Add to ORKGAbstract. The main purpose of this paper is to establish a three critical points result without assuming the coercivity of the involved functional. To this end, a mountain-pass theorem, where the usual Palais-Smale condition is not requested, is presented. These results are then applied to prove the existence of three solutions for a two-point boundary value problem with no asymptotic conditions. 1
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
This paper studies a Hamiltonian system possessing a double well potential for which the existence o...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
Existence results are presented for classical solutions to some nonvariational problems through a su...
AbstractWe present a form of the mountain pass lemma which allows one to restrict the paths to a bou...
We give a modified form of the mountain pass lemma which does not require the Palais-Smale condition...
Abstract: We present some versions of the Mountain Pass Theorem of Ambrosetti and Rabinowitz for loc...
AbstractOur goal here is to prove the existence of a nontrivial critical point to the following func...
In this paper, we deal with a specific type of quasilinear boundary value problem with Dirichlet bou...
We obtain the existence of symmetric Mountain Pass solutions for quasi-linear equations without the ...
AbstractWe obtain the existence of symmetric Mountain Pass solutions for quasi-linear equations with...
AbstractFor an even functional on a Banach space, the symmetric mountain pass lemma gives a sequence...
Abstract. The aim of this paper is twofold. On one hand we establish a three critical points theorem...
AbstractWe present a more general form of the mountain pass lemma. It asserts that a C1 functional w...
abstract: By applying two versions of Mountain Pass Theorem, we prove two different situations of th...
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
This paper studies a Hamiltonian system possessing a double well potential for which the existence o...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...
Existence results are presented for classical solutions to some nonvariational problems through a su...
AbstractWe present a form of the mountain pass lemma which allows one to restrict the paths to a bou...
We give a modified form of the mountain pass lemma which does not require the Palais-Smale condition...
Abstract: We present some versions of the Mountain Pass Theorem of Ambrosetti and Rabinowitz for loc...
AbstractOur goal here is to prove the existence of a nontrivial critical point to the following func...
In this paper, we deal with a specific type of quasilinear boundary value problem with Dirichlet bou...
We obtain the existence of symmetric Mountain Pass solutions for quasi-linear equations without the ...
AbstractWe obtain the existence of symmetric Mountain Pass solutions for quasi-linear equations with...
AbstractFor an even functional on a Banach space, the symmetric mountain pass lemma gives a sequence...
Abstract. The aim of this paper is twofold. On one hand we establish a three critical points theorem...
AbstractWe present a more general form of the mountain pass lemma. It asserts that a C1 functional w...
abstract: By applying two versions of Mountain Pass Theorem, we prove two different situations of th...
We establish the existence of a mountain pass solution for a variational integral involving a quasic...
This paper studies a Hamiltonian system possessing a double well potential for which the existence o...
Abstract. We prove the existence of a positive solution to the BVP (Φ(t)u′(t)) ′ = f(t, u(t)), u′(0...