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About Stability of Selector Linear Differential Inclusions. / Kadry, Seifedine; Alferov, Gennady; Ivanov, Gennady; Sharlay, Artem.

INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). ред. / Theodore E. Simos; Zacharoula Kalogiratou; Theodore Monovasilis; Theodore E. Simos; Theodore E. Simos. Том 2040 American Institute of Physics, 2018. 150013 (AIP Conference Proceedings; Том 2040).

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

Harvard

Kadry, S, Alferov, G, Ivanov, G & Sharlay, A 2018, About Stability of Selector Linear Differential Inclusions. в TE Simos, Z Kalogiratou, T Monovasilis, TE Simos & TE Simos (ред.), INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). Том. 2040, 150013, AIP Conference Proceedings, Том. 2040, American Institute of Physics, International Conference of Computational Methods in Sciences and Engineering 2018, ICCMSE 2018, Thessaloniki, Греция, 14/03/18. https://doi.org/10.1063/1.5079216

APA

Kadry, S., Alferov, G., Ivanov, G., & Sharlay, A. (2018). About Stability of Selector Linear Differential Inclusions. в T. E. Simos, Z. Kalogiratou, T. Monovasilis, T. E. Simos, & T. E. Simos (Ред.), INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018) (Том 2040). [150013] (AIP Conference Proceedings; Том 2040). American Institute of Physics. https://doi.org/10.1063/1.5079216

Vancouver

Kadry S, Alferov G, Ivanov G, Sharlay A. About Stability of Selector Linear Differential Inclusions. в Simos TE, Kalogiratou Z, Monovasilis T, Simos TE, Simos TE, Редакторы, INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). Том 2040. American Institute of Physics. 2018. 150013. (AIP Conference Proceedings). https://doi.org/10.1063/1.5079216

Author

Kadry, Seifedine ; Alferov, Gennady ; Ivanov, Gennady ; Sharlay, Artem. / About Stability of Selector Linear Differential Inclusions. INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). Редактор / Theodore E. Simos ; Zacharoula Kalogiratou ; Theodore Monovasilis ; Theodore E. Simos ; Theodore E. Simos. Том 2040 American Institute of Physics, 2018. (AIP Conference Proceedings).

BibTeX

@inproceedings{c2120d03233345928f08c45dc362d3eb,
title = "About Stability of Selector Linear Differential Inclusions",
abstract = "In this paper the problems of stability and asymptotic stability conditions for the motion of mechanical systems with holonomic and non-holonomic constraints are under consideration. Stability analysis for the systems of differential equations is given in term of the second Lyapunov's method. With the use of the set-theoretic approach the necessary and sufficient conditions for stability and asymptotic stability of zero solution of the considered system are formulated.",
author = "Seifedine Kadry and Gennady Alferov and Gennady Ivanov and Artem Sharlay",
year = "2018",
month = nov,
day = "30",
doi = "10.1063/1.5079216",
language = "Английский",
volume = "2040",
series = "AIP Conference Proceedings",
publisher = "American Institute of Physics",
editor = "Simos, {Theodore E.} and Zacharoula Kalogiratou and Theodore Monovasilis and Simos, {Theodore E.} and Simos, {Theodore E.}",
booktitle = "INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018)",
address = "Соединенные Штаты Америки",
note = "null ; Conference date: 14-03-2018 Through 18-03-2018",

}

RIS

TY - GEN

T1 - About Stability of Selector Linear Differential Inclusions

AU - Kadry, Seifedine

AU - Alferov, Gennady

AU - Ivanov, Gennady

AU - Sharlay, Artem

PY - 2018/11/30

Y1 - 2018/11/30

N2 - In this paper the problems of stability and asymptotic stability conditions for the motion of mechanical systems with holonomic and non-holonomic constraints are under consideration. Stability analysis for the systems of differential equations is given in term of the second Lyapunov's method. With the use of the set-theoretic approach the necessary and sufficient conditions for stability and asymptotic stability of zero solution of the considered system are formulated.

AB - In this paper the problems of stability and asymptotic stability conditions for the motion of mechanical systems with holonomic and non-holonomic constraints are under consideration. Stability analysis for the systems of differential equations is given in term of the second Lyapunov's method. With the use of the set-theoretic approach the necessary and sufficient conditions for stability and asymptotic stability of zero solution of the considered system are formulated.

UR - http://www.scopus.com/inward/record.url?scp=85058652533&partnerID=8YFLogxK

U2 - 10.1063/1.5079216

DO - 10.1063/1.5079216

M3 - статья в сборнике материалов конференции

AN - SCOPUS:85058652533

VL - 2040

T3 - AIP Conference Proceedings

BT - INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018)

A2 - Simos, Theodore E.

A2 - Kalogiratou, Zacharoula

A2 - Monovasilis, Theodore

A2 - Simos, Theodore E.

A2 - Simos, Theodore E.

PB - American Institute of Physics

Y2 - 14 March 2018 through 18 March 2018

ER -

ID: 36903214