AbstractIn this paper, the bifurcation of limit cycles for a cubic polynomial system is investigated. By the computation of the singular point values, we prove that the system has 12 small amplitude limit cycles. The process of the proof is algebraic and symbolic
We study the maximum number of limit cycles that bifurcate from the periodic solutions of the family...
In this article, using multi-parameter perturbation theory and qualitative analysis, the authors stu...
AbstractWe show that for certain cubic Kolmogorov systems, four, and no more than four, limit cycles...
This paper is concerned with limit cycles on two different cubic systems with nine singular points. ...
We describe a method based on algorithms of computational algebra for obtaining an upper bound for t...
AbstractHilbert’s Sixteenth Problem concerns the number and relative position of limit cycles in a p...
AbstractIn E.M. James and N.G. Lloyd's paper A Cubic System with Eight Small-Amplitude Limit Cycles ...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
In E.M. James and N.G. Lloyd's paper A Cubic System with Eight Small-Amplitude Limit Cycles [1]...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
AbstractIn this paper, the bifurcation of limit cycles for a cubic polynomial system is investigated...
This paper presents new results on the bifurcation of medium and small limit cycles from the periodi...
AbstractThis paper concerns with the number of limit cycles for a cubic Hamiltonian system under cub...
We carry out the global bifurcation analysis of the Kukles system representing a planar polynomial d...
In this paper, we study the bifurcation of limit cycles from a class of cubic integrable non-Hamilto...
We study the maximum number of limit cycles that bifurcate from the periodic solutions of the family...
In this article, using multi-parameter perturbation theory and qualitative analysis, the authors stu...
AbstractWe show that for certain cubic Kolmogorov systems, four, and no more than four, limit cycles...
This paper is concerned with limit cycles on two different cubic systems with nine singular points. ...
We describe a method based on algorithms of computational algebra for obtaining an upper bound for t...
AbstractHilbert’s Sixteenth Problem concerns the number and relative position of limit cycles in a p...
AbstractIn E.M. James and N.G. Lloyd's paper A Cubic System with Eight Small-Amplitude Limit Cycles ...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
In E.M. James and N.G. Lloyd's paper A Cubic System with Eight Small-Amplitude Limit Cycles [1]...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
AbstractIn this paper, the bifurcation of limit cycles for a cubic polynomial system is investigated...
This paper presents new results on the bifurcation of medium and small limit cycles from the periodi...
AbstractThis paper concerns with the number of limit cycles for a cubic Hamiltonian system under cub...
We carry out the global bifurcation analysis of the Kukles system representing a planar polynomial d...
In this paper, we study the bifurcation of limit cycles from a class of cubic integrable non-Hamilto...
We study the maximum number of limit cycles that bifurcate from the periodic solutions of the family...
In this article, using multi-parameter perturbation theory and qualitative analysis, the authors stu...
AbstractWe show that for certain cubic Kolmogorov systems, four, and no more than four, limit cycles...
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