α$引起的双单元连接的平坦性与弗罗贝尼斯代数的交换性

arXiv - MATH - Quantum Algebra Pub Date : 2024-08-10 DOI:arxiv-2408.05501

Yasuyuki Kawahigashi

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引用次数: 0

摘要

被称为$\alpha$-induction的张量函子从弗罗贝纽斯代数或$Q$-系统中产生一个新的单元融合范畴，该范畴是一个编织单元融合范畴。双单元连接是符合某些公理的复数有限族，它实现了任何单元融合范畴中的一个对象。伊塔索给出了琼斯子因子理论中有限维非enerate换元平方的特征，并实现了最近对2元维拓扑阶的研究中出现的某个4元张量。我们研究了双单元连接的$\alpha$-induction，并证明由此产生的$\alpha$-induced 双单元连接的平坦性意味着原始弗罗本尼斯代数的换元性。这给出了我们之前结果的反义，并回答了朗格（R. Longo）提出的一个问题。我们还进一步给出了$\α$诱导双单元连接的平面部分与布肯豪尔-埃文斯研究的交换弗罗贝尼斯子代数之间更精细的对应关系。

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Flatness of $α$-induced bi-unitary connections and commutativity of Frobenius algebras

The tensor functor called $\alpha$-induction produces a new unitary fusion category from a Frobenius algebra, or a $Q$-system, in a braided unitary fusion category. A bi-unitary connection, which is a finite family of complex number subject to some axioms, realizes an object in any unitary fusion category. It also gives a characterization of a finite-dimensional nondegenerate commuting square in subfactor theory of Jones and realizes a certain $4$-tensor appearing in recent studies of $2$-dimensional topological order. We study $\alpha$-induction for bi-unitary connections, and show that flatness of the resulting $\alpha$-induced bi-unitary connections implies commutativity of the original Frobenius algebra. This gives a converse of our previous result and answers a question raised by R. Longo. We furthermore give finer correspondence between the flat parts of the $\alpha$-induced bi-unitary connections and the commutative Frobenius subalgebras studied by B\"ockenhauer-Evans.

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arXiv - MATH - Quantum Algebra

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