The paper concerns first-order necessary optimality conditions for problems of minimizing nonsmooth functions under various constraints in infinite-dimensional spaces. Based on advanced tools of variational analysis and generalized differential calculus, we derive general results of two independent types called lower subdifferential and upper subdifferential optimality conditions. The former ones involve basic/limiting subgradients of cost functions, while the latter conditions are expressed via Frechetjregular upper subgradients in fairly general settings. All the upper subdifferential and major lower subdifferential optimality conditions obtained in the paper are new even in finite dimensions. We give applications of general optimality co...
AbstractIn this study, using the properties of limiting subdifferentials in nonsmooth analysis and r...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
The paper deals with the minimization of an integral functional over an $L^{p}$ space subject to var...
The paper concerns first-order necessary optimality conditions for problems of minimizing nonsmooth ...
The paper is devoted to applications of modern methods of variational· analysis to constrained optim...
We develop various (exact) calculus rules for Frechet lower and upper subgradients of extended-realv...
Under a suitable assumption necessary optimality conditions are derived for nonsmooth minimax proble...
The paper is devoted to applications of modern variational f).nalysis to the study of constrained op...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
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...
Abstract. In this paper we study mathematical programs with equilibrium constraints (MPECs) describe...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
Higher-order necessary and sufficient optimality conditions for a nonsmooth minimax problem with inf...
summary:In this paper we study set-valued optimization problems with equilibrium constraints (SOPEC...
AbstractIn this study, using the properties of limiting subdifferentials in nonsmooth analysis and r...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
The paper deals with the minimization of an integral functional over an $L^{p}$ space subject to var...
The paper concerns first-order necessary optimality conditions for problems of minimizing nonsmooth ...
The paper is devoted to applications of modern methods of variational· analysis to constrained optim...
We develop various (exact) calculus rules for Frechet lower and upper subgradients of extended-realv...
Under a suitable assumption necessary optimality conditions are derived for nonsmooth minimax proble...
The paper is devoted to applications of modern variational f).nalysis to the study of constrained op...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
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...
Abstract. In this paper we study mathematical programs with equilibrium constraints (MPECs) describe...
In this paper we study mathematical programs with equilibrium constraints (MPECs) described by gener...
Higher-order necessary and sufficient optimality conditions for a nonsmooth minimax problem with inf...
summary:In this paper we study set-valued optimization problems with equilibrium constraints (SOPEC...
AbstractIn this study, using the properties of limiting subdifferentials in nonsmooth analysis and r...
This paper is devoted to the study of nonsmooth generalized semi-infinite programming problems in wh...
The paper deals with the minimization of an integral functional over an $L^{p}$ space subject to var...