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On the Unitary Representations of the Braid Group B 6

Author

Listed:
  • Malak M. Dally

    (Department of Mathematics and Computer Science, Faculty of Science, Beirut Arab University, P.O. Box 11-5020 Beirut, Lebanon)

  • Mohammad N. Abdulrahim

    (Department of Mathematics and Computer Science, Faculty of Science, Beirut Arab University, P.O. Box 11-5020 Beirut, Lebanon)

Abstract

We consider a non-abelian leakage-free qudit system that consists of two qubits each composed of three anyons. For this system, we need to have a non-abelian four dimensional unitary representation of the braid group B 6 to obtain a totally leakage-free braiding. The obtained representation is denoted by ρ . We first prove that ρ is irreducible. Next, we find the points y ∈ C * at which the representation ρ is equivalent to the tensor product of a one dimensional representation χ ( y ) and μ ^ 6 ( ± i ) , an irreducible four dimensional representation of the braid group B 6 . The representation μ ^ 6 ( ± i ) was constructed by E. Formanek to classify the irreducible representations of the braid group B n of low degree. Finally, we prove that the representation χ ( y ) ⊗ μ ^ 6 ( ± i ) is a unitary relative to a hermitian positive definite matrix.

Suggested Citation

  • Malak M. Dally & Mohammad N. Abdulrahim, 2019. "On the Unitary Representations of the Braid Group B 6," Mathematics, MDPI, vol. 7(11), pages 1-7, November.
  • Handle: RePEc:gam:jmathe:v:7:y:2019:i:11:p:1080-:d:285251
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