Higher-order optimality conditions for weakly efficient solutions in nonconvex set-valued optimization

Higher-order optimality conditions for weakly efficient solutions in nonconvex set-valued optimization

In this paper, generalized higher-order contingent (adjacent) derivatives of set-valued maps are introduced and some of their properties are discussed. Under no any convexity assumptions, necessary and sufficient optimality conditions are obtained for weakly efficient solutions of set-valued optimiz...

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Bibliographic Details
Main Authors: Wang, L., Li, S., Teo, Kok Lay
Format: Journal Article
Published: Springer Verlag 2010
Subjects:
Nonconvex set-valued optimization - Generalized higher-order contingent (adjacent) derivatives - Gerstewitz’s nonconvex separation functional - Weakly efficient solutions - Higher-order optimality conditions
Online Access:http://hdl.handle.net/20.500.11937/23999

Internet

http://hdl.handle.net/20.500.11937/23999

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