Stable envelopes for slices of the affine Grassmannian

Selecta Mathematica Pub Date : 2024-07-26 DOI:10.1007/s00029-024-00953-3
Ivan Danilenko
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Abstract

The affine Grassmannian associated to a reductive group \({\textbf{G}}\) is an affine analogue of the usual flag varieties. It is a rich source of Poisson varieties and their symplectic resolutions. These spaces are examples of conical symplectic resolutions dual to the Nakajima quiver varieties. We study the cohomological stable envelopes of Maulik and Okounkov (Astérisque 408:ix+209, 2019) in this family. We construct an explicit recursive relation for the stable envelopes in the \({\textbf{G}}= \textbf{PSL}_{2}\) case and compute the first-order correction in the general case. This allows us to write an exact formula for multiplication by a divisor.

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仿射格拉斯曼切片的稳定包络
与还原群 \({\textbf{G}}\) 相关的仿射格拉斯曼是通常旗状变体的仿射类似物。它是泊松数及其交映解析的丰富来源。这些空间是与中岛翘曲变体对偶的圆锥交映解析的例子。我们研究毛利克和奥孔科夫(Astérisque 408:ix+209, 2019)在这个族中的同调稳定包络。我们为\({\textbf{G}}= \textbf{PSL}_{2}\)情况下的稳定包络构建了明确的递归关系,并计算了一般情况下的一阶修正。这样,我们就可以写出除数乘法的精确公式了。
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Selecta Mathematica
Selecta Mathematica
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