Curve counting and S-duality

IF 0.9 Q2 MATHEMATICS Epijournal de Geometrie Algebrique Pub Date : 2020-07-06 DOI:10.46298/epiga.2023.volume7.9818

S. Feyzbakhsh, Richard P. Thomas

引用次数: 8

Abstract

We work on a projective threefold $X$ which satisfies the Bogomolov-Gieseker conjecture of Bayer-Macr\`i-Toda, such as $\mathbb P^3$ or the quintic threefold. We prove certain moduli spaces of 2-dimensional torsion sheaves on $X$ are smooth bundles over Hilbert schemes of ideal sheaves of curves and points in $X$. When $X$ is Calabi-Yau this gives a simple wall crossing formula expressing curve counts (and so ultimately Gromov-Witten invariants) in terms of counts of D4-D2-D0 branes. These latter invariants are predicted to have modular properties which we discuss from the point of view of S-duality and Noether-Lefschetz theory.

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曲线计数和s对偶性

我们研究了一个满足Bayer-Macr\ i-Toda的bogomolov - gieseker猜想的投影三次元X$，例如$\mathbb P^3$或五次三次元。证明了X$上二维扭转束的模空间是X$上理想曲线和点束的Hilbert格式上的光滑束。当$X$是Calabi-Yau时，这给出了一个简单的壁交叉公式，表示曲线计数(因此最终是Gromov-Witten不变量)以d4 - d2 - d0膜的计数。我们从s -对偶和noether - lefschetz理论的角度讨论了后一种不变量的模性。

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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