Journal of Optimization Theory and Applications, ISSN 0022-3239, 3/2016, Volume 168, Issue 3, pp. 1065 - 1086

We deal with jointly convex generalized Nash equilibrium problems in infinite-dimensional spaces...

Jointly convex generalized Nash equilibrium problem | 65N12 | Mathematics | Theory of Computation | Optimization | Control box constraints | 49M20 | 91A10 | Calculus of Variations and Optimal Control; Optimization | Multiobjective optimal control | Normalized Nash equilibrium | State constraints | Applications of Mathematics | Engineering, general | Operation Research/Decision Theory | Elliptic partial differential equation | VARIATIONAL-INEQUALITIES | EXISTENCE | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | STATE | OPTIMIZATION | Game theory | Algorithms | Aerospace engineering | Studies | Control theory | Finite element analysis | Approximation | Mathematical analysis | Optimal control | Mathematical models | Design optimization | Convergence

Jointly convex generalized Nash equilibrium problem | 65N12 | Mathematics | Theory of Computation | Optimization | Control box constraints | 49M20 | 91A10 | Calculus of Variations and Optimal Control; Optimization | Multiobjective optimal control | Normalized Nash equilibrium | State constraints | Applications of Mathematics | Engineering, general | Operation Research/Decision Theory | Elliptic partial differential equation | VARIATIONAL-INEQUALITIES | EXISTENCE | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | STATE | OPTIMIZATION | Game theory | Algorithms | Aerospace engineering | Studies | Control theory | Finite element analysis | Approximation | Mathematical analysis | Optimal control | Mathematical models | Design optimization | Convergence

Journal Article

Journal of Global Optimization, ISSN 0925-5001, 11/2013, Volume 57, Issue 3, pp. 843 - 861

.... Later this approach is modified to obtain the second optimization reformulation whose global minima characterize the normalized Nash equilibria...

91A10 | Optimization reformulations | 90C30 | Operations Research/Decision Theory | Regularized indicator Nikaidô–Isoda function | Normalized Nash equilibria | Computer Science, general | Quasi-variational inequality problem | Generalized Nash equilibrium problem | Optimization | Economics / Management Science | Real Functions | Regularized indicator Nikaidô-Isoda function | Studies | Game theory | Mathematical models | Constraints | Minima | Mathematical analysis | Indicators

91A10 | Optimization reformulations | 90C30 | Operations Research/Decision Theory | Regularized indicator Nikaidô–Isoda function | Normalized Nash equilibria | Computer Science, general | Quasi-variational inequality problem | Generalized Nash equilibrium problem | Optimization | Economics / Management Science | Real Functions | Regularized indicator Nikaidô-Isoda function | Studies | Game theory | Mathematical models | Constraints | Minima | Mathematical analysis | Indicators

Journal Article

Journal of Optimization Theory and Applications, ISSN 0022-3239, 8/2015, Volume 166, Issue 2, pp. 644 - 658

...J Optim Theory Appl (2015) 166:644–658 DOI 10.1007/s10957-014-0623-6 S-adapted Equilibria in Games Played Over Event Trees with Coupled Constraints Elnaz...

Event tree | Calculus of Variations and Optimal Control; Optimization | Operations Research/Decision Theory | Pollution control | Dynamic games | Mathematics | Theory of Computation | Applications of Mathematics | Engineering, general | Coupled constraint | Normalized equilibrium | Optimization | MATHEMATICS, APPLIED | SPACES | TURNPIKE-THEORY | ENVIRONMENTAL GAME | STRATEGIES | UNIQUENESS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ELECTRICITY MARKET | DYNAMIC OLIGOPOLISTIC MARKETS | STOCHASTIC VARIATIONAL-INEQUALITIES | NASH EQUILIBRIUM | Studies | Optimization algorithms | Mathematical models | Game theory | Equilibrium | Economics | Uniqueness | Games | Maximum principle | Joining | Stands | Players

