Braiding structures on categorical multi-Interval Jones-Wassermann subfactor
量子代数
2026-07-09 v1 数学物理
范畴论
几何拓扑
算子代数
摘要
In this paper, we construct braiding structures on the multi-interval Jones-Wassermann subfactor planar algebra associated with any unitary modular fusion category. Utilizing this construction, we provide a new proof of the self-duality of these subfactors. Furthermore, we demonstrate that these braidings induce a projective unitary representation of the balanced superelliptic mapping class group; consequently, these structures effectively encode the non-trivial higher-genus data of the underlying category. As an application of this correspondence, we derive a generalized Verlinde formula as 2-box Fourier duality of the planar algebra.
引用
@article{arxiv.2607.08296,
title = {Braiding structures on categorical multi-Interval Jones-Wassermann subfactor},
author = {Zhengwei Liu and Yuze Ruan},
journal= {arXiv preprint arXiv:2607.08296},
year = {2026}
}
备注
51 pages, many figures; comments welcome!