Please use this identifier to cite or link to this item: http//localhost:8080/jspui/handle/123456789/2044
Title: Le nombre de cycles limites des centres quadratiques perturbΓ©s
Authors: Hichem, Laib
Keywords: Limit cycle, quadratic isochrone center, differential system, averaging method
Cycle limite, centre isochrone quadratique, système différentiel, méthode de la moyennisation.
Issue Date: 2020
Publisher: Universite laarbi tebessi tebessa
Abstract: In this work, we first study the limit cycles which can bifurcate from the periodic orbits of the quadratic isochronous centers 𝒙̇ = βˆ’π’š + 𝒙 𝟐 , π’šΜ‡ = 𝒙 + π’™π’š, and 𝒙̇ = βˆ’π’š + 𝒙 𝟐 βˆ’ π’š 𝟐 , π’šΜ‡ = 𝒙 + πŸπ’™π’š, when they are perturbed inside the class of all discontinuous quadratic polynomial differential systems with the straight line of discontinuity y ο€½ 0 . In the second part of this work, we use the averaging method to study the maximum number of limit cycles of the differential system 𝒙̇ = βˆ’π’š + π’™π’š + βˆ‘πœΊ π’Œ βˆ‘ π’‚π’Š,𝒋 (π’Œ) 𝒙 π’Šπ’š 𝒋 π’Š+𝒋=𝟐 𝟐 π’Œ=𝟏 , π’šΜ‡ = 𝒙 + π’š 𝟐 + βˆ‘πœΊ π’Œ βˆ‘ π’ƒπ’Š,𝒋 (π’Œ) 𝒙 π’Šπ’š 𝒋 π’Š+𝒋=𝟐 𝟐 π’Œ=𝟏 , where ο₯ is a sufficiently small parameter. Keywords: Limit cycle, quadratic isochrone center, differential system, averaging method
URI: http//localhost:8080/jspui/handle/123456789/2044
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