Event tree | Calculus of Variations and Optimal Control; Optimization | Operations Research/Decision Theory | Pollution control | Dynamic games | Mathematics | Theory of Computation | Applications of Mathematics | Engineering, general | Coupled constraint | Normalized equilibrium | Optimization | MATHEMATICS, APPLIED | SPACES | TURNPIKE-THEORY | ENVIRONMENTAL GAME | STRATEGIES | UNIQUENESS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ELECTRICITY MARKET | DYNAMIC OLIGOPOLISTIC MARKETS | STOCHASTIC VARIATIONAL-INEQUALITIES | NASH EQUILIBRIUM | Studies | Optimization algorithms | Mathematical models | Game theory | Equilibrium | Economics | Uniqueness | Games | Maximum principle | Joining | Stands | Players

Journal Article

Optimization Methods and Software, ISSN 1055-6788, 12/2008, Volume 23, Issue 6, pp. 953 - 973

The generalized Nash equilibrium problem is a Nash game which, in contrast to the standard Nash equilibrium problem, allows the strategy sets of each player to depend on the decision variables of all other...

Semismooth function | Joint constraints | Regularized Nikaido-Isoda function | Normalized Nash equilibrium | Superlinear convergence | Generalized Nash equilibrium | Implicit function | COMPLEMENTARITY-PROBLEMS | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | NONCOOPERATIVE EQUILIBRIA | DIFFERENTIABILITY | GAMES | EQUATIONS | implicit function | joint constraints | STRONG STABILITY | normalized Nash equilibrium | VARIATIONAL-INEQUALITIES | COMPUTER SCIENCE, SOFTWARE ENGINEERING | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | generalized Nash equilibrium | semismooth function | superlinear convergence | COMPUTATION | regularized Nikaido-Isoda function

Semismooth function | Joint constraints | Regularized Nikaido-Isoda function | Normalized Nash equilibrium | Superlinear convergence | Generalized Nash equilibrium | Implicit function | COMPLEMENTARITY-PROBLEMS | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | NONCOOPERATIVE EQUILIBRIA | DIFFERENTIABILITY | GAMES | EQUATIONS | implicit function | joint constraints | STRONG STABILITY | normalized Nash equilibrium | VARIATIONAL-INEQUALITIES | COMPUTER SCIENCE, SOFTWARE ENGINEERING | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | generalized Nash equilibrium | semismooth function | superlinear convergence | COMPUTATION | regularized Nikaido-Isoda function

Journal Article

Computational optimization and applications, ISSN 1573-2894, 2007, Volume 43, Issue 3, pp. 353 - 377

.... However, this reformulation is nonsmooth. We then modify this approach and obtain a smooth constrained optimization problem whose global minima correspond to so-called normalized Nash equilibria...

Normalized Nash equilibria | Regularized Nikaido-Isoda-function | Joint constraints | Constrained optimization reformulation | Unconstrained optimization reformulation | Generalized Nash equilibria | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | NONCOOPERATIVE EQUILIBRIA | GAMES | MARKETS | VARIATIONAL INEQUALITY PROBLEMS | BORWEIN GRADIENT-METHOD | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | BARZILAI | CONVERGENCE | COMPUTATION | UNCONSTRAINED MINIMIZATION | Mathematical optimization | Game theory | Studies | Optimization

Normalized Nash equilibria | Regularized Nikaido-Isoda-function | Joint constraints | Constrained optimization reformulation | Unconstrained optimization reformulation | Generalized Nash equilibria | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | NONCOOPERATIVE EQUILIBRIA | GAMES | MARKETS | VARIATIONAL INEQUALITY PROBLEMS | BORWEIN GRADIENT-METHOD | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | BARZILAI | CONVERGENCE | COMPUTATION | UNCONSTRAINED MINIMIZATION | Mathematical optimization | Game theory | Studies | Optimization

Journal Article

Operations Research Letters, ISSN 0167-6377, 07/2019, Volume 47, Issue 4, pp. 235 - 240

A private bad is a commodity that causes its owner disutility. We study the bilateral exchange of a bad for a good that provides utility. Considering the...

