A superpotential for Grassmannian Schubert varieties

Konstanze Rietsch, Lauren Williams
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Abstract

While mirror symmetry for flag varieties and Grassmannians has been extensively studied, Schubert varieties in the Grassmannian are singular, and hence standard mirror symmetry statements are not well-defined. Nevertheless, in this article we introduce a ``superpotential'' $W^{\lambda}$ for each Grassmannian Schubert variety $X_{\lambda}$, generalizing the Marsh-Rietsch superpotential for Grassmannians, and we show that $W^{\lambda}$ governs many toric degenerations of $X_{\lambda}$. We also generalize the ``polytopal mirror theorem'' for Grassmannians from our previous work: namely, for any cluster seed $G$ for $X_{\lambda}$, we construct a corresponding Newton-Okounkov convex body $\Delta_G^{\lambda}$, and show that it coincides with the superpotential polytope $\Gamma_G^{\lambda}$, that is, it is cut out by the inequalities obtained by tropicalizing an associated Laurent expansion of $W^{\lambda}$. This gives us a toric degeneration of the Schubert variety $X_{\lambda}$ to the (singular) toric variety $Y(\mathcal{N}_{\lambda})$ of the Newton-Okounkov body. Finally, for a particular cluster seed $G=G^\lambda_{\mathrm{rec}}$ we show that the toric variety $Y(\mathcal{N}_{\lambda})$ has a small toric desingularisation, and we describe an intermediate partial desingularisation $Y(\mathcal{F}_\lambda)$ that is Gorenstein Fano. Many of our results extend to more general varieties in the Grassmannian.
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格拉斯曼舒伯特变体的超势能
虽然对旗变和格拉斯曼的镜像对称性已有广泛研究,但格拉斯曼中的舒伯特变是奇异的,因此标准的镜像对称性声明并不明确。然而,在这篇文章中,我们为每个格拉斯曼中的舒伯特变$X_{\lambda}$引入了一个 "超势能"$W^{\lambda}$,概括了格拉斯曼的马什-里奇超势能,并证明了$W^{\lambda}$支配着$X_{\lambda}$的多子退化。我们还推广了先前工作中针对格拉斯曼的 "多顶镜像定理":即对于 $X_{\lambda}$ 的任何簇种子 $G$,我们构造了一个相应的牛顿-奥孔科夫凸体 $/Delta_G^{/lambda}$,并证明它与超势能多面体 $\Gamma_G^{\lambda}$ 重合,也就是说,它是通过对 $W^{\lambda}$ 的相关劳伦展开进行热带化而得到的不等式切割出来的。这样,我们就得到了舒伯特变元 $X_{\lambda}$ 到牛顿-奥孔科夫体(奇异)变元 $Y(\mathcal{N}_{\lambda})$的环状退化。最后,对于一个特定的簇种子 $G=G^\lambda_{\mathrm{rec}}$,我们展示了环综 $Y(\mathcal{N}_\{lambda})$ 有一个小的环去奇化,并且我们描述了一个中间部分去奇化 $Y(\mathcal{F}_\lambda)$,它是戈伦斯坦法诺的。我们的许多结果都可以推广到格拉斯曼中更多的一般 varieties 上。
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