A generalization of a theorem of Arrow,Barankin and Blackwell to a nonconvex case |
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Authors: | Nergiz Kasimbeyli Musa Mammadov |
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Institution: | 1. Department of Industrial Engineering, Anadolu University, Eskisehir, Turkey.;2. Centre for Informatics and Applied Optimisation, Federation University, Ballarat, Australia. |
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Abstract: | The paper presents a generalization of a known density theorem of Arrow, Barankin, and Blackwell for properly efficient points defined as support points of sets with respect to monotonically increasing sublinear functions. This result is shown to hold for nonconvex sets of a partially ordered reflexive Banach space. |
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Keywords: | Vector optimization density theorem nonlinear separation theorem augmented dual cone proper efficiency |
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