Exchange of bads | Normalized equilibrium | Coupled constraints | First-best solution | Fair allocation | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ECONOMIES | NASH EQUILIBRIA | ENVIRONMENTAL GAME | Game theory

Exchange of bads | Normalized equilibrium | Coupled constraints | First-best solution | Fair allocation | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ECONOMIES | NASH EQUILIBRIA | ENVIRONMENTAL GAME | Game theory

Journal Article

JOURNAL OF GLOBAL OPTIMIZATION, ISSN 0925-5001, 11/2013, Volume 57, Issue 3, pp. 843 - 861

.... Later this approach is modified to obtain the second optimization reformulation whose global minima characterize the normalized Nash equilibria...

MATHEMATICS, APPLIED | AUGMENTED LAGRANGIAN APPROACH | Optimization reformulations | GAMES | EXACT PENALIZATION | VARIATIONAL INEQUALITIES | Quasi-variational inequality problem | Generalized Nash equilibrium problem | Regularized indicator Nikaido-Isoda function | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | Normalized Nash equilibria | DUALITY | POINTS

MATHEMATICS, APPLIED | AUGMENTED LAGRANGIAN APPROACH | Optimization reformulations | GAMES | EXACT PENALIZATION | VARIATIONAL INEQUALITIES | Quasi-variational inequality problem | Generalized Nash equilibrium problem | Regularized indicator Nikaido-Isoda function | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | Normalized Nash equilibria | DUALITY | POINTS

Journal Article

Mathematical Programming, ISSN 0025-5610, 4/2012, Volume 132, Issue 1, pp. 99 - 123

We consider the generalized Nash equilibrium problem (GNEP), where not only the players’ cost functions but also their strategy spaces depend on the rivals’ decision variables...

Local superlinear/quadratic convergence | Theoretical, Mathematical and Computational Physics | Nonsmooth Newton method | Mathematics | Computable generalized Jacobian | Generalized Nash equilibrium problem | Mathematical Methods in Physics | 91A10 | Constant rank constraint qualification | 90C30 | Mathematics of Computing | Calculus of Variations and Optimal Control; Optimization | Numerical Analysis | Fixed point characterization | 49M15 | Combinatorics | Normalized equilibrium | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | OPTIMIZATION REFORMULATIONS | EQUATIONS | COMPUTER SCIENCE, SOFTWARE ENGINEERING | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MAPS | SYSTEMS | Game theory | Methods | Universities and colleges | Studies | Numerical analysis | Equilibrium | Fixed points (mathematics) | Computation | Mathematical analysis | Newton methods | Games | Strategy | Mathematical models | Jacobians | Convergence

Local superlinear/quadratic convergence | Theoretical, Mathematical and Computational Physics | Nonsmooth Newton method | Mathematics | Computable generalized Jacobian | Generalized Nash equilibrium problem | Mathematical Methods in Physics | 91A10 | Constant rank constraint qualification | 90C30 | Mathematics of Computing | Calculus of Variations and Optimal Control; Optimization | Numerical Analysis | Fixed point characterization | 49M15 | Combinatorics | Normalized equilibrium | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | OPTIMIZATION REFORMULATIONS | EQUATIONS | COMPUTER SCIENCE, SOFTWARE ENGINEERING | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MAPS | SYSTEMS | Game theory | Methods | Universities and colleges | Studies | Numerical analysis | Equilibrium | Fixed points (mathematics) | Computation | Mathematical analysis | Newton methods | Games | Strategy | Mathematical models | Jacobians | Convergence

Journal Article

Dans le domaine d’optimisation de forme de structures, la réduction des coûts et l’amélioration des produits sont des défis permanents à relever. Pour ce...

