Add to ORKGThe least energy solutions are de ned as solutions that indicate infi mum value to the energy functional image associated with a class of nonlinear variational problems −∆u = g(u) u ∈ H1(RN) The objective of this work is to show that through least energy solutions of nonlinear equation above, the Mountain pass value without the Palais Smale condition is critical point. For this, we will prove that under certain hypotheses on the function g and under a constraint assumption is possible to obtain a positive solution for the above problem, spherically symmetric and decreasing with the radius. Then the solution of the problem subject to this constraint has the lowest value in the energy functional among all solutions of the above problem appli...
This work is devoted to the least-energy solutions of a non-autonomous semi-linear problem with smal...
We present a variational framework for studying the existence and regularity of solutions to ellipti...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
International audienceAbstract We consider the equation -uʺ = g(u), u(x) ∈ H 1 (ℝ). (0.1) Under gene...
We consider the equation −u′ ′ = g(u), u(x) ∈ H1(R). (0.1) Under general assumptions on the nonlin...
Abstract: We study a mountain pass characterization of least energy solutions of the following nonli...
Questa tesi di Dottorato riguarda lo studio dell'esistenza di soluzioni di minima energia e soluzion...
We prove the existence of a critical point at the mountain pass energy level for a general class of ...
Li Kin-kuen.Thesis (M.Phil.)--Chinese University of Hong Kong, 2002.Includes bibliographical referen...
Let be a bounded smooth domain in RN. We prove a general existence result of least energy solution...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
Abstract. In this paper we are concerned with the problem of finding solutions for the following non...
AbstractWe consider the problem ε2Δu−uq+up=0 in Ω, u>0 in Ω, u=0 on ∂Ω. Here Ω is a smooth bounded d...
In this dissertation, we study the existence of two types of non-negative weak solutions for a clas...
We investigate minimum energy paths of the quasi-linear problem with the p-Laplacian operator and a ...
This work is devoted to the least-energy solutions of a non-autonomous semi-linear problem with smal...
We present a variational framework for studying the existence and regularity of solutions to ellipti...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
International audienceAbstract We consider the equation -uʺ = g(u), u(x) ∈ H 1 (ℝ). (0.1) Under gene...
We consider the equation −u′ ′ = g(u), u(x) ∈ H1(R). (0.1) Under general assumptions on the nonlin...
Abstract: We study a mountain pass characterization of least energy solutions of the following nonli...
Questa tesi di Dottorato riguarda lo studio dell'esistenza di soluzioni di minima energia e soluzion...
We prove the existence of a critical point at the mountain pass energy level for a general class of ...
Li Kin-kuen.Thesis (M.Phil.)--Chinese University of Hong Kong, 2002.Includes bibliographical referen...
Let be a bounded smooth domain in RN. We prove a general existence result of least energy solution...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
Abstract. In this paper we are concerned with the problem of finding solutions for the following non...
AbstractWe consider the problem ε2Δu−uq+up=0 in Ω, u>0 in Ω, u=0 on ∂Ω. Here Ω is a smooth bounded d...
In this dissertation, we study the existence of two types of non-negative weak solutions for a clas...
We investigate minimum energy paths of the quasi-linear problem with the p-Laplacian operator and a ...
This work is devoted to the least-energy solutions of a non-autonomous semi-linear problem with smal...
We present a variational framework for studying the existence and regularity of solutions to ellipti...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...