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Third order operator for the good Boussinesq equation on the circle. / Badanin, Andrey V.; Korotyaev, Evgeny L.

Proceedings of the International Conference Days on Diffraction, DD 2018. ред. / A.Ya. Kazakov; A.P. Kiselev; L.I. Goray; O.V. Motygin. Institute of Electrical and Electronics Engineers Inc., 2018. стр. 27-32 8552999 (Proceedings of the International Conference Days on Diffraction, DD 2018).

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференцийстатья в сборнике материалов конференциинаучнаяРецензирование

Harvard

Badanin, AV & Korotyaev, EL 2018, Third order operator for the good Boussinesq equation on the circle. в AY Kazakov, AP Kiselev, LI Goray & OV Motygin (ред.), Proceedings of the International Conference Days on Diffraction, DD 2018., 8552999, Proceedings of the International Conference Days on Diffraction, DD 2018, Institute of Electrical and Electronics Engineers Inc., стр. 27-32, 2018 International Conference Days on Diffraction, DD 2018, St. Petersburg, Российская Федерация, 4/06/18. https://doi.org/10.1109/DD.2018.8552999

APA

Badanin, A. V., & Korotyaev, E. L. (2018). Third order operator for the good Boussinesq equation on the circle. в A. Y. Kazakov, A. P. Kiselev, L. I. Goray, & O. V. Motygin (Ред.), Proceedings of the International Conference Days on Diffraction, DD 2018 (стр. 27-32). [8552999] (Proceedings of the International Conference Days on Diffraction, DD 2018). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/DD.2018.8552999

Vancouver

Badanin AV, Korotyaev EL. Third order operator for the good Boussinesq equation on the circle. в Kazakov AY, Kiselev AP, Goray LI, Motygin OV, Редакторы, Proceedings of the International Conference Days on Diffraction, DD 2018. Institute of Electrical and Electronics Engineers Inc. 2018. стр. 27-32. 8552999. (Proceedings of the International Conference Days on Diffraction, DD 2018). https://doi.org/10.1109/DD.2018.8552999

Author

Badanin, Andrey V. ; Korotyaev, Evgeny L. / Third order operator for the good Boussinesq equation on the circle. Proceedings of the International Conference Days on Diffraction, DD 2018. Редактор / A.Ya. Kazakov ; A.P. Kiselev ; L.I. Goray ; O.V. Motygin. Institute of Electrical and Electronics Engineers Inc., 2018. стр. 27-32 (Proceedings of the International Conference Days on Diffraction, DD 2018).

BibTeX

@inproceedings{7640c2e7cfcd4fd9a219710ae85ddaa1,
title = "Third order operator for the good Boussinesq equation on the circle",
abstract = "We consider a non-self-adjoint third order differential operator on R with real 1-periodic coefficients. The Lax equation for this operator is equivalent to the so-called good Boussinesq equation on the circle. The eigenvalues of the monodromy matrix constitute a 3-sheeted Riemann surface. Ramifications of this surface are invariant with respect to the Boussinesq flow. We determine high energy asymptotics of the ramifications.",
author = "Badanin, {Andrey V.} and Korotyaev, {Evgeny L.}",
year = "2018",
month = nov,
day = "29",
doi = "10.1109/DD.2018.8552999",
language = "English",
series = "Proceedings of the International Conference Days on Diffraction, DD 2018",
publisher = "Institute of Electrical and Electronics Engineers Inc.",
pages = "27--32",
editor = "A.Ya. Kazakov and A.P. Kiselev and L.I. Goray and O.V. Motygin",
booktitle = "Proceedings of the International Conference Days on Diffraction, DD 2018",
address = "United States",
note = "2018 International Conference Days on Diffraction, DD 2018 ; Conference date: 04-06-2018 Through 08-06-2018",

}

RIS

TY - GEN

T1 - Third order operator for the good Boussinesq equation on the circle

AU - Badanin, Andrey V.

AU - Korotyaev, Evgeny L.

PY - 2018/11/29

Y1 - 2018/11/29

N2 - We consider a non-self-adjoint third order differential operator on R with real 1-periodic coefficients. The Lax equation for this operator is equivalent to the so-called good Boussinesq equation on the circle. The eigenvalues of the monodromy matrix constitute a 3-sheeted Riemann surface. Ramifications of this surface are invariant with respect to the Boussinesq flow. We determine high energy asymptotics of the ramifications.

AB - We consider a non-self-adjoint third order differential operator on R with real 1-periodic coefficients. The Lax equation for this operator is equivalent to the so-called good Boussinesq equation on the circle. The eigenvalues of the monodromy matrix constitute a 3-sheeted Riemann surface. Ramifications of this surface are invariant with respect to the Boussinesq flow. We determine high energy asymptotics of the ramifications.

UR - http://www.scopus.com/inward/record.url?scp=85060021128&partnerID=8YFLogxK

U2 - 10.1109/DD.2018.8552999

DO - 10.1109/DD.2018.8552999

M3 - Conference contribution

AN - SCOPUS:85060021128

T3 - Proceedings of the International Conference Days on Diffraction, DD 2018

SP - 27

EP - 32

BT - Proceedings of the International Conference Days on Diffraction, DD 2018

A2 - Kazakov, A.Ya.

A2 - Kiselev, A.P.

A2 - Goray, L.I.

A2 - Motygin, O.V.

PB - Institute of Electrical and Electronics Engineers Inc.

T2 - 2018 International Conference Days on Diffraction, DD 2018

Y2 - 4 June 2018 through 8 June 2018

ER -

ID: 40085924