Méthode NBI | Normal Boundary Intersection | Équilibre de Kalai-Smorodinsky | Métamodèle RBF | Normalized Normal constraint Method | Méthode NMCM | Radial Basis Function metamodel | Optimisation multicritère | Équilibre de Nash | Coupling | Couplage | Nash and Kalai-Smorodinsky equilibria | Multicriteria optimization problems

Méthode NBI | Normal Boundary Intersection | Équilibre de Kalai-Smorodinsky | Métamodèle RBF | Normalized Normal constraint Method | Méthode NMCM | Radial Basis Function metamodel | Optimisation multicritère | Équilibre de Nash | Coupling | Couplage | Nash and Kalai-Smorodinsky equilibria | Multicriteria optimization problems

Dissertation

Journal of Inequalities and Applications, ISSN 1025-5834, 2015, Volume 2015, Issue 1, pp. 1 - 16

The generalized Nash equilibrium problem is an extension of the standard Nash equilibrium problem where both the utility function and the strategy space of each player depend on the strategies chosen...

normalized Nash equilibrium | M-stationary point | Nikaido-Isoda function | standard Nash equilibrium problem | generalized Nash equilibrium problem | MATHEMATICS | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | GAMES | Utilities | Mathematical analysis | Inequalities | Tools | Strategy | Mathematical models | Standards | Convergence | Players

normalized Nash equilibrium | M-stationary point | Nikaido-Isoda function | standard Nash equilibrium problem | generalized Nash equilibrium problem | MATHEMATICS | MATHEMATICS, APPLIED | RELAXATION ALGORITHMS | GAMES | Utilities | Mathematical analysis | Inequalities | Tools | Strategy | Mathematical models | Standards | Convergence | Players

Journal Article

Environmental Modeling & Assessment, ISSN 1420-2026, 10/2013, Volume 18, Issue 5, pp. 493 - 508

We model the climate change issue as a pollution control game with the purpose of comparing two possible departures from the business as usual (BAU) where...

Variational and quasi-variational inequalities | Normalized equilibria | International cap and trade system | Environmental game | Global emission ceiling | Math. Appl. in Environmental Science | Climate change | Q54 | Q58 | Operations Research/Decision Theory | Environment | Mathematical Modeling and Industrial Mathematics | Applications of Mathematics | National emission quotas | C72 | VARIATIONAL-INEQUALITIES | ENVIRONMENTAL SCIENCES | GAME | NASH EQUILIBRIUM | Analysis | Greenhouse effect | Global temperature changes | Studies | Game theory | Pollution control | Emissions trading | Quotas | Inequalities | Games | Emission | Emissions control | Business | Players | Economics and Finance | Humanities and Social Sciences

Variational and quasi-variational inequalities | Normalized equilibria | International cap and trade system | Environmental game | Global emission ceiling | Math. Appl. in Environmental Science | Climate change | Q54 | Q58 | Operations Research/Decision Theory | Environment | Mathematical Modeling and Industrial Mathematics | Applications of Mathematics | National emission quotas | C72 | VARIATIONAL-INEQUALITIES | ENVIRONMENTAL SCIENCES | GAME | NASH EQUILIBRIUM | Analysis | Greenhouse effect | Global temperature changes | Studies | Game theory | Pollution control | Emissions trading | Quotas | Inequalities | Games | Emission | Emissions control | Business | Players | Economics and Finance | Humanities and Social Sciences

Journal Article

12.
Full Text
The Multiplier-Penalty Method for Generalized Nash Equilibrium Problems in Banach Spaces

SIAM journal on optimization, ISSN 1095-7189, 2019, Volume 29, Issue 1, pp. 767 - 793

This paper deals with generalized Nash equilibrium problems (GNEPs) in Banach spaces. We give an existence result for normalized equilibria of jointly convex...

EXISTENCE | MATHEMATICS, APPLIED | augmented Lagrangian method | normalized equilibrium | generalized Nash equilibrium problem | GAMES | PRIMAL-DUAL STRATEGY | optimal control | OPTIMIZATION | Banach space | POINTWISE CONTROL | differential game

EXISTENCE | MATHEMATICS, APPLIED | augmented Lagrangian method | normalized equilibrium | generalized Nash equilibrium problem | GAMES | PRIMAL-DUAL STRATEGY | optimal control | OPTIMIZATION | Banach space | POINTWISE CONTROL | differential game

Journal Article

Economic theory bulletin, ISSN 2196-1093, 2016, Volume 4, Issue 2, pp. 213 - 229

.... For that reason, the solution concept incorporates features of Nash and Walras equilibria. Focus is on how the concerned agents, by themselves, may reach an outcome of such sort...

