Please use this identifier to cite or link to this item: http://hdl.handle.net/10603/9188
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dc.coverage.spatialMathematicsen_US
dc.date.accessioned2013-05-27T09:45:37Z-
dc.date.available2013-05-27T09:45:37Z-
dc.date.issued2013-05-27-
dc.identifier.urihttp://hdl.handle.net/10603/9188-
dc.description.abstractThe main objective of the thesis is to study optimality conditions and duality results for vector optimization problems. The thesis is divided into four chapters, which are further subdivided into sections. Chapter I is introductory and aims to provide a necessary background by presenting briefly various fundamental concepts related to optimization problems. This chapter concludes with a brief summary of the work presented in the thesis. Chapter 2 talks about some generalizations of cone convex functions and proves optimality conditions and duality results for vector optimization problems. This chapter is divided into four sections. Section 2.1 introduces the concept of cone semistrictly convex functions on topological vector spaces. Some properties and interrelations of cone convex and cone semistrictly convex functions are studied. Section 2.2 derives sufficient optimality conditions for a vector valued minimization problem over topological vector spaces, involving Gâteaux derivatives. A Mond-Weir type dual is associated with the primal problem and weak and strong duality results are established. Section 2.3 introduces cone semilocally preinvex and related functions. Necessary and sufficient optimality conditions and duality results are established for a vector optimization problem with equality and inequality constraints over cones. Section 2.4 focuses on nonsmooth vector optimization. In this section generalized type-I, generalized quasi type-I, generalized pseudo type-I, generalized quasi pseudo type-I and generalized pseudo quasi type-I functions over cones are introduced, for a nonsmooth vector optimization problem. Various optimality and duality results are proved under cone generalized type-I assumptions, using Clarke s generalized gradients of locally Lipschitz functions. Chapter 3 studies second order symmetric duality in vector optimization and is divided into two sections. Section 3.1 aspires to examine pairs of second order Wolfe type and Mond-Weir type symmetric duals.en_US
dc.format.extent194p.en_US
dc.languageEnglishen_US
dc.relation-en_US
dc.rightsuniversityen_US
dc.titleSome aspects of optimality and duality in vector optimizationen_US
dc.title.alternative-en_US
dc.creator.researcherMeetu Bhatiaen_US
dc.subject.keywordMathematicsen_US
dc.description.noteReferences p.175 194en_US
dc.contributor.guideSurjeet Kaur Sunejaen_US
dc.publisher.placeNew Delhien_US
dc.publisher.universityUniversity of Delhien_US
dc.publisher.institutionDepartment of Mathematicsen_US
dc.date.registeredn.d.en_US
dc.date.completed2012en_US
dc.date.awardedn.d.en_US
dc.format.dimensions-en_US
dc.format.accompanyingmaterialNoneen_US
dc.type.degreePh.D.en_US
dc.source.inflibnetINFLIBNETen_US
Appears in Departments:Department of Mathematics

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01_title.pdfAttached File7.56 kBAdobe PDFView/Open
02_declaration.pdf64.06 kBAdobe PDFView/Open
03_acknowledgement.pdf89.53 kBAdobe PDFView/Open
04_preface.pdf97.9 kBAdobe PDFView/Open
05_contents.pdf90.23 kBAdobe PDFView/Open
06_chapter 1.pdf318.82 kBAdobe PDFView/Open
07_chapter 2.pdf385.78 kBAdobe PDFView/Open
08_chapter 3.pdf258.43 kBAdobe PDFView/Open
09_chapter 4.pdf264.92 kBAdobe PDFView/Open
10_references.pdf151.72 kBAdobe PDFView/Open
11_abstract.pdf118.95 kBAdobe PDFView/Open


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