dorsal/arxiv
View SchemaPermutation and Its Partial Transpose
| Authors | Yong Zhang, Louis H. Kauffman, Reinhard F. Werner |
|---|---|
| Categories | |
| ArXiv ID | quant-ph/0606005 |
| URL | https://arxiv.org/abs/quant-ph/0606005 |
| Journal | Int.J.Quant.Inf.5:469-507,2007 |
Abstract
Permutation and its partial transpose play important roles in quantum information theory. The Werner state is recognized as a rational solution of the Yang--Baxter equation, and the isotropic state with an adjustable parameter is found to form a braid representation. The set of permutation's partial transposes is an algebra called the "PPT" algebra which guides the construction of multipartite symmetric states. The virtual knot theory having permutation as a virtual crossing provides a topological language describing quantum computation having permutation as a swap gate. In this paper, permutation's partial transpose is identified with an idempotent of the Temperley--Lieb algebra. The algebra generated by permutation and its partial transpose is found to be the Brauer algebra. The linear combinations of identity, permutation and its partial transpose can form various projectors describing tangles; braid representations; virtual braid representations underlying common solutions of the braid relation and Yang--Baxter equations; and virtual Temperley--Lieb algebra which is articulated from the graphical viewpoint. They lead to our drawing a picture called the "ABPK" diagram describing knot theory in terms of its corresponding algebra, braid group and polynomial invariant. The paper also identifies nontrivial unitary braid representations with universal quantum gates, and derives a Hamiltonian to determine the evolution of a universal quantum gate, and further computes the Markov trace in terms of a universal quantum gate for a link invariant to detect linking numbers.
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"abstract": "Permutation and its partial transpose play important roles in quantum\ninformation theory. The Werner state is recognized as a rational solution of\nthe Yang--Baxter equation, and the isotropic state with an adjustable parameter\nis found to form a braid representation. The set of permutation\u0027s partial\ntransposes is an algebra called the \"PPT\" algebra which guides the construction\nof multipartite symmetric states. The virtual knot theory having permutation as\na virtual crossing provides a topological language describing quantum\ncomputation having permutation as a swap gate. In this paper, permutation\u0027s\npartial transpose is identified with an idempotent of the Temperley--Lieb\nalgebra. The algebra generated by permutation and its partial transpose is\nfound to be the Brauer algebra. The linear combinations of identity,\npermutation and its partial transpose can form various projectors describing\ntangles; braid representations; virtual braid representations underlying common\nsolutions of the braid relation and Yang--Baxter equations; and virtual\nTemperley--Lieb algebra which is articulated from the graphical viewpoint. They\nlead to our drawing a picture called the \"ABPK\" diagram describing knot theory\nin terms of its corresponding algebra, braid group and polynomial invariant.\nThe paper also identifies nontrivial unitary braid representations with\nuniversal quantum gates, and derives a Hamiltonian to determine the evolution\nof a universal quantum gate, and further computes the Markov trace in terms of\na universal quantum gate for a link invariant to detect linking numbers.",
"arxiv_id": "quant-ph/0606005",
"authors": [
"Yong Zhang",
"Louis H. Kauffman",
"Reinhard F. Werner"
],
"categories": [
"quant-ph",
"hep-th",
"math-ph",
"math.MP"
],
"journal_ref": "Int.J.Quant.Inf.5:469-507,2007",
"title": "Permutation and Its Partial Transpose",
"url": "https://arxiv.org/abs/quant-ph/0606005"
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