Your search keyword '"Shiang Yong Looi"' showing total 3 results

1. Tripartite Entanglement in Qudit Stabilizer States and Application in Quantum Error Correction

Author

Shiang Yong Looi and Robert B. Griffiths

Subjects

Discrete mathematics, Physics, Quantum Physics, Cluster state, FOS: Physical sciences, Quantum entanglement, 01 natural sciences, Atomic and Molecular Physics, and Optics, 010305 fluids & plasmas, Greenberger–Horne–Zeilinger state, Separable state, Quantum mechanics, 0103 physical sciences, Quantum convolutional code, W state, 010306 general physics, Quantum Physics (quant-ph), Entanglement distillation, Quantum teleportation

Abstract

Consider a stabilizer state on $n$ qudits, each of dimension $D$ with $D$ being a prime or a squarefree integer, divided into three mutually disjoint sets or parts. Generalizing a result of Bravyi et al. [J. Math. Phys. \textbf{47}, 062106 (2006)] for qubits (D=2), we show that up to local unitaries on the three parts the state can be written as a tensor product of unentangled single-qudit states, maximally entangled EPR pairs, and tripartite GHZ states. We employ this result to obtain a complete characterization of the properties of a class of channels associated with stabilizer error-correcting codes, along with their complementary channels., Comment: 15 pages, 2 figures

Published

2011

2. Construction of equally entangled bases in arbitrary dimensions via quadratic Gauss sums and graph states

Author

Shiang Yong Looi and Vlad Gheorghiu

Subjects

Physics, Quantum Physics, Pure mathematics, Open problem, FOS: Physical sciences, Graph theory, Mathematical Physics (math-ph), Quantum entanglement, Quadratic Gauss sum, 16. Peace & justice, Graph state, 01 natural sciences, Atomic and Molecular Physics, and Optics, 010305 fluids & plasmas, Quantum mechanics, 0103 physical sciences, Bipartite graph, Orthonormal basis, Quantum Physics (quant-ph), 010306 general physics, Mathematical Physics, No-communication theorem

Abstract

Recently [Karimipour and Memarzadeh, Phys. Rev. A 73, 012329 (2006)] studied the problem of finding a family of orthonormal bases in a bipartite space each of dimension $D$ with the following properties: (i) The family continuously interpolates between the product basis and the maximally entangled basis as some parameter $t$ is varied, and (ii) for a fixed $t$, all basis states have the same amount of entanglement. The authors derived a necessary condition and provided explicit solutions for $D \leq 5$ but the existence of a solution for arbitrary dimensions remained an open problem. We prove that such families exist in arbitrary dimensions by providing two simple solutions, one employing the properties of quadratic Gauss sums and the other using graph states. The latter can be generalized to multipartite equientangled bases with more than two parties., Comment: Minor changes, replaced by the published version. Any comments are welcome!

Published

2010

3. Location of quantum information in additive graph codes

Author

Vlad Gheorghiu, Robert B. Griffiths, and Shiang Yong Looi

Subjects

Discrete mathematics, Physics, Quantum network, Quantum Physics, FOS: Physical sciences, Coherent information, Quantum capacity, Quantum channel, 01 natural sciences, Atomic and Molecular Physics, and Optics, 010305 fluids & plasmas, Quantum mechanics, 0103 physical sciences, Quantum operation, Quantum algorithm, Quantum information, 010306 general physics, Quantum information science, Quantum Physics (quant-ph)

Abstract

The location of quantum information in various subsets of the qudit carriers of an additive graph code is discussed using a collection of operators on the coding space which form what we call the information group. It represents the input information through an encoding operation constructed as an explicit quantum circuit. Partial traces of these operators down to a particular subset of carriers provide an isomorphism of a subgroup of the information group, and this gives a precise characterization of what kinds of information they contain. All carriers are assumed to have the same dimension D, an arbitrary integer greater than 1., Comments are welcome. 17 pages with 4 figures

Published

2009