Proper Efficiency and Generalized Nonconvex Duality for Vector Minimization Problems

Kanniappan, P.; Pandian, P.

doi:10.1007/BF03398514

Proper Efficiency and Generalized Nonconvex Duality for Vector Minimization Problems

Theoretical Papers
Published: 24 November 2017

Volume 34, pages 105–115, (1997)
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P. Kanniappan¹ &
P. Pandian²

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Abstract

Using the concept of proper efficiency, sufficient optimality conditions and duality results are obtained for vector minimization problems under generalized ( F. ω ) — convexity assumptions.

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Department of Mathematics, Gandhigram Rural University, Gandhigram, 624 302, India
P. Kanniappan
Department of Mathematics, Mepco Schlenk Engg. College, Mepco Nagar, 626 005, India
P. Pandian

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P. Kanniappan
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Kanniappan, P., Pandian, P. Proper Efficiency and Generalized Nonconvex Duality for Vector Minimization Problems. OPSEARCH 34, 105–115 (1997). https://doi.org/10.1007/BF03398514

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Published: 24 November 2017
Issue Date: June 1997
DOI: https://doi.org/10.1007/BF03398514

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Proper Efficiency and Generalized Nonconvex Duality for Vector Minimization Problems

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Proper Efficiency and Generalized Nonconvex Duality for Vector Minimization Problems

Abstract

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Duality in nonconvex vector optimization

Optimality and duality for vector optimization problem with non-convex feasible set

Optimality condition and quasi-conjugate duality with zero gap in nonconvex optimization

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