On the(d)–chromatic number of a complete balanced multipartite graph

dc.contributor.authorBurger, A. P.en_ZA
dc.contributor.authorNieuwoudt, I.en_ZA
dc.contributor.authorVan Vuuren, J. H.en_ZA
dc.date.accessioned2012-07-11T06:55:30Z
dc.date.available2012-07-11T06:55:30Z
dc.date.issued2007
dc.descriptionCITATION: Burger, A. P., Nieuwoudt, I. & Van Vuuren, J.H. 2007. On the(d)–chromatic number of a complete balanced multipartite graph. ORiON, 23(1):29-49, doi:10.5784/23-1-45.en_ZA
dc.descriptionThe original publication is available at http://orion.journals.ac.zaen_ZA
dc.description.abstractIn this paper we solve (approximately) the problem of finding the minimum number of colours with which the vertices of a complete, balanced, multipartite graph G may be coloured such that the maximum degrees of all colour class induced subgraphs are at most some specified integer d 2 N. The minimum number of colours in such a colouring is referred to as the (d)–chromatic number of G. The problem of finding the (d)–chromatic number of a complete, balanced, multipartite graph has its roots in an open graph theoretic characterisation problem and has applications conforming to the generic scenario where users of a system are in conflict if they require access to some shared resource. These conflicts are represented by edges in a so–called resource access graph, where vertices represent the users. An efficient resource access schedule is an assignment of the users to a minimum number of groups (modelled by means of colour classes) where some threshold d of conflict may be tolerated in each group. If different colours are associated with different time periods in the schedule, then the minimum number of groupings in an optimal resource access schedule for the above set of users is given by the (d)–chromatic number of the resource access graph. A complete balanced multipartite resource access graph represents a situation of maximum conflict between members of different user groups of the system, but where no conflict occurs between members of the same user group (perhaps due to an allocation of diverse duties to the group members).en_ZA
dc.description.urihttp://orion.journals.ac.za/pub/article/view/45
dc.description.versionPublisher's versionen_ZA
dc.format.extent22 pages : illustrationsen_ZA
dc.identifier.citationBurger, A. P., Nieuwoudt, I. & Van Vuuren, J.H. 2007. On the(d)–chromatic number of a complete balanced multipartite graph. ORiON, 23(1):29-49, doi:10.5784/23-1-45en_ZA
dc.identifier.issn2224-0004 (online)
dc.identifier.issn0259-191X (print)
dc.identifier.otherdoi:10.5784/23-1-45
dc.identifier.urihttp://hdl.handle.net/10019.1/21660
dc.language.isoen_ZAen_ZA
dc.publisherOperations Research Society of South Africaen_ZA
dc.rights.holderAuthors retain copyrighten_ZA
dc.subjectGraphs -- Maximum degreeen_ZA
dc.subjectGraph colouringen_ZA
dc.subjectGraph theoryen_ZA
dc.titleOn the(d)–chromatic number of a complete balanced multipartite graphen_ZA
dc.typeArticleen_ZA
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