它来证明Cazzaniga-Morrison-Pym-Szendr\H{o}i猜想在这些情况下的版本。

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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Geometry & Topology

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