Add to ORKGsummary:In this paper we consider an elliptic system at resonance and bifurcation type with zero Dirichlet condition. We use a Lyapunov-Schmidt approach and we will give applications to Biharmonic Equations
AbstractWe consider the problem{−Δu=up+λuin A,u>0in A,u=0on ∂A, where A is an annulus of RN, N⩾2, p∈...
AbstractIn this paper several new multiplicity results for asymptotically linear elliptic problem at...
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...
summary:In this paper we consider an elliptic system at resonance and bifurcation type with zero Dir...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
An elliptic system subject to the homogeneous Dirichlet boundary con- dition denoting the steady-sta...
summary:In this paper we consider the existence of nonzero solutions of an undecoupling elliptic sys...
summary:We prove existence and bifurcation results for a semilinear eigenvalue problem in $\Bbb R^N$...
summary:We deal with the boundary value problem $$ \alignat2 -\Delta u(x) & = \lambda _{1}u(x)+g(\na...
summary:In this paper, we are interested in the study of bifurcation solutions of nonlinear wave equ...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
AbstractA sufficient condition for bifurcation of real solutions of G(λ, u) = 0 (where G: R × D → E,...
AbstractWe obtain some new bifurcation criteria for solutions of general boundary value problems for...
AbstractWe prove the existence of a continuum of positive solutions for the semilinear elliptic equa...
summary:We consider the nonlinear Dirichlet problem $$ -u'' -r(x)|u|^\sigma u= \lambda u \text{ in ...
AbstractWe consider the problem{−Δu=up+λuin A,u>0in A,u=0on ∂A, where A is an annulus of RN, N⩾2, p∈...
AbstractIn this paper several new multiplicity results for asymptotically linear elliptic problem at...
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...
summary:In this paper we consider an elliptic system at resonance and bifurcation type with zero Dir...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
An elliptic system subject to the homogeneous Dirichlet boundary con- dition denoting the steady-sta...
summary:In this paper we consider the existence of nonzero solutions of an undecoupling elliptic sys...
summary:We prove existence and bifurcation results for a semilinear eigenvalue problem in $\Bbb R^N$...
summary:We deal with the boundary value problem $$ \alignat2 -\Delta u(x) & = \lambda _{1}u(x)+g(\na...
summary:In this paper, we are interested in the study of bifurcation solutions of nonlinear wave equ...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
AbstractA sufficient condition for bifurcation of real solutions of G(λ, u) = 0 (where G: R × D → E,...
AbstractWe obtain some new bifurcation criteria for solutions of general boundary value problems for...
AbstractWe prove the existence of a continuum of positive solutions for the semilinear elliptic equa...
summary:We consider the nonlinear Dirichlet problem $$ -u'' -r(x)|u|^\sigma u= \lambda u \text{ in ...
AbstractWe consider the problem{−Δu=up+λuin A,u>0in A,u=0on ∂A, where A is an annulus of RN, N⩾2, p∈...
AbstractIn this paper several new multiplicity results for asymptotically linear elliptic problem at...
AbstractIn this paper, we establish an exact multiplicity result of solutions for a class of semilin...