Dijkgraaf-Witten范畴的Frobenius一元函子和刚性Frobenius代数

IF 0.9 3区物理与天体物理 Q2 MATHEMATICS Symmetry Integrability and Geometry-Methods and Applications Pub Date : 2023-10-12 DOI:10.3842/sigma.2023.075

Samuel Hannah, Robert Laugwitz, Ana Ros Camacho

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引用次数: 0

摘要

我们构造了一个从$\mathcal{Z}\big(\mathsf{Vect}_H^{\omega|_H}\big)$到$\mathcal{Z}\big(\mathsf{Vect}_G^\omega\big)$的可分离的Frobenius一元函子，它适用于$G$的任意子群$H$，并且保留了编织结构和带状结构。作为应用，我们在$\mathcal{Z}\big(\mathsf{Vect}_G^\omega\big)$中对刚性Frobenius代数进行了分类，恢复了Davydov-Simmons [J]在这些类别中对 δ δ代数的分类。[j] .数学学报(自然科学版)，2017,44 (4):555 - 557 .]基于Kirillov-Ostrik的结果，这类代数上的局部模的范畴是模张量范畴[j] .数学学报，2004(6)，393 - 397，第14页:数学版。QA/0101219]在半简单情况下和Laugwitz-Walton [Comm. Math.]理论物理。， to appear， [xiv:2202.08644]在一般情况下。

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Frobenius Monoidal Functors of Dijkgraaf-Witten Categories and Rigid Frobenius Algebras

We construct a separable Frobenius monoidal functor from $\mathcal{Z}\big(\mathsf{Vect}_H^{\omega|_H}\big)$ to $\mathcal{Z}\big(\mathsf{Vect}_G^\omega\big)$ for any subgroup $H$ of $G$ which preserves braiding and ribbon structure. As an application, we classify rigid Frobenius algebras in $\mathcal{Z}\big(\mathsf{Vect}_G^\omega\big)$, recovering the classification of étale algebras in these categories by Davydov-Simmons [J. Algebra 471 (2017), 149-175, arXiv:1603.04650] and generalizing their classification to algebraically closed fields of arbitrary characteristic. Categories of local modules over such algebras are modular tensor categories by results of Kirillov-Ostrik [Adv. Math. 171 (2002), 183-227, arXiv:math.QA/0101219] in the semisimple case and Laugwitz-Walton [Comm. Math. Phys., to appear, arXiv:2202.08644] in the general case.

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来源期刊

Symmetry Integrability and Geometry-Methods and Applications 物理-物理：数学物理

CiteScore

1.80

自引率

0.00%

发文量

审稿时长

4-8 weeks

期刊介绍： Scope Geometrical methods in mathematical physics Lie theory and differential equations Classical and quantum integrable systems Algebraic methods in dynamical systems and chaos Exactly and quasi-exactly solvable models Lie groups and algebras, representation theory Orthogonal polynomials and special functions Integrable probability and stochastic processes Quantum algebras, quantum groups and their representations Symplectic, Poisson and noncommutative geometry Algebraic geometry and its applications Quantum field theories and string/gauge theories Statistical physics and condensed matter physics Quantum gravity and cosmology.