Optimality Conditions in Nonconvex Optimization Via Weak Subdifferentials
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Date
2011
Authors
Kasimbeyli, R.
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Publisher
Pergamon-Elsevier Science Ltd
Open Access Color
Green Open Access
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Abstract
In this paper we study optimality conditions for optimization problems described by a special class of directionally differentiable functions. The well-known necessary and sufficient optimality condition of nonsmooth convex optimization, given in the form of variational inequality, is generalized to the nonconvex case by using the notion of weak subdifferentials. The equivalent formulation of this condition in terms of weak subdifferentials and augmented normal cones is also presented. (C) 2010 Elsevier Ltd. All rights reserved.
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Keywords
Weak subdifferential, Directional derivative, Nonconvex analysis, Optimality condition, Variational inequalities, Augmented normal cone, Radial Epiderivatives, Calculus, Nonlinear programming, nonconvex analysis, Optimality conditions and duality in mathematical programming, Nonconvex programming, global optimization, directional derivative, augmented normal cone, variational inequalities
Fields of Science
0211 other engineering and technologies, 02 engineering and technology, 0101 mathematics, 01 natural sciences
Citation
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Q2
OpenCitations Citation Count
22
Source
Nonlınear Analysıs-Theory Methods & Applıcatıons
Volume
74
Issue
7
Start Page
2534
End Page
2547
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CrossRef : 10
Scopus : 34
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34
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2
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