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Article Dans Une Revue Communications in Contemporary Mathematics Année : 2023

Mapping Class Group Representations From Non-Semisimple TQFTs

Résumé

In [arXiv:1912.02063], we constructed 3-dimensional Topological Quantum Field Theories (TQFTs) using not necessarily semisimple modular categories. Here, we study projective representations of mapping class groups of surfaces defined by these TQFTs, and we express the action of a set of generators through the algebraic data of the underlying modular category $\mathcal{C}$. This allows us to prove that the projective representations induced from the non-semisimple TQFTs of [arXiv:1912.02063] are equivalent to those obtained by Lyubashenko via generators and relations in [arXiv:hep-th/9405167]. Finally, we show that, when $\mathcal{C}$ is the category of finite-dimensional representations of the small quantum group of $\mathfrak{sl}_2$, the action of all Dehn twists for surfaces without marked points has infinite order.

Dates et versions

hal-02992280 , version 1 (06-11-2020)

Identifiants

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Marco de Renzi, Azat Gainutdinov, Nathan Geer, Bertrand Patureau-Mirand, Ingo Runkel. Mapping Class Group Representations From Non-Semisimple TQFTs. Communications in Contemporary Mathematics, 2023, 25 (01), ⟨10.1142/S0219199721500917⟩. ⟨hal-02992280⟩
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