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ชื่อเรื่อง: | The Multibases of Symmetric Caterpillars |
ผู้แต่ง: | Isariyapalakul S. Khemmani V. Pho-On W. |
วันที่เผยแพร่: | 2020 |
บทคัดย่อ: | For a set W=w1,w2,.,wk of vertices and a vertex v of a connected graph G, the k-multiset mrvW=dv,w1,dv,w2,.,dv,wk, where dv,wi is the distance from v to wi for i=1,2,.,k, and is the multirepresentation of v with respect to W. The set W is a multiresolving set of G if the multirepresentations of every two distinct vertices of G with respect to W are distinct. The multiresolving set of G having the minimum cardinality is called a multibasis of G. The cardinality of a multibasis of G is the multidimensiondimMG of G. A caterpillar cak1,k2,.,ks is called a symmetric caterpillar if ki=ks-i+1 for all integers i with 1≤i≤s. In this work, the multiresolving sets of symmetric caterpillars are studied. © 2020 Supachoke Isariyapalakul et al. |
URI: | https://ir.swu.ac.th/jspui/handle/123456789/12031 https://www.scopus.com/inward/record.uri?eid=2-s2.0-85087937738&doi=10.1155%2f2020%2f5210628&partnerID=40&md5=593d5c0a8c8aedeb68210a18555488db |
ISSN: | 23144629 |
Appears in Collections: | Scopus 1983-2021 |
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