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Página principal > Artículos > Artículos publicados > Limit cycles bifurcating from a 2-dimensional isochronous torus in R^3 |
Fecha: | 2011 |
Resumen: | In this paper we illustrate the explicit implementation of a method for computing limit cycles which bifurcate from a 2-dimensional isochronous set contained in ℝ3, when we perturb it inside a class of differential systems. This method is based in the averaging theory. As far as we know all applications of this method have been made perturbing noncompact surfaces, as for instance a plane or a cylinder in ℝ3. Here we consider polynomial perturbations of degree d of an isochronous torus. We prove that, up to first order in the perturbation, at most 2(d+1) limit cycles can bifurcate from a such torus and that there exist polynomial perturbations of degree d of the torus such that exactly ν limit cycles bifurcate from such a torus for every ν ∈ {2, 4,. . . ,2(d + 1)}. |
Ayudas: | Ministerio de Ciencia e Innovación MTM2008-03437 Agència de Gestió d'Ajuts Universitaris i de Recerca 2009/SGR-410 |
Derechos: | Tots els drets reservats. |
Lengua: | Anglès |
Documento: | Article ; recerca ; Versió acceptada per publicar |
Materia: | Limit cycle ; Periodic orbit ; Isochronous center ; Averaging method |
Publicado en: | Advanced Nonlinear Studies, Vol. 11 (2011) , p. 377-389, ISSN 2169-0375 |
Postprint 15 p, 344.9 KB |