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Stability of Linear Systems with Multitask Right-hand Member. / Alferov, G. V.; Ivanov, G. G.; Efimova, P. A.; Sharlay, A. S.; Kadry, Seifedine.

Stochastic Methods for Estimation and Problem-Solving in Engineering. Nova Science Publishers. ред. IGI Global, 2018. стр. 74-112.

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференцийглава/разделнаучнаяРецензирование

Harvard

Alferov, GV, Ivanov, GG, Efimova, PA, Sharlay, AS & Kadry, S 2018, Stability of Linear Systems with Multitask Right-hand Member. в Stochastic Methods for Estimation and Problem-Solving in Engineering. Nova Science Publishers изд., IGI Global, стр. 74-112. https://doi.org/10.4018/978-1-5225-5045-7.ch004

APA

Alferov, G. V., Ivanov, G. G., Efimova, P. A., Sharlay, A. S., & Kadry, S. (2018). Stability of Linear Systems with Multitask Right-hand Member. в Stochastic Methods for Estimation and Problem-Solving in Engineering (Nova Science Publishers ред., стр. 74-112). IGI Global. https://doi.org/10.4018/978-1-5225-5045-7.ch004

Vancouver

Alferov GV, Ivanov GG, Efimova PA, Sharlay AS, Kadry S. Stability of Linear Systems with Multitask Right-hand Member. в Stochastic Methods for Estimation and Problem-Solving in Engineering. Nova Science Publishers ред. IGI Global. 2018. стр. 74-112 https://doi.org/10.4018/978-1-5225-5045-7.ch004

Author

Alferov, G. V. ; Ivanov, G. G. ; Efimova, P. A. ; Sharlay, A. S. ; Kadry, Seifedine. / Stability of Linear Systems with Multitask Right-hand Member. Stochastic Methods for Estimation and Problem-Solving in Engineering. Nova Science Publishers. ред. IGI Global, 2018. стр. 74-112

BibTeX

@inbook{0be8c10cc5d349978e0fa36a01d85f6a,
title = "Stability of Linear Systems with Multitask Right-hand Member",
abstract = "To study the dynamics of mechanical systems and to define the construction parameters and control laws, it is necessary to have computational models accurately describing properties of real mechanisms. From a mathematical point of view, the computational models of mechanical systems are actually the systems of differential equations. These models can contain equations that also describe non-mechanical phenomena. In this chapter, 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. The proposed approaches can be used to study the stability of the motion for robot manipulators, transport, space, and socio-economic systems.",
keywords = "Stability of linear systems, linear systems, Stability",
author = "Alferov, {G. V.} and Ivanov, {G. G.} and Efimova, {P. A.} and Sharlay, {A. S.} and Seifedine Kadry",
year = "2018",
month = mar,
day = "2",
doi = "10.4018/978-1-5225-5045-7.ch004",
language = "English",
isbn = "1522550453",
pages = "74--112",
booktitle = "Stochastic Methods for Estimation and Problem-Solving in Engineering",
publisher = "IGI Global",
address = "United States",
edition = "Nova Science Publishers",

}

RIS

TY - CHAP

T1 - Stability of Linear Systems with Multitask Right-hand Member

AU - Alferov, G. V.

AU - Ivanov, G. G.

AU - Efimova, P. A.

AU - Sharlay, A. S.

AU - Kadry, Seifedine

PY - 2018/3/2

Y1 - 2018/3/2

N2 - To study the dynamics of mechanical systems and to define the construction parameters and control laws, it is necessary to have computational models accurately describing properties of real mechanisms. From a mathematical point of view, the computational models of mechanical systems are actually the systems of differential equations. These models can contain equations that also describe non-mechanical phenomena. In this chapter, 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. The proposed approaches can be used to study the stability of the motion for robot manipulators, transport, space, and socio-economic systems.

AB - To study the dynamics of mechanical systems and to define the construction parameters and control laws, it is necessary to have computational models accurately describing properties of real mechanisms. From a mathematical point of view, the computational models of mechanical systems are actually the systems of differential equations. These models can contain equations that also describe non-mechanical phenomena. In this chapter, 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. The proposed approaches can be used to study the stability of the motion for robot manipulators, transport, space, and socio-economic systems.

KW - Stability of linear systems

KW - linear systems

KW - Stability

UR - http://www.scopus.com/inward/record.url?scp=85049700337&partnerID=8YFLogxK

U2 - 10.4018/978-1-5225-5045-7.ch004

DO - 10.4018/978-1-5225-5045-7.ch004

M3 - Chapter

SN - 1522550453

SN - 9781522550457

SP - 74

EP - 112

BT - Stochastic Methods for Estimation and Problem-Solving in Engineering

PB - IGI Global

ER -

ID: 9432336