Add to ORKGInternational audienceIn these last few years the theory of variational inequalities, is being developed very fast, having as model the variational theory of boundary value problems for partial differential equations. The theory of variational inequalities represents, in fact, a very natural generalization of the theory of boundary value problems and allows us to consider new problems arising from many fields of applied Mathematics, such as Mechanics, Physics, the Theory of convex programming and the Theory of control
Preface In this thesis, we develop several methods for solving the general (not necessarily monotone...
AbstractWe obtain a result on the Hölder continuity of solutions to variational inequalities of the ...
Invexity was introduced as an extension of differentiable convex ffinctions due to Hanson[6] in 1981...
It is well known that variational inequalities are systematically used in the theory of many practic...
AbstractIn this paper we deal with the existence theory for a problem and give the proof of the exis...
summary:The solvability of a class of monotone nonlinear variational inequality problems in a reflex...
AbstractIn this paper, we use the fixed-point technique to prove the existence of a unique solution ...
AbstractIn this paper, we derive some existence results for the variational inequality in Banach spa...
AbstractThe main result of the theory of variational inequalities on convex sets for monotone nonlin...
We study a new class of elliptic variational-hemivariational inequalities in reflexive Banach spaces...
AbstractWe prove the existence of positive solutions of some eigenvalue problems relative to variati...
In this paper, we study a class of partial differential variational inequalities. A general stabilit...
AbstractIn this paper we provide an account of some of the fundamental aspects of variational inequa...
This is a new and unique course concerning two topics – variational inequalities and the geometry of...
[[abstract]]Existence results are developed for generalized variational inequalities. In addition, w...
Preface In this thesis, we develop several methods for solving the general (not necessarily monotone...
AbstractWe obtain a result on the Hölder continuity of solutions to variational inequalities of the ...
Invexity was introduced as an extension of differentiable convex ffinctions due to Hanson[6] in 1981...
It is well known that variational inequalities are systematically used in the theory of many practic...
AbstractIn this paper we deal with the existence theory for a problem and give the proof of the exis...
summary:The solvability of a class of monotone nonlinear variational inequality problems in a reflex...
AbstractIn this paper, we use the fixed-point technique to prove the existence of a unique solution ...
AbstractIn this paper, we derive some existence results for the variational inequality in Banach spa...
AbstractThe main result of the theory of variational inequalities on convex sets for monotone nonlin...
We study a new class of elliptic variational-hemivariational inequalities in reflexive Banach spaces...
AbstractWe prove the existence of positive solutions of some eigenvalue problems relative to variati...
In this paper, we study a class of partial differential variational inequalities. A general stabilit...
AbstractIn this paper we provide an account of some of the fundamental aspects of variational inequa...
This is a new and unique course concerning two topics – variational inequalities and the geometry of...
[[abstract]]Existence results are developed for generalized variational inequalities. In addition, w...
Preface In this thesis, we develop several methods for solving the general (not necessarily monotone...
AbstractWe obtain a result on the Hölder continuity of solutions to variational inequalities of the ...
Invexity was introduced as an extension of differentiable convex ffinctions due to Hanson[6] in 1981...
