Frobenius subalgebra lattices in tensor categories
This course will cover the paper [GP25] in reference. Here is its abstract:
This paper studies Frobenius subalgebra posets in abelian monoidal categories and shows that, under general conditions--satisfied in all semisimple tensor categories over the complex field--they collapse to lattices through a rigidity invariance perspective. Based on this, we extend Watatani's finiteness theorem for intermediate subfactors by proving that, under a weak positivity assumption--met by all semisimple tensor categories over the complex field--and a compatibility condition--fulfilled by all pivotal ones--the lattices arising from connected Frobenius algebras are finite. We also derive a non-semisimple version via semisimplification. Our approach relies on the concept of a formal angle, and the extension of key results--such as the planar algebraic exchange relation and Landau's theorems--to linear monoidal categories.
Major applications of our findings include a stronger version of the Ino-Watatani result: we show that the finiteness of intermediate C*-algebras holds in a finite-index unital irreducible inclusion of C*-algebras without requiring the simple assumption. Moreover, for a finite-dimensional semisimple Hopf algebra H, we prove that H* is a Frobenius algebra object in Rep(H) and has a finite number of rigid invariant Frobenius subalgebras. Finally, we explore a range of applications, including abstract spin chains, vertex operator algebras and speculations on quantum arithmetic involving the generalization of Ore's theorem, Euler's totient and sigma functions, and RH.
This paper studies Frobenius subalgebra posets in abelian monoidal categories and shows that, under general conditions--satisfied in all semisimple tensor categories over the complex field--they collapse to lattices through a rigidity invariance perspective. Based on this, we extend Watatani's finiteness theorem for intermediate subfactors by proving that, under a weak positivity assumption--met by all semisimple tensor categories over the complex field--and a compatibility condition--fulfilled by all pivotal ones--the lattices arising from connected Frobenius algebras are finite. We also derive a non-semisimple version via semisimplification. Our approach relies on the concept of a formal angle, and the extension of key results--such as the planar algebraic exchange relation and Landau's theorems--to linear monoidal categories.
Major applications of our findings include a stronger version of the Ino-Watatani result: we show that the finiteness of intermediate C*-algebras holds in a finite-index unital irreducible inclusion of C*-algebras without requiring the simple assumption. Moreover, for a finite-dimensional semisimple Hopf algebra H, we prove that H* is a Frobenius algebra object in Rep(H) and has a finite number of rigid invariant Frobenius subalgebras. Finally, we explore a range of applications, including abstract spin chains, vertex operator algebras and speculations on quantum arithmetic involving the generalization of Ore's theorem, Euler's totient and sigma functions, and RH.
讲师
日期
2026年03月05日 至 06月12日
位置
| Weekday | Time | Venue | Online | ID | Password |
|---|---|---|---|---|---|
| 周四,周五 | 15:20 - 16:55 | A3-3-301 | ZOOM 03 | 242 742 6089 | BIMSA |
修课要求
Familiarity with the concept of tensor categories is assumed; however, key definitions and fundamental results will be reviewed. For further reading, please refer to [EGNO15].
参考资料
[BDLR19] K.C. Bakshi, S. Das, Z. Liu, Y. Ren, An angle between intermediate subfactors and its rigidity. Trans. Amer. Math. Soc. 371 (2019), no. 8, 5973–5991, and arXiv:1710.00285.
[EGNO15] Etingof, Pavel; Gelaki, Shlomo; Nikshych, Dmitri; Ostrik, Victor. Tensor categories. Mathematical Surveys and Monographs, 205. American Mathematical Society, Providence, RI, 2015. xvi+343 pp.
[FS08] J. Fuchs, C. Stigner, On Frobenius algebras in rigid monoidal categories. Arab. J. Sci. Eng. Sect. C Theme Issues 33 (2008), no. 2, 175–191.
[GP25] Mainak Ghosh, Sebastien Palcoux; Frobenius subalgebra lattices in tensor categories; arXiv:2502.19876.
[M03] M. Müger, From subfactors to categories and topology. I. Frobenius algebras in and Morita equivalence of tensor categories. J. Pure Appl. Algebra 180 (2003), no. 1-2, 81–157.
[W96] Y. Watatani, Lattices of intermediate subfactors. J. Funct. Anal. 140 (1996), no. 2, 312–334.
[EGNO15] Etingof, Pavel; Gelaki, Shlomo; Nikshych, Dmitri; Ostrik, Victor. Tensor categories. Mathematical Surveys and Monographs, 205. American Mathematical Society, Providence, RI, 2015. xvi+343 pp.
[FS08] J. Fuchs, C. Stigner, On Frobenius algebras in rigid monoidal categories. Arab. J. Sci. Eng. Sect. C Theme Issues 33 (2008), no. 2, 175–191.
[GP25] Mainak Ghosh, Sebastien Palcoux; Frobenius subalgebra lattices in tensor categories; arXiv:2502.19876.
[M03] M. Müger, From subfactors to categories and topology. I. Frobenius algebras in and Morita equivalence of tensor categories. J. Pure Appl. Algebra 180 (2003), no. 1-2, 81–157.
[W96] Y. Watatani, Lattices of intermediate subfactors. J. Funct. Anal. 140 (1996), no. 2, 312–334.
听众
Undergraduate
, Advanced Undergraduate
, Graduate
, 博士后
, Researcher
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公开
笔记公开
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语言
英文
讲师介绍
2010年,获得马赛数学研究所(I2M)博士学位;2014-2016年,在印度数学科学研究所(IMSc)做博士后研究;2019年,在清华大学丘成桐数学科学中心(YMSC)担任为期一年的访问学者;2020-2024年,在BIMSA助理研究员 ;2024年至今,在BIMSA副研究员 。
主要研究领域包括量子代数、量子对称性、子因子、平面代数和融合范畴。在《Advances in Mathematics》、《Quantum Topology》、《IMRN》等期刊发表过论文。
主要研究领域包括量子代数、量子对称性、子因子、平面代数和融合范畴。在《Advances in Mathematics》、《Quantum Topology》、《IMRN》等期刊发表过论文。