Second-order bifurcation of limit cycles from a quadratic reversible center

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dc.contributor.authorPeng, Linping
dc.contributor.authorHuang, Bo
dc.date.accessioned2022-04-08T16:37:54Z
dc.date.available2022-04-08T16:37:54Z
dc.date.issued2017-03-28
dc.description.abstractThis article concerns the bifurcation of limit cycles from a quadratic integrable and non-Hamiltonian system. By using the averaging theory, we show that under any small quadratic homogeneous perturbation, there is at most one limit cycle for the first order bifurcation and two for the second-order bifurcation arising from the period annulus of the unperturbed system, respectively. Moreover, in each case the upper bound is sharp.
dc.description.departmentMathematics
dc.formatText
dc.format.extent17 pages
dc.format.medium1 file (.pdf)
dc.identifier.citationPeng, L., & Huang, B. (2017). Second-order bifurcation of limit cycles from a quadratic reversible center. <i>Electronic Journal of Differential Equations, 2017</i>(89), pp. 1-17.
dc.identifier.issn1072-6691
dc.identifier.urihttps://hdl.handle.net/10877/15621
dc.language.isoen
dc.publisherTexas State University, Department of Mathematics
dc.rightsAttribution 4.0 International
dc.rights.urihttps://creativecommons.org/licenses/by/4.0/
dc.sourceElectronic Journal of Differential Equations, 2017, San Marcos, Texas: Texas State University and University of North Texas.
dc.subjectHamiltonian system
dc.subjectBifurcation
dc.subjectLimit cycles
dc.subjectPerturbation
dc.subjectAveraging method
dc.subjectQuadratic center
dc.titleSecond-order bifurcation of limit cycles from a quadratic reversible centeren_US
dc.typeArticle

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