A generalization of King’s equation via noncommutative geometry

Topology and Geometry Pub Date : 2018-06-07 DOI:10.4171/irma/33-1/23

Gourab Bhattacharya, M. Kontsevich

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Abstract

We introduce a framework in noncommutative geometry consisting of a $*$-algebra $\mathcal A$, a bimodule $\Omega^1$ endowed with a derivation $\mathcal A\to \Omega^1$ and with a Hermitian structure $\Omega^1\otimes \bar{\Omega}^1\to \mathcal A$ (a "noncommutative Kahler form"), and a cyclic 1-cochain $\mathcal A\to \mathbb C$ whose coboundary is determined by the previous structures. These data give moment map equations on the space of connections on an arbitrary finitely-generated projective $\mathcal A$-module. As particular cases, we obtain a large class of equations in algebra (King's equations for representations of quivers, including ADHM equations), in classical gauge theory (Hermitian Yang-Mills equations, Hitchin equations, Bogomolny and Nahm equations, etc.), as well as in noncommutative gauge theory by Connes, Douglas and Schwarz. We also discuss Nekrasov's beautiful proposal for re-interpreting noncommutative instantons on $\mathbb{C}^n\simeq \mathbb{R}^{2n}$ as infinite-dimensional solutions of King's equation $$\sum_{i=1}^n [T_i^\dagger, T_i]=\hbar\cdot n\cdot\mathrm{Id}_{\mathcal H}$$ where $\mathcal H$ is a Hilbert space completion of a finitely-generated $\mathbb C[T_1,\dots,T_n]$-module (e.g. an ideal of finite codimension).

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金方程的非交换几何推广

我们在非交换几何中引入了一个框架，它由一个$*$ -代数$\mathcal A$，一个具有导数$\mathcal A\to \Omega^1$和厄米结构$\Omega^1\otimes \bar{\Omega}^1\to \mathcal A$(一种“非交换Kahler形式”)的双模$\Omega^1$和一个环1-协链$\mathcal A\to \mathbb C$组成，其共边界由前面的结构决定。这些数据给出了在任意有限生成的射影$\mathcal A$ -模块的连接空间上的矩映射方程。在特殊情况下，我们得到了代数中的一大批方程(表示颤振的King方程，包括ADHM方程)，经典规范理论中的方程(厄米杨-米尔斯方程，希钦方程，Bogomolny和Nahm方程等)，以及Connes, Douglas和Schwarz的非交换规范理论中的方程。我们还讨论了Nekrasov关于将$\mathbb{C}^n\simeq \mathbb{R}^{2n}$上的非交换实例重新解释为金方程$$\sum_{i=1}^n [T_i^\dagger, T_i]=\hbar\cdot n\cdot\mathrm{Id}_{\mathcal H}$$的无限维解的美丽建议，其中$\mathcal H$是有限生成的$\mathbb C[T_1,\dots,T_n]$ -模块的希尔伯特空间补全(例如有限余维的理想)。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Topology and Geometry

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