AbstractThe results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the direction of bifurcation, Math. Res. Lett. 12 (2005) 933–944] appear to be sufficient to justify computer-generated bifurcation diagram for any autonomous two-point Dirichlet problem. Here we apply our results to polynomial-like nonlinearities
We study the bifurcation diagrams of positive solutions of the two point boundary value problem u00...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
Agraïments: The first author has been supported by AGAURFI-DGR 2010.Agraïments: The third author has...
The results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the directi...
AbstractThe results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the...
AbstractWe study the bifurcation diagrams of positive solutions of the two point boundary value prob...
AbstractWe study the bifurcation diagrams of positive solutions of the multiparameter Dirichlet prob...
AbstractWe study the bifurcation diagrams of classical positive solutions u with ‖u‖∞∈(0,∞) of the p...
This paper will deal with the Theory of Geometric Bifurcation which the author developed in 1986. Th...
Bifurcation theory plays a key role in the qualitative analysis of dynamical systems. In nonlinear c...
In this project, I use computational tools to study the bifurcations in nonlinear oscillators. Matla...
AbstractWe study bifurcation diagrams of positive solutions for the p-Laplacian Dirichlet problem{(φ...
To appear in: ''Progress in Large Scale Scientific Computing'', P. Deuflhard and B. Engquist (eds.),...
In this paper, a vector field is constructed, and an equivalent relationship between invariant manif...
AbstractThe parameter dependence of the solution x of equation f0(x)+u1f1(x)+u2f2(x)=0 is considered...
We study the bifurcation diagrams of positive solutions of the two point boundary value problem u00...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
Agraïments: The first author has been supported by AGAURFI-DGR 2010.Agraïments: The third author has...
The results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the directi...
AbstractThe results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the...
AbstractWe study the bifurcation diagrams of positive solutions of the two point boundary value prob...
AbstractWe study the bifurcation diagrams of positive solutions of the multiparameter Dirichlet prob...
AbstractWe study the bifurcation diagrams of classical positive solutions u with ‖u‖∞∈(0,∞) of the p...
This paper will deal with the Theory of Geometric Bifurcation which the author developed in 1986. Th...
Bifurcation theory plays a key role in the qualitative analysis of dynamical systems. In nonlinear c...
In this project, I use computational tools to study the bifurcations in nonlinear oscillators. Matla...
AbstractWe study bifurcation diagrams of positive solutions for the p-Laplacian Dirichlet problem{(φ...
To appear in: ''Progress in Large Scale Scientific Computing'', P. Deuflhard and B. Engquist (eds.),...
In this paper, a vector field is constructed, and an equivalent relationship between invariant manif...
AbstractThe parameter dependence of the solution x of equation f0(x)+u1f1(x)+u2f2(x)=0 is considered...
We study the bifurcation diagrams of positive solutions of the two point boundary value problem u00...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
Agraïments: The first author has been supported by AGAURFI-DGR 2010.Agraïments: The third author has...
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