An S3-symmetry of the Jacobi identity for intertwining operator algebras

Ling Chen

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An S3-symmetry of the Jacobi identity for intertwining operator algebras

机译：交织算子代数的Jacobi身份的S3对称

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We prove an S3-symmetry of the Jacobi identity for intertwining operator algebras. Since this Jacobi identity involves the braiding and fusing isomorphisms satisfying the genus-zero Moore-Seiberg equations, our proof uses not only the basic properties of intertwining operators, but also the properties of braiding and fusing isomorphisms and the genus-zero Moore-Seiberg equations. Our proof depends heavily on the theory of multivalued analytic functions of several variables, especially the theory of analytic extensions.

机译：我们证明了交织算子代数的Jacobi身份的S3对称性。由于该Jacobi恒等式涉及满足零类Moore-Seiberg方程的编织和融合同构，因此我们的证明不仅使用交织算子的基本性质，而且使用编织和融合同构的性质以及零类Moore-Seiberg方程。我们的证明在很大程度上取决于几个变量的多值分析函数的理论，尤其是解析扩展的理论。

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《New York Journal of Mathematics》 |2015年第29期|共42页
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Ling Chen;
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中图分类数学;
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An S3-symmetry of the Jacobi identity for intertwining operator algebras

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