Standard

Error correction using squeezed Fock states. / Королев, Сергей Борисович; Башмакова, Елизавета Николаевна; Голубева, Татьяна Юрьевна.

In: Quantum Information Processing, Vol. 23, No. 10, 354, 18.10.2024.

Research output: Contribution to journalArticlepeer-review

Harvard

Королев, СБ, Башмакова, ЕН & Голубева, ТЮ 2024, 'Error correction using squeezed Fock states', Quantum Information Processing, vol. 23, no. 10, 354. https://doi.org/10.1007/s11128-024-04549-w

APA

Королев, С. Б., Башмакова, Е. Н., & Голубева, Т. Ю. (2024). Error correction using squeezed Fock states. Quantum Information Processing, 23(10), [354]. https://doi.org/10.1007/s11128-024-04549-w

Vancouver

Королев СБ, Башмакова ЕН, Голубева ТЮ. Error correction using squeezed Fock states. Quantum Information Processing. 2024 Oct 18;23(10). 354. https://doi.org/10.1007/s11128-024-04549-w

Author

Королев, Сергей Борисович ; Башмакова, Елизавета Николаевна ; Голубева, Татьяна Юрьевна. / Error correction using squeezed Fock states. In: Quantum Information Processing. 2024 ; Vol. 23, No. 10.

BibTeX

@article{656a86e49a5944e394c6fcc31f483694,
title = "Error correction using squeezed Fock states",
abstract = "The paper addresses the construction of an error correction code for quantum computations based on squeezed Fock states. It is shown that the use of squeezed Fock states makes it possible to satisfy the Knill-Laflamme (KL) criteria for bosonic error correction codes. It is shown that the first squeezed Fock state corrects both particle loss and dephasing errors better than higher-order states. A comparison of the proposed code with a code based on the squeezed Schrodinger{\textquoteright}s cat states is carried out on the basis of the KL cost function. Using this function, we show that the squeezed first Fock state is competitive in protecting information in a channel with particle loss and dephasing.",
author = "Королев, {Сергей Борисович} and Башмакова, {Елизавета Николаевна} and Голубева, {Татьяна Юрьевна}",
year = "2024",
month = oct,
day = "18",
doi = "10.1007/s11128-024-04549-w",
language = "English",
volume = "23",
journal = "Quantum Information Processing",
issn = "1570-0755",
publisher = "Springer Nature",
number = "10",

}

RIS

TY - JOUR

T1 - Error correction using squeezed Fock states

AU - Королев, Сергей Борисович

AU - Башмакова, Елизавета Николаевна

AU - Голубева, Татьяна Юрьевна

PY - 2024/10/18

Y1 - 2024/10/18

N2 - The paper addresses the construction of an error correction code for quantum computations based on squeezed Fock states. It is shown that the use of squeezed Fock states makes it possible to satisfy the Knill-Laflamme (KL) criteria for bosonic error correction codes. It is shown that the first squeezed Fock state corrects both particle loss and dephasing errors better than higher-order states. A comparison of the proposed code with a code based on the squeezed Schrodinger’s cat states is carried out on the basis of the KL cost function. Using this function, we show that the squeezed first Fock state is competitive in protecting information in a channel with particle loss and dephasing.

AB - The paper addresses the construction of an error correction code for quantum computations based on squeezed Fock states. It is shown that the use of squeezed Fock states makes it possible to satisfy the Knill-Laflamme (KL) criteria for bosonic error correction codes. It is shown that the first squeezed Fock state corrects both particle loss and dephasing errors better than higher-order states. A comparison of the proposed code with a code based on the squeezed Schrodinger’s cat states is carried out on the basis of the KL cost function. Using this function, we show that the squeezed first Fock state is competitive in protecting information in a channel with particle loss and dephasing.

U2 - 10.1007/s11128-024-04549-w

DO - 10.1007/s11128-024-04549-w

M3 - Article

VL - 23

JO - Quantum Information Processing

JF - Quantum Information Processing

SN - 1570-0755

IS - 10

M1 - 354

ER -

ID: 126167503