Abstract
AbstractA bi-unitary connection in subfactor theory of Jones producing a subfactor of finite depth gives a 4-tensor appearing in a recent work of Bultinck–Mariën–Williamson–Şahinoğlu-Haegeman–Verstraete on two-dimensional topological order and anyons. In their work, they have a special projection called a projector matrix product operator. We prove that the range of this projection of length k is naturally identified with the kth higher relative commutant of the subfactor arising from the bi-unitary connection. This gives a further connection between two-dimensional topological order and subfactor theory.
Funder
Japan Society for the Promotion of Science
Japan Science and Technology Corporation
Publisher
Springer Science and Business Media LLC
Reference21 articles.
1. Asaeda, M., Haagerup, U.: Exotic subfactors of finite depth with Jones indices $$(5+\sqrt{13)}/2$$ and $$(5+\sqrt{17})/2$$. Commun. Math. Phys. 202, 1–63 (1999)
2. Bultinck, N., Mariën, M., Williamson, D.J., Şahinoğlu, M.B., Haegeman, J., Verstraete, F.: Anyons and matrix product operator algebras. Ann. Phys. 378, 183–233 (2017)
3. Choda, M.: Index for factors generated by Jones’ two sided sequence of projections. Pacific J. Math. 139, 1–16 (1989)
4. Evans, D.E., Kawahigashi, Y.: Quantum Symmetries on Operator Algebras. Oxford University Press, Oxford (1998)
5. Jones, V.F.R.: Index for subfactors. Invent. Math. 72, 1–25 (1983)
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