Necessary Conditions in Multiobjective Optimization with Equilibrium Constraints

Bao, Truong Q.; Gupta, Pankaj; Mordukhovich, Boris S.

doi:10.1007/s10957-007-9209-x

Cited by 74 publications

(31 citation statements)

References 26 publications

(33 reference statements)

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“…Paper [28] proposed another approach to optimistic bilevel programs combining the aforementioned MPEC and value function ones and taking advantages of both for problems with smooth data. We also mention related developments in [11] for semi-infinite and infinite bilevel programs with DC (difference of convex) data and in [1,26] for multiobjective bilevel programs.…”

Section: ) Bymentioning

confidence: 99%

Variational Analysis of Marginal Functions with Applications to Bilevel Programming

Mordukhovich

Nam²,

Phan

2011

J Optim Theory Appl

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Abstract. This paper pursues a twofold goal. First to derive new results on generalized differentiation in variational analysis focusing mainly on a broad class of intrinsically nondifferentiable marginal/value functions. Then the results established in this direction apply to deriving necessary optimality conditions for the optimistic version of bilevel programs that occupy a remarkable place in optimization theory and its various applications. We obtain new sets of optimality conditions in both smooth and smooth settings of finite-dimensional and infinite-dimensional spaces.

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Section: ) Bymentioning

confidence: 99%

Variational Analysis of Marginal Functions with Applications to Bilevel Programming

Mordukhovich

Nam²,

Phan

2011

J Optim Theory Appl

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“…However, this construction does not have a number of natural properties expected for an appropriate notion of normals. In particular, we may haveN(x; Ω ) = {0} for boundary points of Ω even in simple finite-dimensional nonconvex settings; furthermore, inevitable required calculus rules often fail for (2). The situation is dramatically improved while applying the regularization procedure…”

Section: Generalized Differentiationmentioning

confidence: 99%

“…The construction (3) is known as the (basic, limiting, Mordukhovich) normal cone to Ω atx ∈ Ω ; it was introduced in [27] in an equivalent form in finite dimensions. Both constructions (2) and (3) reduce to the classical normal cone of convex analysis for convex sets Ω . In contrast to (2), the basic normal cone (3) is often nonconvex while satisfying the required properties and calculus rules in the Asplund space setting, together with the corresponding coderivative constructions for set-valued mappings and subdifferential constructions for extended-real-valued functions generated by it; see below.…”

Section: Generalized Differentiationmentioning

confidence: 99%

“…In the recent papers [2,4,37,38,46,50,51] we derive necessary optimality conditions for various MPECs (22) as well as for related multiobjective optimization and equilibrium problems with equilibrium constraints governed by generalized equations/ variational conditions (23)- (27), (30)- (32) and their specifications. A major role in these conditions is played by the Fredholm constraint qualification, which reads, in the particular case of the generalized equation in (22) with a smooth base, as that the adjoint generalized equation…”

Section: Mathematical Programs With Equilibrium Constraintsmentioning

confidence: 99%

“…In [32,Sect. 5.3] and in the subsequent papers [2,37,40] we paid the main attention to the study of generalized order optimality defined as follows: given an ordering set Θ ⊂ Z with 0 ∈ Θ , we say tatx ∈ Ω is a locally ( f ,Θ , Ω )-optimal if there are a neighborhood U ofx and a sequence {z k } ⊂ Z with z k → 0 as k → ∞ such that…”

Section: Multiobjective Optimization and Equilibriamentioning

confidence: 99%

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New Applications of Variational Analysis to Optimization and Control

Mordukhovich

2009

IFIP Advances in Information and Communication Technology

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Abstract. We discuss new applications of advanced tools of variational analysis and generalized differentiation to a number of important problems in optimization theory, equilibria, optimal control, and feedback control design. The presented results are largely based on the recent work by the author and his collaborators. Among the main topics considered and briefly surveyed in this paper are new calculus rules for generalized differentiation of nonsmooth and set-valued mappings; necessary and sufficient conditions for new notions of linear subextremality and suboptimality in constrained problems; optimality conditions for mathematical problems with equilibrium constraints; necessary optimality conditions for optimistic bilevel programming with smooth and nonsmooth data; existence theorems and optimality conditions for various notions of Pareto-type optimality in problems of multiobjective optimization with vector-valued and set-valued cost mappings; Lipschitzian stability and metric regularity aspects for constrained and variational systems.

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Nonlinear Multiobjective Programming

Engau

2011

Wiley Encyclopedia of Operations Research and Management Science

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This introductory treatment of the theory and methodology of nonlinear multiobjective programming offers an annotated bibliographic overview of various concepts and approaches to solve continuous deterministic multicriteria optimization problems. First, the notions of Pareto optimality, efficiency, and nondominance are discussed and then related to approximate, epsilon, and proper efficiency. Second, after highlighting similarities and pointing out differences to first‐ and second‐order optimality conditions in classical nonlinear programming, several other topics including duality and sensitivity are also mentioned. Third, a number of solution approaches and generating methods are described with a particular focus on scalarizations using objective aggregation, prioritization, and norm or distance minimization to some utopian reference point.

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Necessary Conditions in Multiobjective Optimization with Equilibrium Constraints

Cited by 74 publications

References 26 publications

Variational Analysis of Marginal Functions with Applications to Bilevel Programming

Variational Analysis of Marginal Functions with Applications to Bilevel Programming

New Applications of Variational Analysis to Optimization and Control

Nonlinear Multiobjective Programming

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