A Unified Approach and Optimality Conditions for Approximate Solutions of Vector Optimization Problems

Scalarization and optimality conditions for the approximate solutions to vector variational inequalities in Banach spaces, A kind of unified super efficiency via assumption (A) and applications in vector optimization, Exact and approximate vector Ekeland variational principles, Approximate solutions in nonsmooth and nonconvex cone constrained vector optimization, Coradiant sets and \(\varepsilon \)-efficiency in multiobjective optimization, Image space analysis and scalarization for \(\varepsilon \)-optimization of multifunctions, Lagrange multiplier rules for weak approximate Pareto solutions to constrained vector optimization problems with variable ordering structures, Strict approximate solutions in set-valued optimization with applications to the approximate Ekeland variational principle, Characterizing ϵ-properly efficient solutions, Generalized Benders Decomposition for one Class of MINLPs with Vector Conic Constraint, A Brézis-Browder principle on partially ordered spaces and related ordering theorems, On approximating weakly/properly efficient solutions in multi-objective programming, Existence of optimal points via improvement sets, Chain rules for a proper \(\varepsilon\)-subdifferential of vector mappings, Sublinear scalarizations for proper and approximate proper efficient points in nonconvex vector optimization, Properties of the nonlinear scalar functional and its applications to vector optimization problems, Equivalent \(\varepsilon\)-efficiency notions in vector optimization, Conic positive definiteness and sharp minima of fractional orders in vector optimization problems, A generic approach to approximate efficiency and applications to vector optimization with set-valued maps, Ekeland variational principles for set-valued functions with set perturbations, Conic scalarizations for approximate efficient solutions in nonconvex vector optimization problems, Existence and optimality conditions for approximate solutions to vector optimization problems, Equilibrium set-valued variational principles and the lower boundedness condition with application to psychology, Duality related to approximate proper solutions of vector optimization problems, Approximate properly solutions of constrained vector optimization with variable coradiant sets, Unnamed Item, Vector optimization problems via improvement sets, Scalarization in vector optimization with arbitrary domination sets, Characterization of approximate solutions of vector optimization problems with a variable order structure, Lagrange multiplier rules for weak approximate Pareto solutions of constrained vector optimization problems in Hilbert spaces, A kind of unified proper efficiency in vector optimization, A coradiant based scalarization to characterize approximate solutions of vector optimization problems with variable ordering structures, A Branch--and--Bound-Based Algorithm for Nonconvex Multiobjective Optimization, Concepts for approximate solutions of vector optimization problems with variable order structures, Optimality Conditions for Weakly ϵ-Efficient Solutions of Vector Optimization Problems with Applications, Coradiant-valued maps and approximate solutions in variable ordering structures, Generalized Gerstewitz's functions and vector variational principle for \(\epsilon\)-efficient solutions in the sense of Németh, Stability and scalarization in vector optimization using improvement sets, Set-valued pseudo-metric families and Ekeland's variational principles in fuzzy metric spaces, \(e\)-proper saddle points and \(e\)-proper duality in vector optimization with set-valued maps, Scalarizations for a unified vector optimization problem based on order representing and order preserving properties, Improvement sets and vector optimization, Generalized \(\varepsilon \)-quasi-solutions in multiobjective optimization problems: existence results and optimality conditions, Some properties of approximate solutions for vector optimization problem with set-valued functions, Characterizing efficiency on infinite-dimensional commodity spaces with ordering cones having possibly empty interior, Ekeland variational principles involving set perturbations in vector equilibrium problems, Some properties of nonconvex oriented distance function and applications to vector optimization problems, Scalarizations and Lagrange multipliers for approximate solutions in the vector optimization problems with set-valued maps, On Hadamard well-posedness of families of Pareto optimization problems, Approximate proper efficiency in vector optimization, Scalarization and saddle points of approximate proper solutions in nearly subconvexlike vector optimization problems, Scalarization for characterization of approximate strong/weak/proper efficiency in multi-objective optimization, A unified vector optimization problem: complete scalarizations and applications, Limit Behavior of Approximate Proper Solutions in Vector Optimization, Optimality conditions via scalarization for a new \(\epsilon \)-efficiency concept in vector optimization problems, Optimality conditions via a unified direction approach for (approximate) efficiency in multiobjective optimization, E-Benson proper efficiency in vector optimization, ε-Conjugate maps andε-conjugate duality in vector optimization with set-valued maps, Optimality conditions via scalarization for approximate quasi efficiency in multiobjective optimization, A characterization of \(E\)-Benson proper efficiency via nonlinear scalarization in vector optimization, Characterizations of the approximate solution sets of nonsmooth optimization problems and its applications, Approximate proper efficiency for multiobjective optimization problems, Approximate solutions of multiobjective optimization problems, Scalarizations for approximate quasi efficient solutions in multiobjective optimization problems, Optimality conditions for quasi-solutions of vector optimization problems