On Local Antimagic Chromatic Number of Cycle-Related Join Graphs
An edge labeling of a connected graph G = (V, E) is said to be local antimagic if it is a bijection f: E → {1, |E|} such that for any pair of adjacent vertices x and y, f+(x) f+(y), where the induced vertex label f+(x) = ςf(e), with e ranging over all the edges incident to x. The local antimagic chr...
出版年: | Discussiones Mathematicae - Graph Theory |
---|---|
第一著者: | Lau G.-C.; Shiu W.-C.; Ng H.-K. |
フォーマット: | 論文 |
言語: | English |
出版事項: |
Sciendo
2021
|
オンライン・アクセス: | https://www.scopus.com/inward/record.uri?eid=2-s2.0-85099496674&doi=10.7151%2fdmgt.2177&partnerID=40&md5=7aaceeb0147172d378244367b2b787e8 |
類似資料
-
On local antimagic chromatic number of cycle-related join graphs II
著者:: Lau G.-C.; Premalatha K.; Arumugam S.; Shiu W.C.
出版事項: (2024) -
On local antimagic chromatic numbers of circulant graphs join with null graphs or cycles
著者:: Lau G.C.; Premalatha K.; Shiu W.C.; Nalliah M.
出版事項: (2023) -
On join product and local antimagic chromatic number of regular graphs
著者:: Lau G.-C., 等
出版事項: (2023) -
Complete solutions on local antimagic chromatic number of three families of disconnected graphs
著者:: Chan, 等
出版事項: (2024) -
On friendly index sets of the edge-gluing of complete graph and cycles
著者:: Lau G.-C.; Gao Z.-B.; Lee S.-M.; Sun G.-Y.
出版事項: (2016)