AbstractThis paper concerns with the number of limit cycles for a cubic Hamiltonian system under cubic perturbation. The fact that there exist 9–11 limit cycles is proved. The different distributions of limit cycles are given by using methods of bifurcation theory and qualitative analysis, among which two distributions of eleven limit cycles are new
AbstractIn this paper, the number of limit cycles in a family of polynomial systems was studied by t...
We study the number of limit cycles bifurcating from the origin of a Hamiltonian system of degree 4....
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
AbstractThis paper concerns with the number of limit cycles from an asymmetric Hamiltonian of degree...
AbstractThis paper concerns with the number of limit cycles for a cubic Hamiltonian system under cub...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
AbstractThis paper concerns with the number and distributions of limit cycles in a Z3-equivariant qu...
We study limit cycles of the following system: dx dt yð1þ x2 ay2Þ þ exðmxn þ lyn kÞ; dy dt xð1 ...
Using the method of qualitative analysis we show that ve perturbed cubic Hamiltonian systems have th...
AbstractThis paper is about the number of limit cycles for a quintic near-Hamiltonian system. It is ...
This paper is concerned with limit cycles on two different cubic systems with nine singular points. ...
AbstractThis paper deals with Liénard equations of the form ẋ=y,ẏ=P(x)+yQ(x,y), with P and Q polyn...
AbstractIn this paper, we make a complete study on small perturbations of Hamiltonian vector field w...
This paper is about the number of limit cycles for a quintic near-Hamiltonian system. It is proved t...
It is provedin this paper that the maximum number of limit cycles of system [formula] is equal to tw...
AbstractIn this paper, the number of limit cycles in a family of polynomial systems was studied by t...
We study the number of limit cycles bifurcating from the origin of a Hamiltonian system of degree 4....
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
AbstractThis paper concerns with the number of limit cycles from an asymmetric Hamiltonian of degree...
AbstractThis paper concerns with the number of limit cycles for a cubic Hamiltonian system under cub...
This paper is concerned with the distribution and number of limit cycles for a cubic Hamiltonian sys...
AbstractThis paper concerns with the number and distributions of limit cycles in a Z3-equivariant qu...
We study limit cycles of the following system: dx dt yð1þ x2 ay2Þ þ exðmxn þ lyn kÞ; dy dt xð1 ...
Using the method of qualitative analysis we show that ve perturbed cubic Hamiltonian systems have th...
AbstractThis paper is about the number of limit cycles for a quintic near-Hamiltonian system. It is ...
This paper is concerned with limit cycles on two different cubic systems with nine singular points. ...
AbstractThis paper deals with Liénard equations of the form ẋ=y,ẏ=P(x)+yQ(x,y), with P and Q polyn...
AbstractIn this paper, we make a complete study on small perturbations of Hamiltonian vector field w...
This paper is about the number of limit cycles for a quintic near-Hamiltonian system. It is proved t...
It is provedin this paper that the maximum number of limit cycles of system [formula] is equal to tw...
AbstractIn this paper, the number of limit cycles in a family of polynomial systems was studied by t...
We study the number of limit cycles bifurcating from the origin of a Hamiltonian system of degree 4....
Agraïments: The second author has been partially supported by FCT through CAMGSD.We study the number...
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