Stable pairs on local curves and Bethe roots

Maximilian Schimpf
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Abstract

We give an explicit formula for the descendent stable pair invariants of all (absolute) local curves in terms of certain power series called Bethe roots, which also appear in the physics/representation theory literature. We derive new explicit descriptions for the Bethe roots which are of independent interest. From this we derive rationality, functional equation and a characterization of poles for the full descendent stable pair theory of local curves as conjectured by Pandharipande and Pixton. We also sketch how our methods give a new approach to the spectrum of quantum multiplication on $\mathsf{Hilb}^n(\mathbf{C}^2)$.
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局部曲线上的稳定对和贝特根
我们给出了所有(绝对)局部曲线的后代稳定对不变式的明确公式,这些公式是以某些称为贝特根的幂级数表示的,这些幂级数也出现在物理学/表示论文献中。我们对贝特根进行了新的明确描述,这也是我们的兴趣所在。由此,我们推导出潘达里潘德和皮克斯顿猜想的局部曲线的全后裔稳定对理论的合理性、函数方程和极点特征。我们还简要介绍了我们的方法如何为$\mathsf{Hilb}^n(\mathbf{C}^2)$上的量子乘法谱提供了一种新方法。
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