Braided Groups and Quantum Fourier Trans
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V. Lyubashenko; S. Majid
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Article
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1994
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Elsevier Science
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English
β 908 KB
We show that acting on every finite-dimensional factorizable ribbon Hopf algebra \(H\) there are invertible operators \(\mathscr{S}_{-}, \mathscr{T}\) obeying the modular identities \(\left(\mathscr{S}_{-} \mathscr{T}\right)^{3}=\lambda \mathscr{P}^{2}\), where \(\lambda\) is a constant. The class i