dorsal/arxiv
View SchemaBraid Group, Temperley--Lieb Algebra, and Quantum Information and Computation
| Authors | Yong Zhang |
|---|---|
| Categories | |
| ArXiv ID | quant-ph/0601050 |
| URL | https://arxiv.org/abs/quant-ph/0601050 |
| Journal | AMS Contemporary Mathematics, Vol 482 (2009) 51-92 |
Abstract
In this paper, we explore algebraic structures and low dimensional topology underlying quantum information and computation. We revisit quantum teleportation from the perspective of the braid group, the symmetric group and the virtual braid group, and propose the braid teleportation, the teleportation swapping and the virtual braid teleportation, respectively. Besides, we present a physical interpretation for the braid teleportation and explain it as a sort of crossed measurement. On the other hand, we propose the extended Temperley--Lieb diagrammatical approach to various topics including quantum teleportation, entanglement swapping, universal quantum computation, quantum information flow, and etc. The extended Temperley--Lieb diagrammatical rules are devised to present a diagrammatical representation for the extended Temperley--Lieb category which is the collection of all the Temperley--Lieb algebras with local unitary transformations. In this approach, various descriptions of quantum teleportation are unified in a diagrammatical sense, universal quantum computation is performed with the help of topological-like features, and quantum information flow is recast in a correct formulation. In other words, we propose the extended Temperley--Lieb category as a mathematical framework to describe quantum information and computation involving maximally entangled states and local unitary transformations.
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"abstract": "In this paper, we explore algebraic structures and low dimensional topology\nunderlying quantum information and computation. We revisit quantum\nteleportation from the perspective of the braid group, the symmetric group and\nthe virtual braid group, and propose the braid teleportation, the teleportation\nswapping and the virtual braid teleportation, respectively. Besides, we present\na physical interpretation for the braid teleportation and explain it as a sort\nof crossed measurement. On the other hand, we propose the extended\nTemperley--Lieb diagrammatical approach to various topics including quantum\nteleportation, entanglement swapping, universal quantum computation, quantum\ninformation flow, and etc. The extended Temperley--Lieb diagrammatical rules\nare devised to present a diagrammatical representation for the extended\nTemperley--Lieb category which is the collection of all the Temperley--Lieb\nalgebras with local unitary transformations. In this approach, various\ndescriptions of quantum teleportation are unified in a diagrammatical sense,\nuniversal quantum computation is performed with the help of topological-like\nfeatures, and quantum information flow is recast in a correct formulation. In\nother words, we propose the extended Temperley--Lieb category as a mathematical\nframework to describe quantum information and computation involving maximally\nentangled states and local unitary transformations.",
"arxiv_id": "quant-ph/0601050",
"authors": [
"Yong Zhang"
],
"categories": [
"quant-ph",
"hep-th",
"math-ph",
"math.MP"
],
"journal_ref": "AMS Contemporary Mathematics, Vol 482 (2009) 51-92",
"title": "Braid Group, Temperley--Lieb Algebra, and Quantum Information and Computation",
"url": "https://arxiv.org/abs/quant-ph/0601050"
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