Please use this identifier to cite or link to this item: http://hdl.handle.net/10603/592637
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dc.coverage.spatial
dc.date.accessioned2024-09-30T06:27:22Z-
dc.date.available2024-09-30T06:27:22Z-
dc.identifier.urihttp://hdl.handle.net/10603/592637-
dc.description.abstractGraph theory has moved on with immense pace and has reached new newlineheights in the previous decade by taking contributions from weighted newlinegraphs, which plays a signiand#57346;cant role in various and#57346;elds like interconnection newlinenetworks, information theory, database theory, etc. Connectivity has laid the newlinefoundation for many of these applications of weighted graphs. Domination newlinealso has played its part in converting graph theory into a mainstream subject newlineof applied mathematics. Some related applications also depend upon the newlinedeand#57346;nitions of spanning trees, strong edges, strong cycles and paths, etc. newlineWhen we consider a weighted graph network, the weak edges in it do not newlinecontribute much to the dynamics of network, and hence they can be ignored newlinein most of the situations. We are trying to study diand#57345;erent connectivity and newlineadjacency properties in weighted graph structures with the help of strong newlineedges. Several authors including J.A.Bondy, Genghua Fan, Sunil Mathew newlineand M S Sunitha had put forward various connectivity concepts in weighted newlinegraphs inspired from the spark given by Dirac and Grotschel. newlineIn graphs, a k-container between two vertices is a set of k internally disjoint newlinepaths between them. The connectivity of a graph is related to the number of newlinevertices whose removal leaves the remaining graph disconnected or trivial. newline
dc.format.extent
dc.languageEnglish
dc.relation
dc.rightsuniversity
dc.titleConnectivity and domination in weighted graph structures
dc.title.alternative
dc.creator.researcherNair, Darshan Lal M
dc.subject.keywordGraph theory
dc.subject.keywordMathematics
dc.subject.keywordMathematics Applied
dc.subject.keywordPhysical Sciences
dc.description.note
dc.contributor.guideMathew, Sunil
dc.publisher.placeCalicut
dc.publisher.universityNational Institute of Technology Calicut
dc.publisher.institutionDepartment of Mathematics
dc.date.registered2011
dc.date.completed2019
dc.date.awarded2019
dc.format.dimensions
dc.format.accompanyingmaterialDVD
dc.source.universityUniversity
dc.type.degreePh.D.
Appears in Departments:Department of Mathematics

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01_title.pdfAttached File21.92 kBAdobe PDFView/Open
02_prelim pages.pdf72.51 kBAdobe PDFView/Open
03_content.pdf19.51 kBAdobe PDFView/Open
04_abstract.pdf19.92 kBAdobe PDFView/Open
05_chapter 1.pdf728.13 kBAdobe PDFView/Open
06_chapter 2.pdf157.18 kBAdobe PDFView/Open
07_chapter 3.pdf398.9 kBAdobe PDFView/Open
08_chapter 4.pdf488.99 kBAdobe PDFView/Open
09_chapter 5.pdf616.02 kBAdobe PDFView/Open
10_chapter 6.pdf677.26 kBAdobe PDFView/Open
11_annexures.pdf269.7 kBAdobe PDFView/Open
80_recommendation.pdf41.21 kBAdobe PDFView/Open


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