We prove the existence of a critical point at the mountain pass energy level for a general class of variational problems. We also provide a Max-Min characterization of the mountain pass energy level. Finally, we present some concrete applications
Existence results are presented for classical solutions to some nonvariational problems through a su...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The main result stated in the present paper is the existence of a lion-negative solution for a semil...
This 2003 book presents min-max methods through a study of the different faces of the Mountain Pass ...
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...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
Variational methods find solutions of equations by considering a solution as a critical point of an ...
The least energy solutions are de ned as solutions that indicate infi mum value to the energy functi...
The distinctive paper is devoted to some topical issues related to hill-climbing problems (minimum s...
Many questions in mathematics and physics can be reduced to the problem of finding and classifying t...
Ekeland's variational principle is now a classical method for investigations of many non-linear...
In this paper we study the existence of solution for a class of variational inequality in whole RN. ...
The mountain pass theorem for scalar functionals is a fundamental result of the minimax methods in ...
Saddle-points and mountain-pass points of energy surfaces have many applications in areas that range...
Existence results are presented for classical solutions to some nonvariational problems through a su...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The main result stated in the present paper is the existence of a lion-negative solution for a semil...
This 2003 book presents min-max methods through a study of the different faces of the Mountain Pass ...
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...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
Variational methods find solutions of equations by considering a solution as a critical point of an ...
The least energy solutions are de ned as solutions that indicate infi mum value to the energy functi...
The distinctive paper is devoted to some topical issues related to hill-climbing problems (minimum s...
Many questions in mathematics and physics can be reduced to the problem of finding and classifying t...
Ekeland's variational principle is now a classical method for investigations of many non-linear...
In this paper we study the existence of solution for a class of variational inequality in whole RN. ...
The mountain pass theorem for scalar functionals is a fundamental result of the minimax methods in ...
Saddle-points and mountain-pass points of energy surfaces have many applications in areas that range...
Existence results are presented for classical solutions to some nonvariational problems through a su...
The energy integral of the calculus of variations, which we consider in this paper, has a limit beha...
The main result stated in the present paper is the existence of a lion-negative solution for a semil...
DOI
Add to ORKG