Second-order optimality conditions in set-valued optimization via asymptotic derivatives |
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Authors: | Akhtar A. Khan |
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Affiliation: | Center for Applied and Computational Mathematics, School of Mathematical Sciences , Rochester Institute of Technology , 85 Lomb Memorial Drive, Rochester , New York 14623 , USA |
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Abstract: | In this article we give new second-order optimality conditions in set-valued optimization. We use the second-order asymptotic tangent cones to define second-order asymptotic derivatives and employ them to give the optimality conditions. We extend the well-known Dubovitskii–Milutin approach to set-valued optimization to express the optimality conditions given as an empty intersection of certain cones in the objective space. We also use some duality arguments to give new multiplier rules. By following the more commonly adopted direct approach, we also give optimality conditions in terms of a disjunction of certain cones in the image space. Several particular cases are discussed. |
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Keywords: | set-valued optimization second-order asymptotic derivatives second-order contingent derivatives second-order contingent sets contingent cones adjacent cones interiorly tangent cones Aubin property optimality conditions |
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