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
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...
We consider positive solutions of the Dirichlet problem $$displaylines{ u''(x)+lambda f(u(x))=0quadh...
We study the classification and evolution of bifurcation curves of positive solutions for the one-di...
The results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the directi...
AbstractThe results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the...
AbstractWe study the bifurcation diagrams of positive solutions of the two point boundary value prob...
We study the bifurcation diagrams of positive solutions of the two point boundary value problem u00...
Abstract. We consider positive solutions of the Dirichlet problem u′′(x) + λf(u(x)) = 0 in (−1, 1),...
AbstractWe study bifurcation diagrams of positive solutions for the p-Laplacian Dirichlet problem{(φ...
summary:We consider the nonlinear Dirichlet problem $$ -u'' -r(x)|u|^\sigma u= \lambda u \text{ in ...
AbstractIn the study of nonlinear boundary value problems it has been observed that bifurcations may...
AbstractWe study the bifurcation diagrams of positive solutions of the multiparameter Dirichlet prob...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
We consider the positive solutions to the semilinear problem: {Δu+λf(u)=0,inBn,u=0,on∂Bn. . where Bn...
AbstractThe parameter dependence of the solution x of equation f0(x)+u1f1(x)+u2f2(x)=0 is considered...
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...
We consider positive solutions of the Dirichlet problem $$displaylines{ u''(x)+lambda f(u(x))=0quadh...
We study the classification and evolution of bifurcation curves of positive solutions for the one-di...
The results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the directi...
AbstractThe results of our recent paper [P. Korman, Y. Li, T. Ouyang, Computing the location and the...
AbstractWe study the bifurcation diagrams of positive solutions of the two point boundary value prob...
We study the bifurcation diagrams of positive solutions of the two point boundary value problem u00...
Abstract. We consider positive solutions of the Dirichlet problem u′′(x) + λf(u(x)) = 0 in (−1, 1),...
AbstractWe study bifurcation diagrams of positive solutions for the p-Laplacian Dirichlet problem{(φ...
summary:We consider the nonlinear Dirichlet problem $$ -u'' -r(x)|u|^\sigma u= \lambda u \text{ in ...
AbstractIn the study of nonlinear boundary value problems it has been observed that bifurcations may...
AbstractWe study the bifurcation diagrams of positive solutions of the multiparameter Dirichlet prob...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
We consider the positive solutions to the semilinear problem: {Δu+λf(u)=0,inBn,u=0,on∂Bn. . where Bn...
AbstractThe parameter dependence of the solution x of equation f0(x)+u1f1(x)+u2f2(x)=0 is considered...
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...
We consider positive solutions of the Dirichlet problem $$displaylines{ u''(x)+lambda f(u(x))=0quadh...
We study the classification and evolution of bifurcation curves of positive solutions for the one-di...
DOI
Add to ORKG