Please use this identifier to cite or link to this item: https://ir.swu.ac.th/jspui/handle/123456789/12837
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dc.contributor.authorKhemmani V.
dc.contributor.authorIsariyapalakul S.
dc.date.accessioned2021-04-05T03:21:40Z-
dc.date.available2021-04-05T03:21:40Z-
dc.date.issued2018
dc.identifier.issn1611712
dc.identifier.other2-s2.0-85051730508
dc.identifier.urihttps://ir.swu.ac.th/jspui/handle/123456789/12837-
dc.identifier.urihttps://www.scopus.com/inward/record.uri?eid=2-s2.0-85051730508&doi=10.1155%2f2018%2f8978193&partnerID=40&md5=f66eac5107b99929293f4de103333c26
dc.description.abstractFor a set W = w 1, w 2,., wk of vertices and a vertex v of a connected graph G, the multirepresentation of v with respect to W is the k-multiset m r (v | W) = d v, w 1, d v, w2,., d v, wk, where d (v, wi) is the distance between the vertices v and w i for i = 1,2,., k. The set W is a multiresolving set of G if every two distinct vertices of G have distinct multirepresentations with respect to W. The minimum cardinality of a multiresolving set of G is the multidimension dim m (G) of G. It is shown that, for every pair k, n of integers with k ≥ 3 and n ≥ 3 (k-1), there is a connected graph G of order n with d i m M (G) = k. For a multiset { a1, a2,., a k } and an integer c, we define { a1 a2,., ak } + c, c,., c = a1 + c, a2 + c,., a k + c. A multisimilar equivalence relation R W on V (G) with respect to W is defined by u R W v if mr(uW) = mrv W + cw u, v, cw u, v,., c wu, v for some integer cw (u, v). We study the relationship between the elements in multirepresentations of vertices that belong to the same multisimilar equivalence class and also establish the upper bound for the cardinality of a multisimilar equivalence class. Moreover, a multiresolving set with prescribed multisimilar equivalence classes is presented. © 2018 Varanoot Khemmani and Supachoke Isariyapalakul.
dc.titleThe Multiresolving Sets of Graphs with Prescribed Multisimilar Equivalence Classes
dc.typeArticle
dc.rights.holderScopus
dc.identifier.bibliograpycitationInternational Journal of Mathematics and Mathematical Sciences. Vol 2018, (2018)
dc.identifier.doi10.1155/2018/8978193
Appears in Collections:Scopus 1983-2021

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