手性共形场论中的融合与正向性

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
James E. Tener
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引用次数: 0

摘要

在本文中,我们证明了与 WZW 模型相对应的共形网是合理的,从而解决了一个长期悬而未决的问题。具体地说,我们证明了与这些模型相关的琼斯-瓦塞尔曼子因子具有有限指数。这一结果最早是在 90 年代初猜想出来的,但之前只在特殊情况下得到过证明,从瓦塞尔曼在 A 型中的里程碑式结果开始。证明依赖于一个新框架,用于系统地比较共形网表示的张量积(又称 "融合")与顶点算子代数模块的相应张量积。这个框架基于 "有界局部顶点算子 "的几何技术,它通过局部薄黎曼曲面中的插入算子来实现可观测量的代数。我们获得了证明琼斯-瓦塞尔曼子因子具有有限指数的一般方法,并将其应用于 WZW 模型之外的其他重要范例系列。我们还考虑了VOA的一类实在性现象的应用,并以此勾勒出一个程序,用于识别VOA和保角网的单元张量乘积理论,即使是对于乖离模型也是如此。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Fusion and Positivity in Chiral Conformal Field Theory

Fusion and Positivity in Chiral Conformal Field Theory

In this article we show that the conformal nets corresponding to WZW models are rational, resolving a long-standing open problem. Specifically, we show that the Jones-Wassermann subfactors associated with these models have finite index. This result was first conjectured in the early 90s but had previously only been proven in special cases, beginning with Wassermann’s landmark results in type A. The proof relies on a new framework for the systematic comparison of tensor products (a.k.a. ‘fusion’) of conformal net representations with the corresponding tensor product of vertex operator algebra modules. This framework is based on the geometric technique of ‘bounded localized vertex operators,’ which realizes algebras of observables via insertion operators localized in partially thin Riemann surfaces. We obtain a general method for showing that Jones-Wassermann subfactors have finite index, and apply it to additional families of important examples beyond WZW models. We also consider applications to a class of positivity phenomena for VOAs, and use this to outline a program for identifying unitary tensor product theories of VOAs and conformal nets even for badly-behaved models.

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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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