Add to ORKGIn this work we study the Generalized Lane-Emden equation and the interplay between the exponents involved and their consequences on the existence and non existence of radial solutions on a unit ball in n dimensions. We extend the analysis to the phase plane for a clear understanding of the behavior of solutions and the relationship between their existence and the growth of nonlinear terms, where we investigate the critical exponent p and a sub-critical exponent, which we refer to as ^p. We discover a structural change of solutions due the existence of this sub-critical exponent which we relate to the same change in behavior of the Lane- Emden equation solutions, for ; = 0; andp = 2, due to the same sub-critical exponent. We hypothesize tha...
We prove that the Morse index of any radial solution with m nodal domains of the Lane-Emden problem ...
The objective of this paper is to obtain qualitative characteristics of multi-bubble solutions to th...
Abstract: Using the Liapunov-Schmidt method and symmetry-breaking bi-furcation theory, we compute an...
In this work we study the Generalized Lane-Emden equation and the interplay between the exponents in...
We study existence, uniqueness and stability of radial solutions of the Lane-Emden-Fowler equation i...
Our purpose of this paper is to study positive solutions of Lane-Emden equation -Δu=Vup in RN0 pertu...
International audienceWe study stable positive radially symmetric solutions for the Lane- Emden syst...
We consider the classical Lane Emden equation in bounded domains of the plane with Dirichlet boundar...
In this paper, we consider the generalized Lane-Emden model which arises in the study of steller con...
We study existence, uniqueness and stability of radial solutions of the Lane–Emden–Fowler equation i...
We use variational methods to study the existence of non-trivial and radially symmetric solutions to...
In this paper we provide a numerical approximation of bifurcation branches from nodal radial solutio...
We consider families of positive solutions to the Lane Emden problem in a bounded planar domain sati...
We use variational methods to study the existence of non-trivial and radially symmetric solutions to...
We present some Liouville-type result for the Lane-Emden equation in the subcritical and in the crit...
We prove that the Morse index of any radial solution with m nodal domains of the Lane-Emden problem ...
The objective of this paper is to obtain qualitative characteristics of multi-bubble solutions to th...
Abstract: Using the Liapunov-Schmidt method and symmetry-breaking bi-furcation theory, we compute an...
In this work we study the Generalized Lane-Emden equation and the interplay between the exponents in...
We study existence, uniqueness and stability of radial solutions of the Lane-Emden-Fowler equation i...
Our purpose of this paper is to study positive solutions of Lane-Emden equation -Δu=Vup in RN0 pertu...
International audienceWe study stable positive radially symmetric solutions for the Lane- Emden syst...
We consider the classical Lane Emden equation in bounded domains of the plane with Dirichlet boundar...
In this paper, we consider the generalized Lane-Emden model which arises in the study of steller con...
We study existence, uniqueness and stability of radial solutions of the Lane–Emden–Fowler equation i...
We use variational methods to study the existence of non-trivial and radially symmetric solutions to...
In this paper we provide a numerical approximation of bifurcation branches from nodal radial solutio...
We consider families of positive solutions to the Lane Emden problem in a bounded planar domain sati...
We use variational methods to study the existence of non-trivial and radially symmetric solutions to...
We present some Liouville-type result for the Lane-Emden equation in the subcritical and in the crit...
We prove that the Morse index of any radial solution with m nodal domains of the Lane-Emden problem ...
The objective of this paper is to obtain qualitative characteristics of multi-bubble solutions to th...
Abstract: Using the Liapunov-Schmidt method and symmetry-breaking bi-furcation theory, we compute an...