Add to ORKGWe consider an elliptic problem with nonlinear boundary condition involving nonlinearity with superlinear and subcritical growth at infinity and a bifurcation parameter as a factor. We use rescaling method, degree theory and continuation theorem to prove that there exists a connected branch of positive solutions bifurcating from infinity when the parameter goes to zero. Moreover, if the nonlinearity satisfies additional conditions near zero, we establish a global bifurcation result, and discuss the number of positive solution(s) with respect to the parameter using bifurcation theory and degree theory
In this paper we perform an extensive study of the existence, uniqueness (or multiplicity) and stabi...
This dissertation focuses on the study of steady states of reaction diffusion problems that are moti...
AbstractWe use bifurcation theory to study positive, negative, and sign-changing solutions for sever...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
This paper concerns with some elliptic equations with non-linear boundary conditions. Sub-supersolut...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
In this paper, we are concerned with the existence of positive solutions of nonlinear periodic bound...
We consider a parametric nonlinear elliptic equation driven by the Dirichlet p-Laplacian. We study t...
We are concerned with the global bifurcation of positive solutions for semilinear elliptic systems o...
We present some existence and multiplicity results for positive solutions to the Dirichlet problem a...
We present some existence and multiplicity results for positive solutions to the Dirichlet problem a...
We consider a parametric nonlinear elliptic equation driven by the Dirichlet p-Laplacian. We study t...
In this paper we perform an extensive study of the existence, uniqueness (or multiplicity) and stabi...
This dissertation focuses on the study of steady states of reaction diffusion problems that are moti...
AbstractWe use bifurcation theory to study positive, negative, and sign-changing solutions for sever...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
This paper concerns with some elliptic equations with non-linear boundary conditions. Sub-supersolut...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
Bifurcation is a very useful method to prove the existence of positive solutions for nonlinear ellip...
We consider reaction–diffusion equations under nonlinear boundary conditions where the nonlinearitie...
In this paper, we are concerned with the existence of positive solutions of nonlinear periodic bound...
We consider a parametric nonlinear elliptic equation driven by the Dirichlet p-Laplacian. We study t...
We are concerned with the global bifurcation of positive solutions for semilinear elliptic systems o...
We present some existence and multiplicity results for positive solutions to the Dirichlet problem a...
We present some existence and multiplicity results for positive solutions to the Dirichlet problem a...
We consider a parametric nonlinear elliptic equation driven by the Dirichlet p-Laplacian. We study t...
In this paper we perform an extensive study of the existence, uniqueness (or multiplicity) and stabi...
This dissertation focuses on the study of steady states of reaction diffusion problems that are moti...
AbstractWe use bifurcation theory to study positive, negative, and sign-changing solutions for sever...