AbstractIn this paper we make the connection between the theoretical study of the generalized homoclinic loop bifurcation (GHB∗) and the practical computational aspects. For this purpose we first compare the Dulac normal form with the Joyal normal form. These forms were both used to prove the GHB∗ theorem. But the second one is far more practical from the algorithmic point of view. We then show that the information carried by these normal forms can be computed in a much simpler way, using what we shall call dual Lyapunov constants. The coefficients of a normal form or the dual Lyapunov quantities are particular cases of what we shall call saddle quantities. We calculate the saddle quantities for quadratic systems, and we show that no more t...
To continue a branch of homoclinic solutions starting from a Bogdanov--Takens (BT) point in paramete...
Using a macroeconomic example, the paper proposes an algorithm to symbolically construct the topolog...
We study bifurcations of a homoclinic tangency to a saddle fixed point without non-leading multiplie...
AbstractIn this paper we make the connection between the theoretical study of the generalized homocl...
AbstractThe stability and bifurcations of a homoclinic loop for planar vector fields are closely rel...
AbstractWe give here a planar quadratic differential system depending on two parameters, λ, δ. There...
This thesis contains two parts. In the first part, we investigate bifurcation of limit cycles around...
AbstractThe first-order Melnikov function of a homoclinic loop through a nilpotent saddle for genera...
AbstractIn this paper we give an example of a family of polynomial vector fields with three limit cy...
In 1991, Chicone and Jacobs showed the equivalence between the computation of the first-order Taylor...
In a smooth dynamical system, a homoclinic connection is an orbit connecting a saddle equilibrium to...
The study of bifurcation of high codimension singularities and cyclicity of related limit periodic s...
Determining the number of limit cycles of a planar differential system is related to the second part...
The study primarily considers the nondlmensionallsed Buffing's equationx" + kx' - x + x3 = F Cos wt,...
Consider a family of planar systems depending on two parameters (n, b) and having at most one limit ...
To continue a branch of homoclinic solutions starting from a Bogdanov--Takens (BT) point in paramete...
Using a macroeconomic example, the paper proposes an algorithm to symbolically construct the topolog...
We study bifurcations of a homoclinic tangency to a saddle fixed point without non-leading multiplie...
AbstractIn this paper we make the connection between the theoretical study of the generalized homocl...
AbstractThe stability and bifurcations of a homoclinic loop for planar vector fields are closely rel...
AbstractWe give here a planar quadratic differential system depending on two parameters, λ, δ. There...
This thesis contains two parts. In the first part, we investigate bifurcation of limit cycles around...
AbstractThe first-order Melnikov function of a homoclinic loop through a nilpotent saddle for genera...
AbstractIn this paper we give an example of a family of polynomial vector fields with three limit cy...
In 1991, Chicone and Jacobs showed the equivalence between the computation of the first-order Taylor...
In a smooth dynamical system, a homoclinic connection is an orbit connecting a saddle equilibrium to...
The study of bifurcation of high codimension singularities and cyclicity of related limit periodic s...
Determining the number of limit cycles of a planar differential system is related to the second part...
The study primarily considers the nondlmensionallsed Buffing's equationx" + kx' - x + x3 = F Cos wt,...
Consider a family of planar systems depending on two parameters (n, b) and having at most one limit ...
To continue a branch of homoclinic solutions starting from a Bogdanov--Takens (BT) point in paramete...
Using a macroeconomic example, the paper proposes an algorithm to symbolically construct the topolog...
We study bifurcations of a homoclinic tangency to a saddle fixed point without non-leading multiplie...