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dc.contributor.authorMARDIYA, Regita Triani
dc.contributor.authorKRISTIANA, Arika Indah
dc.contributor.authorDAFIK, Dafik
dc.date.accessioned2020-06-25T04:53:12Z
dc.date.available2020-06-25T04:53:12Z
dc.date.issued2020-01-09
dc.identifier.urihttp://repository.unej.ac.id/handle/123456789/99375
dc.description.abstractAll graph in this paper are members of family of graph tree. Let G is a connected graph, for an ordered set W={w1,w2,...,wk} of vertices and a vertex which is not element of W, then W is dominating set of graph G when the vertices that are not listed at W are vertices which are adjacent with W. The minimum cardinality of dominating set of graph G is called dominating numbers denoted  G  . If W and a vertex on graph G are connected each other, the metric representation of v which is element of W is the k-vector r(v|W)=(d(v,w1), d(v,w2),..., d(v,wk)), where d(x,y) represents distance between x and y. Then, W is resolving dominating set of graph G if the distance of all vertices is different respect to W. The minimum cardinality of resolving dominating set is called resolving domination numbers denoted (G ) r . In this paper we found the exact values of resolving dominating for firecracker graph, caterpillar graph and banana tree graph.en_US
dc.language.isoenen_US
dc.publisherInternational Journal of Academic and Applied Research (IJAAR), Vol. 4 Issue 1, January – 2020, Pages: 27-30en_US
dc.subjectResolving Numbersen_US
dc.subjectDomination Numbersen_US
dc.subjectResolving Domination Numbersen_US
dc.subjectFamily of Tree Graphen_US
dc.titleResolving Domination Numbers of Family of Tree Graphen_US
dc.typeArticleen_US
dc.identifier.kodeprodiKODEPRODI0210101#Pendidikan Matematika
dc.identifier.nidnNIDN0001016827
dc.identifier.nidnNIDN0002057606


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