The period function in a class of quadratic Kolmogoroff systems
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Uribe S., Marco [1] ; Wallace C., Myrna [1]
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[1] Universidad Católica de la Santísima Concepción
Universidad Católica de la Santísima Concepción
Comuna de Concepción, Chile
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- Localización: Proyecciones: Journal of Mathematics, ISSN 0716-0917, ISSN-e 0717-6279, Vol. 19, Nº. 2, 2000, págs. 197-205
- Idioma: inglés
- DOI: 10.22199/S0716-09172000000200006
- Enlaces
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Resumen
In this paper we consider the family of quadratic Kolmogoroff systems with a center in the real quadrant:where 1 < a < ∞:This system has three invariant lines (the coordinate axes and the line x + y - 1 = 0) and a family of periodic solutions nested around a center and filling out the triangle determined by the three invariant lines. Using integrability of this system we reduce the abelian integral representing the period function and its derivative. The main result is that the corresponding period function is monotone increasing for values of the parameter near a = 3.
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Referencias bibliográficas
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- [2] Chicone C. The monotonicity of period function for planar hamiltonian vector fields. Journal of Differential Equation 69, (1987).
- [3] Gasull A., Guillamon A. and Mañosa V. An expression for the first Liapunov and period constants with application. Preprint, Universidad...
- [4] Gasull A., Guillamon A. and Mañosa V. Center and Isochronicity conditions for systems with homogeneus nonlinearities. Proceeding of the...
- [5] Van Horssen W and Reyn J. Bifurcation of limit cycles in a particular class of quadratic systems. Differential and Integral Equation Vol....
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