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On Diferential Inclusions Arising from Some Discontinuous Systems. / Фоминых, Александр Владимирович.

In: Numerical Functional Analysis and Optimization, Vol. 45, No. 4-6, 02.04.2024, p. 304-332.

Research output: Contribution to journalArticlepeer-review

Harvard

Фоминых, АВ 2024, 'On Diferential Inclusions Arising from Some Discontinuous Systems', Numerical Functional Analysis and Optimization, vol. 45, no. 4-6, pp. 304-332. https://doi.org/10.1080/01630563.2024.2333251

APA

Фоминых, А. В. (2024). On Diferential Inclusions Arising from Some Discontinuous Systems. Numerical Functional Analysis and Optimization, 45(4-6), 304-332. https://doi.org/10.1080/01630563.2024.2333251

Vancouver

Фоминых АВ. On Diferential Inclusions Arising from Some Discontinuous Systems. Numerical Functional Analysis and Optimization. 2024 Apr 2;45(4-6):304-332. https://doi.org/10.1080/01630563.2024.2333251

Author

Фоминых, Александр Владимирович. / On Diferential Inclusions Arising from Some Discontinuous Systems. In: Numerical Functional Analysis and Optimization. 2024 ; Vol. 45, No. 4-6. pp. 304-332.

BibTeX

@article{74e33346eb9d47bda8728bbdad38fef5,
title = "On Diferential Inclusions Arising from Some Discontinuous Systems",
abstract = "The paper deals with systems of ordinary differential equations containing in the right-hand side controls which are discontinuous in phase variables. These controls cause the occurrence of sliding modes. If one uses one of the well-known definitions of the solution of discontinuous systems, then the motion of an object while being on some surface can be described in terms of differential inclusions. With the help of the previously developed apparatus for solving differential inclusions, a method is constructed for finding the trajectories of a system moving in a such a mode. Since some of frequently used discontinuous controls contain nonsmooth functions of phase variables, the paper pays special attention to study the differential properties of such systems. At the end of the paper controls of a slightly different, in contrast to the classical, type are considered which have useful differential properties, and a method is constructed for solving systems with such controls considered both before hitting the required surface and moving in its vicinity.",
keywords = "Differential inclusion, G{\^a}teaux gradient, discontinuous system, sliding mode, support function",
author = "Фоминых, {Александр Владимирович}",
year = "2024",
month = apr,
day = "2",
doi = "10.1080/01630563.2024.2333251",
language = "English",
volume = "45",
pages = "304--332",
journal = "Numerical Functional Analysis and Optimization",
issn = "0163-0563",
publisher = "Taylor & Francis",
number = "4-6",

}

RIS

TY - JOUR

T1 - On Diferential Inclusions Arising from Some Discontinuous Systems

AU - Фоминых, Александр Владимирович

PY - 2024/4/2

Y1 - 2024/4/2

N2 - The paper deals with systems of ordinary differential equations containing in the right-hand side controls which are discontinuous in phase variables. These controls cause the occurrence of sliding modes. If one uses one of the well-known definitions of the solution of discontinuous systems, then the motion of an object while being on some surface can be described in terms of differential inclusions. With the help of the previously developed apparatus for solving differential inclusions, a method is constructed for finding the trajectories of a system moving in a such a mode. Since some of frequently used discontinuous controls contain nonsmooth functions of phase variables, the paper pays special attention to study the differential properties of such systems. At the end of the paper controls of a slightly different, in contrast to the classical, type are considered which have useful differential properties, and a method is constructed for solving systems with such controls considered both before hitting the required surface and moving in its vicinity.

AB - The paper deals with systems of ordinary differential equations containing in the right-hand side controls which are discontinuous in phase variables. These controls cause the occurrence of sliding modes. If one uses one of the well-known definitions of the solution of discontinuous systems, then the motion of an object while being on some surface can be described in terms of differential inclusions. With the help of the previously developed apparatus for solving differential inclusions, a method is constructed for finding the trajectories of a system moving in a such a mode. Since some of frequently used discontinuous controls contain nonsmooth functions of phase variables, the paper pays special attention to study the differential properties of such systems. At the end of the paper controls of a slightly different, in contrast to the classical, type are considered which have useful differential properties, and a method is constructed for solving systems with such controls considered both before hitting the required surface and moving in its vicinity.

KW - Differential inclusion

KW - Gâteaux gradient

KW - discontinuous system

KW - sliding mode

KW - support function

UR - https://www.mendeley.com/catalogue/b08ad05e-0c85-3db8-90b0-8cf647522796/

U2 - 10.1080/01630563.2024.2333251

DO - 10.1080/01630563.2024.2333251

M3 - Article

VL - 45

SP - 304

EP - 332

JO - Numerical Functional Analysis and Optimization

JF - Numerical Functional Analysis and Optimization

SN - 0163-0563

IS - 4-6

ER -

ID: 119156648