The Power Graph of a Dihedral Group

Authors

  • Evi Yunartika Asmarani Universitas Mataram
  • Abdul Gazir Syarifudin Universitas Mataram
  • I Gede Adhitya Wisnu Wardhana Universitas Mataram
  • Ni Wayan Switrayni Universitas Mataram

DOI:

https://doi.org/10.29303/emj.v4i2.117

Abstract

Graph theory is one of the topics in mathematics that is quite interesting to study because it is applicable and can be combined with other mathematical topics such as group theory. The combination of graph theory and group theory is that graphs can be used to represent a group. An example of a graph is a power graph. A power graph of the group  is defined as a graph whose vertex set is all elements of  and two distinct vertices  and  are connected if and only if  or for a positive integer x and y. In this study, the author discusses the power graph of the dihedral group  The results obtained from this study are the power graph of the dihedral group  where  with  prime numbers and an  natural number is a graph consisting of two non-disjoint subgraphs, namely complete subgraphs and star subgraphs. And we find that its radius and diameter are 1 and 2.

References

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Published

2022-01-12

How to Cite

Asmarani, E. Y., Syarifudin, A. G., Wardhana, I. G. A. W., & Switrayni, N. W. (2022). The Power Graph of a Dihedral Group. EIGEN MATHEMATICS JOURNAL, 4(2), 80–85. https://doi.org/10.29303/emj.v4i2.117

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