About Stability of Selector Linear Differential Inclusions

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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). ed. / Theodore E. Simos; Zacharoula Kalogiratou; Theodore Monovasilis; Theodore E. Simos; Theodore E. Simos. Vol. 2040 American Institute of Physics, 2018. 150013 (AIP Conference Proceedings; Vol. 2040).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Harvard

Kadry, S, Alferov, G , Ivanov, G & Sharlay, A 2018, About Stability of Selector Linear Differential Inclusions. in TE Simos, Z Kalogiratou, T Monovasilis, TE Simos & TE Simos (eds), INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). vol. 2040, 150013, AIP Conference Proceedings, vol. 2040, American Institute of Physics, International Conference of Computational Methods in Sciences and Engineering 2018, ICCMSE 2018, Thessaloniki, Greece, 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. In T. E. Simos, Z. Kalogiratou, T. Monovasilis, T. E. Simos, & T. E. Simos (Eds.), INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018) (Vol. 2040). [150013] (AIP Conference Proceedings; Vol. 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. In Simos TE, Kalogiratou Z, Monovasilis T, Simos TE, Simos TE, editors, INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN SCIENCES AND ENGINEERING 2018 (ICCMSE-2018). Vol. 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). editor / Theodore E. Simos ; Zacharoula Kalogiratou ; Theodore Monovasilis ; Theodore E. Simos ; Theodore E. Simos. Vol. 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.

PB - American Institute of Physics

Y2 - 14 March 2018 through 18 March 2018

ER -

ID: 36903214