A new approach to the constructions of braided T-categories
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Publication:5023119
DOI10.2298/FIL1720561LzbMath1499.16076arXiv1605.01966OpenAlexW2797639165MaRDI QIDQ5023119
Publication date: 20 January 2022
Published in: Filomat (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1605.01966
Hopf algebras and their applications (16T05) Braided monoidal categories and ribbon categories (18M15)
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Cites Work
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- Determinants, integrality and Noether's theorem for quantum commutative algebras
- Frobenius and separable functors for generalized module categories and nonlinear equations
- Homotopy quantum field theory. With appendices by Michael Müger and Alexis Virelizier.
- Constructing new braided \(T\)-categories over weak Hopf algebras.
- Generalized (anti) Yetter-Drinfeld modules as components of a braided \(T\)-category.
- A Schur double centralizer theorem for cotriangular Hopf algebras and generalized Lie algebras
- Braided compact closed categories with applications to low dimensional topology
- New Turaev braided group categories and group Schur-Weyl duality.
- Minimal quasitriangular Hopf algebras
- A Class of Coquasitriangular Hopf Group Algebras
- Constructing New BraidedT-Categories Over Regular Multiplier Hopf Algebras
- Involutory Hopf group-coalgebras and flat bundles over 3-manifolds
- Two dual classes of bialgebras related to the concepts of “quantum group” and “quantum lie algebra”
- Braided bialgebras and quadratic blalgebras
- On braided hopf algebra structures over the twisted smash products1
- Constructing Quasitriangular Hopf Algebras
- Constructing New Crossed Group Categories Over Weak Hopf Group Algebras
- On the braided structures of bicrossproduct Hopf algebras
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