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Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation. / Sedov, Egor V.; Freire, Pedro J.; Seredin, Vladimir V. et al.

In: Scientific Reports, Vol. 11, No. 1, 22857, 12.2021.

Research output: Contribution to journalArticlepeer-review

Harvard

Sedov, EV, Freire, PJ, Seredin, VV, Kolbasin, VA, Kamalian-Kopae, M, Chekhovskoy, IS, Turitsyn, SK & Prilepsky, JE 2021, 'Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation', Scientific Reports, vol. 11, no. 1, 22857. https://doi.org/10.1038/s41598-021-02252-9

APA

Sedov, E. V., Freire, P. J., Seredin, V. V., Kolbasin, V. A., Kamalian-Kopae, M., Chekhovskoy, I. S., Turitsyn, S. K., & Prilepsky, J. E. (2021). Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation. Scientific Reports, 11(1), [22857]. https://doi.org/10.1038/s41598-021-02252-9

Vancouver

Sedov EV, Freire PJ, Seredin VV, Kolbasin VA, Kamalian-Kopae M, Chekhovskoy IS et al. Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation. Scientific Reports. 2021 Dec;11(1):22857. doi: 10.1038/s41598-021-02252-9

Author

Sedov, Egor V. ; Freire, Pedro J. ; Seredin, Vladimir V. et al. / Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation. In: Scientific Reports. 2021 ; Vol. 11, No. 1.

BibTeX

@article{bdaea47579664a09860c12871404685d,
title = "Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schr{\"o}dinger equation",
abstract = "We combine the nonlinear Fourier transform (NFT) signal processing with machine learning methods for solving the direct spectral problem associated with the nonlinear Schr{\"o}dinger equation. The latter is one of the core nonlinear science models emerging in a range of applications. Our focus is on the unexplored problem of computing the continuous nonlinear Fourier spectrum associated with decaying profiles, using a specially-structured deep neural network which we coined NFT-Net. The Bayesian optimisation is utilised to find the optimal neural network architecture. The benefits of using the NFT-Net as compared to the conventional numerical NFT methods becomes evident when we deal with noise-corrupted signals, where the neural networks-based processing results in effective noise suppression. This advantage becomes more pronounced when the noise level is sufficiently high, and we train the neural network on the noise-corrupted field profiles. The maximum restoration quality corresponds to the case where the signal-to-noise ratio of the training data coincides with that of the validation signals. Finally, we also demonstrate that the NFT b-coefficient important for optical communication applications can be recovered with high accuracy and denoised by the neural network with the same architecture.",
author = "Sedov, {Egor V.} and Freire, {Pedro J.} and Seredin, {Vladimir V.} and Kolbasin, {Vladyslav A.} and Morteza Kamalian-Kopae and Chekhovskoy, {Igor S.} and Turitsyn, {Sergei K.} and Prilepsky, {Jaroslaw E.}",
note = "Funding Information: JEP and SKT acknowledge the support of Leverhulme Trust project RPG-2018-063. SKT is supported by the EPSRC programme Grant TRANSNET, EP/R035342/1. PJF acknowledges the support from the EU Horizon 2020 program under the Marie Sklodowska-Curie Grant Agreement 813144 (REAL-NET). EVS acknowledges the support from the Russian Science Foundation under Grant 17-72-30006, ISC research was supported by the grant of the President of the Russian Federation (MK-677.2020.9). VAK and JEP acknowledge the Erasmus+ mobility scheme between National Technical University “Kharkiv Polytechnic Institute” and Aston University. Publisher Copyright: {\textcopyright} 2021, The Author(s).",
year = "2021",
month = dec,
doi = "10.1038/s41598-021-02252-9",
language = "English",
volume = "11",
journal = "Scientific Reports",
issn = "2045-2322",
publisher = "Nature Publishing Group",
number = "1",

}

RIS

TY - JOUR

T1 - Neural networks for computing and denoising the continuous nonlinear Fourier spectrum in focusing nonlinear Schrödinger equation

AU - Sedov, Egor V.

AU - Freire, Pedro J.

AU - Seredin, Vladimir V.

AU - Kolbasin, Vladyslav A.

AU - Kamalian-Kopae, Morteza

AU - Chekhovskoy, Igor S.

AU - Turitsyn, Sergei K.

AU - Prilepsky, Jaroslaw E.

N1 - Funding Information: JEP and SKT acknowledge the support of Leverhulme Trust project RPG-2018-063. SKT is supported by the EPSRC programme Grant TRANSNET, EP/R035342/1. PJF acknowledges the support from the EU Horizon 2020 program under the Marie Sklodowska-Curie Grant Agreement 813144 (REAL-NET). EVS acknowledges the support from the Russian Science Foundation under Grant 17-72-30006, ISC research was supported by the grant of the President of the Russian Federation (MK-677.2020.9). VAK and JEP acknowledge the Erasmus+ mobility scheme between National Technical University “Kharkiv Polytechnic Institute” and Aston University. Publisher Copyright: © 2021, The Author(s).

PY - 2021/12

Y1 - 2021/12

N2 - We combine the nonlinear Fourier transform (NFT) signal processing with machine learning methods for solving the direct spectral problem associated with the nonlinear Schrödinger equation. The latter is one of the core nonlinear science models emerging in a range of applications. Our focus is on the unexplored problem of computing the continuous nonlinear Fourier spectrum associated with decaying profiles, using a specially-structured deep neural network which we coined NFT-Net. The Bayesian optimisation is utilised to find the optimal neural network architecture. The benefits of using the NFT-Net as compared to the conventional numerical NFT methods becomes evident when we deal with noise-corrupted signals, where the neural networks-based processing results in effective noise suppression. This advantage becomes more pronounced when the noise level is sufficiently high, and we train the neural network on the noise-corrupted field profiles. The maximum restoration quality corresponds to the case where the signal-to-noise ratio of the training data coincides with that of the validation signals. Finally, we also demonstrate that the NFT b-coefficient important for optical communication applications can be recovered with high accuracy and denoised by the neural network with the same architecture.

AB - We combine the nonlinear Fourier transform (NFT) signal processing with machine learning methods for solving the direct spectral problem associated with the nonlinear Schrödinger equation. The latter is one of the core nonlinear science models emerging in a range of applications. Our focus is on the unexplored problem of computing the continuous nonlinear Fourier spectrum associated with decaying profiles, using a specially-structured deep neural network which we coined NFT-Net. The Bayesian optimisation is utilised to find the optimal neural network architecture. The benefits of using the NFT-Net as compared to the conventional numerical NFT methods becomes evident when we deal with noise-corrupted signals, where the neural networks-based processing results in effective noise suppression. This advantage becomes more pronounced when the noise level is sufficiently high, and we train the neural network on the noise-corrupted field profiles. The maximum restoration quality corresponds to the case where the signal-to-noise ratio of the training data coincides with that of the validation signals. Finally, we also demonstrate that the NFT b-coefficient important for optical communication applications can be recovered with high accuracy and denoised by the neural network with the same architecture.

UR - http://www.scopus.com/inward/record.url?scp=85119822303&partnerID=8YFLogxK

UR - https://elibrary.ru/item.asp?id=47534337

U2 - 10.1038/s41598-021-02252-9

DO - 10.1038/s41598-021-02252-9

M3 - Article

C2 - 34819542

AN - SCOPUS:85119822303

VL - 11

JO - Scientific Reports

JF - Scientific Reports

SN - 2045-2322

IS - 1

M1 - 22857

ER -

ID: 34838633