Gaëtan Borot, Vincent Bouchard, Nitin K. Chidambaram, Thomas Creutzig
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引用次数: 0
摘要
我们将 \(\mathcal {W}^{textsf{k}}(\mathfrak {g})\模块的惠特克向量(Whittaker vectors)与高等艾里结构的分割函数(partition functions of higher Airy structures)相提并论。这意味着可以通过非交换版本的契科夫-艾纳德-奥兰汀拓扑递推来计算Gaiotto矢量,该矢量描述了对于复杂简单李群来说,G-束在\(\mathbb {P}^2\) 上的模空间的适当紧凑化的等变同调中的基类。我们提出了 A、B、C 和 D 型 Gaiotto 向量与高阶艾里结构的联系,并明确构建了 A 型(任意级)和 B 型(自双级)的拓扑递归。在物理学方面,这意味着可以通过拓扑递归方法获取纯粹(\mathcal {N} = 2\ )四维超对称规理论的涅克拉索夫划分函数。
Whittaker vectors for $$\mathcal {W}$$ -algebras from topological recursion
We identify Whittaker vectors for \(\mathcal {W}^{\textsf{k}}(\mathfrak {g})\)-modules with partition functions of higher Airy structures. This implies that Gaiotto vectors, describing the fundamental class in the equivariant cohomology of a suitable compactification of the moduli space of G-bundles over \(\mathbb {P}^2\) for G a complex simple Lie group, can be computed by a non-commutative version of the Chekhov–Eynard–Orantin topological recursion. We formulate the connection to higher Airy structures for Gaiotto vectors of type A, B, C, and D, and explicitly construct the topological recursion for type A (at arbitrary level) and type B (at self-dual level). On the physics side, it means that the Nekrasov partition function for pure \(\mathcal {N} = 2\) four-dimensional supersymmetric gauge theories can be accessed by topological recursion methods.
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