This paper deals with the computation of regular coderivatives of solution maps associated with a frequently arising class of generalized equations. The constraint sets are given by (not necessarily convex) inequalities, and we do not assume linear independence of gradients to active constraints. The achieved results enable us to state several versions of sharp necessary optimality conditions in optimization problems with equilibria governed by such generalized equations. The advantages are illustrated by means of examples
In this paper we study set-valued optimization problems with equilibrium constraints (SOPEOs) descri...
An exhaustive discussion of constraint qualifications (CQ) and stationarity concepts for mathematica...
This paper concerns optimization and equilibrium problems with the so-called equilibrium constraints...
This paper deals with the computation of regular coderivatives of solution maps associated with a fr...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
summary:The paper deals with mathematical programs, where parameter-dependent nonlinear complementar...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
Equilibrium constrained problems form a special class of mathematical programs where the decision va...
summary:In this paper we study set-valued optimization problems with equilibrium constraints (SOPEC...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
The paper is devoted to new applications of advanced tools of modern variational analysis and genera...
Abstract. In this paper we study mathematical programs with equilibrium constraints (MPECs) describe...
The paper is devoted to the study of a new notion of linear suboptimality in constrained mathematica...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
Dedicated to Boris Polyak in honor of his 70th birthday Abstract. The paper is devoted to the study ...
In this paper we study set-valued optimization problems with equilibrium constraints (SOPEOs) descri...
An exhaustive discussion of constraint qualifications (CQ) and stationarity concepts for mathematica...
This paper concerns optimization and equilibrium problems with the so-called equilibrium constraints...
This paper deals with the computation of regular coderivatives of solution maps associated with a fr...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
summary:The paper deals with mathematical programs, where parameter-dependent nonlinear complementar...
The paper concerns the computation of the graphical derivative and the regular (Fréchet) coderivativ...
Equilibrium constrained problems form a special class of mathematical programs where the decision va...
summary:In this paper we study set-valued optimization problems with equilibrium constraints (SOPEC...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
The paper is devoted to new applications of advanced tools of modern variational analysis and genera...
Abstract. In this paper we study mathematical programs with equilibrium constraints (MPECs) describe...
The paper is devoted to the study of a new notion of linear suboptimality in constrained mathematica...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
Dedicated to Boris Polyak in honor of his 70th birthday Abstract. The paper is devoted to the study ...
In this paper we study set-valued optimization problems with equilibrium constraints (SOPEOs) descri...
An exhaustive discussion of constraint qualifications (CQ) and stationarity concepts for mathematica...
This paper concerns optimization and equilibrium problems with the so-called equilibrium constraints...