Limit Cycles for a Class of Continuous and Discontinuous Cubic Polynomial Differential Systems

dc.contributor	Univ Autonoma Barcelona
dc.contributor	Universidade Estadual Paulista (Unesp)
dc.date.accessioned	2014-12-03T13:11:09Z
dc.date.available	2014-12-03T13:11:09Z
dc.date.created	2014-12-03T13:11:09Z
dc.date.issued	2014-04-01
dc.identifier	Qualitative Theory Of Dynamical Systems. Basel: Springer Basel Ag, v. 13, n. 1, p. 129-148, 2014.
dc.identifier	1575-5460
dc.identifier	http://hdl.handle.net/11449/112912
dc.identifier	10.1007/s12346-014-0109-9
dc.identifier	WOS:000334414100007
dc.description.abstract	We study the maximum number of limit cycles that bifurcate from the periodic solutions of the family of isochronous cubic polynomial centers(x) over dot = y(-1 + 2 alpha x + 2 beta x(2)), (y) over dot = x + alpha(y(2) - x(2)) + 2 beta xy(2), alpha is an element of R, beta < 0,when it is perturbed inside the classes of all continuous and discontinuous cubic polynomial differential systems with two zones of discontinuity separated by a straight line. We obtain that this number is 3 for the perturbed continuous systems and at least 12 for the discontinuous ones using the averaging method of first order.
dc.language	eng
dc.publisher	Springer
dc.relation	Qualitative Theory of Dynamical Systems
dc.relation	1.019
dc.relation	0,492
dc.rights	Acesso restrito
dc.source	Web of Science
dc.subject	Polynomial vector field
dc.subject	Limit cycle
dc.subject	Averaging method
dc.subject	Periodic orbit
dc.subject	Isochronous center
dc.title	Limit Cycles for a Class of Continuous and Discontinuous Cubic Polynomial Differential Systems
dc.type	Artículos de revistas

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