Economics | D62 | D43 | Stability | Public Finance | Coupling constraints | Economic Theory/Quantitative Economics/Mathematical Methods | Game Theory, Economics, Social and Behav. Sciences | Partial efficiency | Convergence | Normalized Nash equilibrium | Macroeconomics/Monetary Economics//Financial Economics | Monotonicity | C62 | Bilateral exchange | C72 | Studies | Economic models | Pollution | Economic theory | Efficiency | Game theory

Economics | D62 | D43 | Stability | Public Finance | Coupling constraints | Economic Theory/Quantitative Economics/Mathematical Methods | Game Theory, Economics, Social and Behav. Sciences | Partial efficiency | Convergence | Normalized Nash equilibrium | Macroeconomics/Monetary Economics//Financial Economics | Monotonicity | C62 | Bilateral exchange | C72 | Studies | Economic models | Pollution | Economic theory | Efficiency | Game theory

Journal Article

Operations research, ISSN 0030-364X, 4/2010, Volume 58, Issue 2, pp. 289 - 302

... on her competitor's strategy. First, we reformulate the robust problem as a fluid model of similar form to the deterministic one and show existence of a Nash equilibrium...

normalized Nash equilibrium | robust optimizations | game theory | optimization under uncertainty | dynamic pricing | Determinism | Robust optimization | Algorithms | Literature | Uniqueness | Nash equilibrium | Inventory control | Production capacity | Economic competition | Production costs | Robust optimizations | Dynamic pricing | Game theory | Optimization under uncertainty | Normalized Nash equilibrium | VARIATIONAL-INEQUALITIES | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MANAGEMENT | ROBUST OPTIMIZATION APPROACH | Usage | Methods | Pricing

normalized Nash equilibrium | robust optimizations | game theory | optimization under uncertainty | dynamic pricing | Determinism | Robust optimization | Algorithms | Literature | Uniqueness | Nash equilibrium | Inventory control | Production capacity | Economic competition | Production costs | Robust optimizations | Dynamic pricing | Game theory | Optimization under uncertainty | Normalized Nash equilibrium | VARIATIONAL-INEQUALITIES | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MANAGEMENT | ROBUST OPTIMIZATION APPROACH | Usage | Methods | Pricing

Journal Article

Indian Journal of Pure and Applied Mathematics, ISSN 0019-5588, 6/2016, Volume 47, Issue 2, pp. 213 - 228

In this paper, we extend the notion of diagonally strictly concave functions and use it to provide a sufficient condition for uniqueness of Nash equilibrium in some concave games...

diagonal strict concavity | normalised Nash equilibrium | differential pricing | Kelly mechanism | Numerical Analysis | network resource allocation | Mathematics, general | Nash equilibrium | Mathematics | Applications of Mathematics | Concave games | MATHEMATICS | RESOURCE-ALLOCATION GAME | EFFICIENCY-LOSS | POWER-CONTROL | Usage | Game theory | Analysis | Pricing | Resource allocation

diagonal strict concavity | normalised Nash equilibrium | differential pricing | Kelly mechanism | Numerical Analysis | network resource allocation | Mathematics, general | Nash equilibrium | Mathematics | Applications of Mathematics | Concave games | MATHEMATICS | RESOURCE-ALLOCATION GAME | EFFICIENCY-LOSS | POWER-CONTROL | Usage | Game theory | Analysis | Pricing | Resource allocation

Journal Article

Journal of Optimization Theory and Applications, ISSN 0022-3239, 10/2009, Volume 143, Issue 1, pp. 159 - 183

The generalized Nash equilibrium problem (GNEP) is an extension of the standard Nash game where, in addition to the cost functions, also the strategy spaces of each player depend on the strategies chosen by all other...

