Article
Optimal preparation of graph states
Author/s | Cabello Quintero, Adán
Danielsen, Lars Eirik López Tarrida, Antonio José Portillo Fernández, José Ramón |
Department | Universidad de Sevilla. Departamento de Matemática Aplicada I (ETSII) Universidad de Sevilla. Departamento de Física Aplicada II |
Publication Date | 2011 |
Deposit Date | 2022-07-29 |
Published in |
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Abstract | We show how to prepare any graph state of up to 12 qubits with (a) the minimum number of controlled-Z
gates and (b) the minimum preparation depth. We assume only one-qubit and controlled-Z gates. The method
exploits the ... We show how to prepare any graph state of up to 12 qubits with (a) the minimum number of controlled-Z gates and (b) the minimum preparation depth. We assume only one-qubit and controlled-Z gates. The method exploits the fact that any graph state belongs to an equivalence class under local Clifford operations. We extend up to 12 qubits the classification of graph states according to their entanglement properties, and identify each class using only a reduced set of invariants. For any state, we provide a circuit with both properties (a) and (b), if it does exist, or, if it does not, one circuit with property (a) and one with property (b), including the explicit one-qubit gates needed. |
Funding agencies | Ministerio de Ciencia, Innovación y Universidades (MICINN). España |
Project ID. | FIS2008-05596
MTM2008-05866 |
Citation | Cabello Quintero, A., Danielsen, L.E., López Tarrida, A.J. y Portillo Fernández, J.R. (2011). Optimal preparation of graph states. Physical Review A, 83 (4, art. nº 042314), 042314-1-042314-7. |
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PhysRevA.83.042314.pdf | 418.5Kb | [PDF] | View/ | |