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Super H-Antimagic Total Covering for Generalized Antiprism and Toroidal Octagonal Map

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Listed:
  • Amir Taimur
  • Gohar Ali
  • Muhammad Numan
  • Adnan Aslam
  • Kraidi Anoh Yannick
  • Ali Ahmad

Abstract

Let G be a graph and H⊆G be subgraph of G. The graph G is said to be a,d-H antimagic total graph if there exists a bijective function f:VH∪EH⟶1,2,3,…,VH+EH such that, for all subgraphs isomorphic to H, the total H weights WH=WH=∑x∈VHfx+∑y∈EHfy forms an arithmetic sequence a,a+d,a+2d,…,a+n−1d, where a and d are positive integers and n is the number of subgraphs isomorphic to H. An a,d-H antimagic total labeling f is said to be super if the vertex labels are from the set 1,2,…,|VG. In this paper, we discuss super a,d-C3-antimagic total labeling for generalized antiprism and a super a,d-C8-antimagic total labeling for toroidal octagonal map.

Suggested Citation

  • Amir Taimur & Gohar Ali & Muhammad Numan & Adnan Aslam & Kraidi Anoh Yannick & Ali Ahmad, 2021. "Super H-Antimagic Total Covering for Generalized Antiprism and Toroidal Octagonal Map," Journal of Mathematics, Hindawi, vol. 2021, pages 1-8, August.
    • Handle: RePEc:hin:jjmath:9680137
    DOI: 10.1155/2021/9680137
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