Relaxation method | Global convergence | Regularized Nikaido-Isoda function | Generalized Nash equilibrium problem | Normalized Nash equilibrium | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ALGORITHMS | Game theory | Analysis | Methods | Studies | Optimization

Relaxation method | Global convergence | Regularized Nikaido-Isoda function | Generalized Nash equilibrium problem | Normalized Nash equilibrium | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | ALGORITHMS | Game theory | Analysis | Methods | Studies | Optimization

Journal Article

Optimization Methods and Software, ISSN 1055-6788, 12/2008, Volume 23, Issue 6, pp. 953 - 973

The generalized Nash equilibrium problem is a Nash game which, in contrast to the standard Nash equilibrium problem, allows the strategy sets of each player to depend on the decision variables of all other...

normalized Nash equilibrium | generalized Nash equilibrium | semismooth function | implicit function | superlinear convergence | regularized Nikaido-Isoda function | joint constraints

normalized Nash equilibrium | generalized Nash equilibrium | semismooth function | implicit function | superlinear convergence | regularized Nikaido-Isoda function | joint constraints

Journal Article

ESAIM - Control, Optimisation and Calculus of Variations, ISSN 1292-8119, 07/2017, Volume 23, Issue 3, pp. 1145 - 1177

.... This system is obtained, via the Hopf- Cole transformation, from a two- populations ergodic Mean Field Games system, which describes Nash equilibria in differential games with identical players...

Singularly perturbed problems | Normalized solutions to semilinear elliptic systems | Multi-population differential games | SCHRODINGER-EQUATIONS | MATHEMATICS, APPLIED | FREE-BOUNDARIES | HOLDER BOUNDS | normalized solutions to semilinear elliptic systems | multi-population differential games | BEHAVIOR | POPULATIONS | STRONGLY COMPETING SYSTEMS | MODELS | MASS | ELLIPTIC-SYSTEMS | DOMAINS | AUTOMATION & CONTROL SYSTEMS | Bifurcations | Populations | Variational methods | Game theory | Differential games

Singularly perturbed problems | Normalized solutions to semilinear elliptic systems | Multi-population differential games | SCHRODINGER-EQUATIONS | MATHEMATICS, APPLIED | FREE-BOUNDARIES | HOLDER BOUNDS | normalized solutions to semilinear elliptic systems | multi-population differential games | BEHAVIOR | POPULATIONS | STRONGLY COMPETING SYSTEMS | MODELS | MASS | ELLIPTIC-SYSTEMS | DOMAINS | AUTOMATION & CONTROL SYSTEMS | Bifurcations | Populations | Variational methods | Game theory | Differential games

Journal Article

6th International ICST Conference on Performance Evaluation Methodologies and Tools, 10/2012, pp. 198 - 203

.... Non-cooperative games with common constraints have infinitely many equilibria, we focus on selecting one, the normalized Nash equilibrium, which has some desirable scalable properties related...

Femtocell system | Phase shift keying | equilibrium selection | Bit error rate | normalized equilibrium | Games | interference management | non-cooperative game

Femtocell system | Phase shift keying | equilibrium selection | Bit error rate | normalized equilibrium | Games | interference management | non-cooperative game

Conference Proceeding

Journal of Global Optimization, ISSN 0925-5001, 2/2011, Volume 49, Issue 2, pp. 343 - 357

In this paper, a degree theory for a generalized set-valued variational inequality is built in a Banach space. As an application, an existence result of...

Generalized set-valued variational inequality | Set-valued mapping | Operations Research/Decision Theory | Generalized f -projection operator | Normalized duality mapping | Computer Science, general | Topological degree | Optimization | Economics / Management Science | Real Functions | Generalized f-projection operator | PROJECTION OPERATOR | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MAPPINGS | Equality | Studies | Mapping | Banach spaces

Generalized set-valued variational inequality | Set-valued mapping | Operations Research/Decision Theory | Generalized f -projection operator | Normalized duality mapping | Computer Science, general | Topological degree | Optimization | Economics / Management Science | Real Functions | Generalized f-projection operator | PROJECTION OPERATOR | MATHEMATICS, APPLIED | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | MAPPINGS | Equality | Studies | Mapping | Banach spaces

Journal Article

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