纯𝑆𝑈(2)规范理论配分函数与广义贝塞尔核

Proceedings of Symposia in Pure Mathematics Pub Date : 2017-05-04 DOI:10.1090/PSPUM/098/01727

P. Gavrylenko, O. Lisovyy

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引用次数: 21

摘要

我们证明了自对偶$\Omega$-背景(a)中纯$\mathcal N=2$ $SU(2)$规范理论的对偶配分函数是由广义贝塞尔核的Fredholm行列式给出的，并且(b)与$D_8$型Painleve III方程(径向正弦- gordon方程)通解相关的tau函数一致。特别地，Fredholm行列式的主次展开式产生了Young图对上的Nekrasov组合和。

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Pure 𝑆𝑈(2) gauge theory partition function and generalized Bessel kernel

We show that the dual partition function of the pure $\mathcal N=2$ $SU(2)$ gauge theory in the self-dual $\Omega$-background (a) is given by Fredholm determinant of a generalized Bessel kernel and (b) coincides with the tau function associated to the general solution of the Painleve III equation of type $D_8$ (radial sine-Gordon equation). In particular, the principal minor expansion of the Fredholm determinant yields Nekrasov combinatorial sums over pairs of Young diagrams.

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