International audienceAbstract We consider the equation -uʺ = g(u), u(x) ∈ H 1 (ℝ). (0.1) Under general assumptions on the nonlinearity g we prove that the, unique up to translation, solution of (0.1) is at the mountain pass level of the associated functional. This result extends a corresponding result for least energy solutions when (0.1) is set on ℝ N
We investigate the existence of least energy solutions and infinitely many solutions for the followi...
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
Let Omega be a smooth bounded domain. We are concerned about the following nonlinear elliptic proble...
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...
The least energy solutions are de ned as solutions that indicate infi mum value to the energy functi...
Abstract. In this paper we are concerned with the problem of finding solutions for the following non...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
Let be a bounded smooth domain in RN. We prove a general existence result of least energy solutions...
In this paper we are concerned with the problem of finding solutions for the following nonlinear fi...
We prove the existence of a critical point at the mountain pass energy level for a general class of ...
In this paper we give asymptotic estimates of the least energy solution Up of the functional J(u) = ...
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...
AbstractThis paper is concerned with analyzing the limiting behavior of the least energy solutions f...
We investigate the existence of least energy solutions and infinitely many solutions for the followi...
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
Let Omega be a smooth bounded domain. We are concerned about the following nonlinear elliptic proble...
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...
The least energy solutions are de ned as solutions that indicate infi mum value to the energy functi...
Abstract. In this paper we are concerned with the problem of finding solutions for the following non...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
Let be a bounded smooth domain in RN. We prove a general existence result of least energy solutions...
In this paper we are concerned with the problem of finding solutions for the following nonlinear fi...
We prove the existence of a critical point at the mountain pass energy level for a general class of ...
In this paper we give asymptotic estimates of the least energy solution Up of the functional J(u) = ...
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...
AbstractThis paper is concerned with analyzing the limiting behavior of the least energy solutions f...
We investigate the existence of least energy solutions and infinitely many solutions for the followi...
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
Let Omega be a smooth bounded domain. We are concerned about the following nonlinear elliptic proble...
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