第一类复量子陈-西蒙斯理论

Pub Date : 2020-12-31 DOI:10.4310/JSG.2022.v20.n6.a1

J. Andersen, A. Malusà, Gabriele Rembado

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引用次数: 3

摘要

研究了闭属1曲面和半单复群的Chern—Simons理论的几何量子化问题。首先，我们引入了K\ {a}hler量化中Hitchin连接的自然复化模拟，其极化来自平坦连接的模空间的非阿贝尔Hodge超K\ {a}hler几何，从而补充了Witten的实极化方法。然后考虑Witten连接，并利用模空间上极化截面上的Bargmann变换的一个版本，将其与复化的Hitchin连接进行了标识。

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Genus-one complex quantum Chern–Simons theory

We consider the geometric quantisation of Chern--Simons theory for closed genus-one surfaces and semisimple complex groups. First we introduce the natural complexified analogue of the Hitchin connection in K\"{a}hler quantisation, with polarisations coming from the nonabelian Hodge hyper-K\"{a}hler geometry of the moduli spaces of flat connections, thereby complementing the real-polarised approach of Witten. Then we consider the connection of Witten, and we identify it with the complexified Hitchin connection using a version of the Bargmann transform on polarised sections over the moduli spaces.

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