2018
DOI: 10.1103/physreva.98.052316
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Propagation of generalized Pauli errors in qudit Clifford circuits

Abstract: It is important for performance studies in quantum technologies to analyze quantum circuits in the presence of noise. We introduce an error probability tensor, a tool to track generalized Pauli error statistics of qudits within quantum circuits composed of qudit Clifford gates. Our framework is compatible with qudit stabilizer quantum error-correcting codes. We show how the error probability tensor can be applied in the most general case, and we demonstrate an error analysis of bipartite qudit repeaters with q… Show more

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Cited by 21 publications
(29 citation statements)
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“…Finally, the simulator applies an idle error to every qudit. This noise simulation methodology is consistent with previous simulation techniques which have accounted for either gate errors [42] or idle errors [43]. To simulate with noise, we first apply the ideal gates, followed by a gate error noise channel on each affected qudit.…”
Section: Noise Simulationmentioning
confidence: 82%
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“…Finally, the simulator applies an idle error to every qudit. This noise simulation methodology is consistent with previous simulation techniques which have accounted for either gate errors [42] or idle errors [43]. To simulate with noise, we first apply the ideal gates, followed by a gate error noise channel on each affected qudit.…”
Section: Noise Simulationmentioning
confidence: 82%
“…We now use the generalized Pauli matrices: The Cartesian product of {I, X +1 , X 2 +1 } and {I, Z 3 , Z 2 3 } constitutes a basis for all 3x3 matrices. Hence, this Cartesian product also constitutes the Kraus operators for the single-qutrit gate error [42,65,66]:…”
Section: A1 Generic Noise Modelmentioning
confidence: 99%
“…is an example of a generalized Pauli-error channel where the trivial error X 0 Z 0 = 1 occurs with probability p 0,0 = 1−f +f /D 2 and any other error occurs with probability f /D 2 [33].…”
Section: Abstract Description Of Quditsmentioning
confidence: 99%
“…The controlled-Z gate, Fock [33,[37][38][39]. Alice produces the two-qudit state |Φ = cz |+ ⊗2 , stores one qudit into a quantum memory (QM), and sends the other qudit to the first intermediate repeater station.…”
Section: Abstract Description Of Quditsmentioning
confidence: 99%
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