Add to ORKGAbstract. In this paper we study general functionals of the calculus of variations with the presence of a Hardy potential. We will improve several results obtained in the semilinear framework. We will first prove a general weak lower semicontinuity result, which will imply the existence of a minimum point whenever the functional is coercive. Then we will demonstrate existence and multiplicity results of critical points, even if our functional is not differentiable. We will apply a nonsmooth critical point theory developed in [?] and [?]. 1
AbstractA classical critical point theorem in presence of splitting established by Brézis–Nirenberg ...
Abstract. We study some variational principles which imply the existence of multiple critical points...
A general min-max principle established by Ghoussoub is extended to the case of functionals which ar...
In this paper we study general functionals of the calculus of variations with the presence of a Hard...
We study the multiplicity of critical points for functionals which are only differentiable along som...
Abstract. In this paper we prove the existence of critical points of non differentiable functionals ...
AbstractWe study the multiplicity of critical points for functionals which are only differentiable a...
AbstractFor a general class of lower semicontinuous functionals, we prove existence and multiplicity...
In this paper we prove existence and multiplicity results of unbounded critical points for a genera...
In this paper we deal with the existence of critical points of functionals defined on the Sobolev sp...
A recently established three-critical-points theorem of Ricceri relating to continuously Gâteaux dif...
AbstractMultiple critical points theorems for non-differentiable functionals are established. Applic...
AbstractWe consider minimization results for locally Lipschitzian functionals on a Banach space by i...
A classical critical point theorem in presence of splitting established by Brézis-Nirenberg is exte...
In this paper we deal with the existence and multiplicity of critical points for non differentiable ...
AbstractA classical critical point theorem in presence of splitting established by Brézis–Nirenberg ...
Abstract. We study some variational principles which imply the existence of multiple critical points...
A general min-max principle established by Ghoussoub is extended to the case of functionals which ar...
In this paper we study general functionals of the calculus of variations with the presence of a Hard...
We study the multiplicity of critical points for functionals which are only differentiable along som...
Abstract. In this paper we prove the existence of critical points of non differentiable functionals ...
AbstractWe study the multiplicity of critical points for functionals which are only differentiable a...
AbstractFor a general class of lower semicontinuous functionals, we prove existence and multiplicity...
In this paper we prove existence and multiplicity results of unbounded critical points for a genera...
In this paper we deal with the existence of critical points of functionals defined on the Sobolev sp...
A recently established three-critical-points theorem of Ricceri relating to continuously Gâteaux dif...
AbstractMultiple critical points theorems for non-differentiable functionals are established. Applic...
AbstractWe consider minimization results for locally Lipschitzian functionals on a Banach space by i...
A classical critical point theorem in presence of splitting established by Brézis-Nirenberg is exte...
In this paper we deal with the existence and multiplicity of critical points for non differentiable ...
AbstractA classical critical point theorem in presence of splitting established by Brézis–Nirenberg ...
Abstract. We study some variational principles which imply the existence of multiple critical points...
A general min-max principle established by Ghoussoub is extended to the case of functionals which ar...