Book graphs are cycle antimagic

Book graphs are cycle antimagic

Let \(G=(V,E)\) be a finite simple graph with \(v =|V(G)|\) vertices and \(e=|E(G)|\) edges. Further suppose that \(\mathbb{H}:=\{H_1, H_2, \dots, H_t\}\) is a family of subgraphs of \(G\). In case, each edge of \(E(G)\) belongs to at least one of the subgraphs \(H_i\) from the family \(\mathbb{H}\)...

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Bibliographic Details
Main Authors: Muhammad Awais Umar, Noshad Ali, Afshan Tabassum, Basharat Rehman Ali
Format: Article
Language:English
Published: Ptolemy Scientific Research Press 2019-06-01
Series:Open Journal of Mathematical Sciences
Subjects:
book graph \(b_n\)
super \((a
Online Access:https://pisrt.org/psr-press/journals/oms-vol-3-2019/book-graphs-are-cycle-antimagic/

Internet

https://pisrt.org/psr-press/journals/oms-vol-3-2019/book-graphs-are-cycle-antimagic/

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