On Weak Subdifferentials, Directional Derivatives, and Radial Epiderivatives for Nonconvex Functions

Kasimbeyli̇, Refail; Mammadov, Musa

On Weak Subdifferentials, Directional Derivatives, and Radial Epiderivatives for Nonconvex Functions

dc.contributor.author	Kasimbeyli̇, Refail
dc.contributor.author	Mammadov, Musa
dc.date.accessioned	2023-06-16T14:31:27Z
dc.date.available	2023-06-16T14:31:27Z
dc.date.issued	2009
dc.description.abstract	In this paper we study relations between the directional derivatives, the weak subdifferentials, and the radial epiderivatives for nonconvex real-valued functions. We generalize the well-known theorem that represents the directional derivative of a convex function as a pointwise maximum of its subgradients for the nonconvex case. Using the notion of the weak subgradient, we establish conditions that guarantee equality of the directional derivative to the pointwise supremum of weak subgradients of a nonconvex real-valued function. A similar representation is also established for the radial epiderivative of a nonconvex function. Finally the equality between the directional derivatives and the radial epiderivatives for a nonconvex function is proved. An analogue of the well-known theorem on necessary and sufficient conditions for optimality is drawn without any convexity assumptions.	en_US
dc.description.sponsorship	Australian Research Council Discovery [DP0556685]; Izmir University of Economics, Turkey; Australian Research Council [DP0556685] Funding Source: Australian Research Council	en_US
dc.description.sponsorship	The authors acknowledge support by the Australian Research Council Discovery grant DP0556685 and Izmir University of Economics, Turkey.	en_US
dc.identifier.doi	10.1137/080738106
dc.identifier.issn	1052-6234
dc.identifier.issn	1095-7189
dc.identifier.scopus	2-s2.0-70450216940
dc.identifier.uri	https://doi.org/10.1137/080738106
dc.identifier.uri	https://hdl.handle.net/20.500.14365/2111
dc.language.iso	en	en_US
dc.publisher	Siam Publications	en_US
dc.relation.ispartof	Sıam Journal on Optımızatıon	en_US
dc.rights	info:eu-repo/semantics/openAccess	en_US
dc.subject	weak subdifferential	en_US
dc.subject	radial epiderivative	en_US
dc.subject	directional derivative	en_US
dc.subject	nonconvex analysis	en_US
dc.subject	optimality condition	en_US
dc.subject	Set-Valued Optimization	en_US
dc.title	On Weak Subdifferentials, Directional Derivatives, and Radial Epiderivatives for Nonconvex Functions	en_US
dc.type	Article	en_US
dspace.entity.type	Publication
gdc.author.id	Kasimbeyli OR Gasimov, Refail OR Rafail/0000-0002-7339-9409
gdc.author.id	Mammadov, Musa/0000-0002-2600-3379
gdc.author.scopusid	35146065000
gdc.author.scopusid	15127216400
gdc.author.wosid	Kasimbeyli OR Gasimov, Refail OR Rafail/AAA-4049-2020
gdc.bip.impulseclass	C4
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gdc.coar.access	open access
gdc.coar.type	text::journal::journal article
gdc.collaboration.industrial	false
gdc.description.department	İzmir Ekonomi Üniversitesi	en_US
gdc.description.departmenttemp	[Kasimbeyli, Refail] Izmir Univ Econ, Fac Comp Sci, Dept Ind Syst Engn, TR-35330 Izmir, Turkey; [Mammadov, Musa] Univ Ballarat, Ctr Informat & Appl Optimizat, Sch Informat Technol & Math Sci, Ballarat, Vic 3353, Australia	en_US
gdc.description.endpage	855	en_US
gdc.description.issue	2	en_US
gdc.description.publicationcategory	Makale - Uluslararası Hakemli Dergi - Kurum Öğretim Elemanı	en_US
gdc.description.scopusquality	Q2
gdc.description.startpage	841	en_US
gdc.description.volume	20	en_US
gdc.description.wosquality	Q1
gdc.identifier.openalex	W2037162925
gdc.identifier.wos	WOS:000268859300013
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gdc.oaire.sciencefields	0211 other engineering and technologies
gdc.oaire.sciencefields	02 engineering and technology
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gdc.openalex.toppercent	TOP 10%
gdc.opencitations.count	32
gdc.plumx.crossrefcites	17
gdc.plumx.mendeley	6
gdc.plumx.scopuscites	49
gdc.scopus.citedcount	49
gdc.virtual.author	Kasimbeyli̇, Refail
gdc.wos.citedcount	44
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