Averaging in multifrequency systems with linearly transformed arguments and integral delay

Bigun Yaroslav Yosypovych; Skutar Ihor Dmytrovych; Bardan Andriy

doi:https://doi.org/10.31861/bmj2023.02.02

Bigun Yaroslav Yosypovych ¹ , Skutar Ihor Dmytrovych ¹ , Bardan Andriy ¹

¹ Department of Aplied Mathematics and Information Technologies, Yuriy Fedkovych Chernivtsi National University, Chernivtsi, 58000, Ukraine

DOI: https://doi.org/10.31861/bmj2023.02.02

Keywords: multifrequency system, averaging method, resonance, delay, small parameter

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Abstract

The question of existence and uniqueness of the continuously differentiable solution for a multifrequency system of differential equations with variable linearly transformed and integral delay is investigated. The method of averaging by fast variables on a finite interval is substantiated. An estimate of the averaging method was obtained, which clearly depends on the small parameter and the number of fast variables and their delays.

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Cite

ACS Style: Bigun, Y.Y.; Skutar, I.D.; Bardan, A. Averaging in multifrequency systems with linearly transformed arguments and integral delay. Bukovinian Mathematical Journal. 2023, 11 https://doi.org/https://doi.org/10.31861/bmj2023.02.02
AMA Style: Bigun YY, Skutar ID, Bardan A. Averaging in multifrequency systems with linearly transformed arguments and integral delay. Bukovinian Mathematical Journal. 2023; 11(2). https://doi.org/https://doi.org/10.31861/bmj2023.02.02
Chicago/Turabian Style: Yaroslav Yosypovych Bigun, Ihor Dmytrovych Skutar, Andriy Bardan. 2023. "Averaging in multifrequency systems with linearly transformed arguments and integral delay". Bukovinian Mathematical Journal. 11 no. 2. https://doi.org/https://doi.org/10.31861/bmj2023.02.02

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