Add to ORKGIn this thesis, we consider the following two important subjects in the modern variational analysis for the corresponding nonconvex/nonmonotone and nonsmooth cases: geometric results and the variational inequality problem. By using the variational technique, we first present several nonsmooth (nonconvex) geometric results (including an approximate projection result, an extended extremal principle, nonconvex separation theorems, a nonconvex generalization of the Bishop-Phelps theorem and a separable point result) which extend some fundamental theorems in linear functional analysis, convex analysis and optimization theory. Then, by transforming the variational inequality problem into equivalent optimization problems, we establish some error b...
In this paper we analyse the Fritz John and Karush-Kuhn-Tucker conditions for a (Gateaux) differ...
AbstractBased on a study of a minimization problem, we present the following results applicable to p...
In this paper we study optimality conditions for optimization problems described by a special class ...
We study the equivalence between the solutions of the variational-like inequality problem and the so...
We study the equivalence between the solutions of the variational-like inequality problem and the so...
Preface In this thesis, we develop several methods for solving the general (not necessarily monotone...
Since nonsmooth optimization problems arise in a diverse range of real-world applications, the poten...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
Until now, no book addressed convexity, monotonicity, and variational inequalities together. General...
AbstractBased on a study of a minimization problem, we present the following results applicable to p...
AbstractIt has long been known that variational inequality problems can be reformulated as nonsmooth...
In this paper, we introduce and consider a new system of general nonconvex variational inequalities ...
Nonconvex Optimization is a multi-disciplinary research field that deals with the characterization a...
Summarization: Nonconvex and nonsmooth optimization problems arise in advanced engineering analysis ...
This is a new and unique course concerning two topics – variational inequalities and the geometry of...
In this paper we analyse the Fritz John and Karush-Kuhn-Tucker conditions for a (Gateaux) differ...
AbstractBased on a study of a minimization problem, we present the following results applicable to p...
In this paper we study optimality conditions for optimization problems described by a special class ...
We study the equivalence between the solutions of the variational-like inequality problem and the so...
We study the equivalence between the solutions of the variational-like inequality problem and the so...
Preface In this thesis, we develop several methods for solving the general (not necessarily monotone...
Since nonsmooth optimization problems arise in a diverse range of real-world applications, the poten...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
Until now, no book addressed convexity, monotonicity, and variational inequalities together. General...
AbstractBased on a study of a minimization problem, we present the following results applicable to p...
AbstractIt has long been known that variational inequality problems can be reformulated as nonsmooth...
In this paper, we introduce and consider a new system of general nonconvex variational inequalities ...
Nonconvex Optimization is a multi-disciplinary research field that deals with the characterization a...
Summarization: Nonconvex and nonsmooth optimization problems arise in advanced engineering analysis ...
This is a new and unique course concerning two topics – variational inequalities and the geometry of...
In this paper we analyse the Fritz John and Karush-Kuhn-Tucker conditions for a (Gateaux) differ...
AbstractBased on a study of a minimization problem, we present the following results applicable to p...
In this paper we study optimality conditions for optimization problems described by a special class ...