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Complexity of Monad graphs generated by the function f(g) = g5

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Title: Complexity of Monad graphs generated by the function f(g) = g5

Authors: Hayder B . Shelash, Hayder R. Hashim, Ali A. Shukur

Journal: Journal of Prime Research in Mathematics

HEC Recognition History
Category From To
Y 2023-07-01 2024-09-30
Y 2022-07-01 2023-06-30
Y 2021-07-01 2022-06-30
Y 2020-07-01 2021-06-30

Publisher: Abdus Salam School of Mathematical Sciences, GC University

Country: Pakistan

Year: 2024

Volume: 20

Issue: 2

Language: English

Keywords: Monad graphscyclic groupfifth power function

Categories
Graph Theory (455) Complexity Theory (7) Monad Graphs (1) Cyclic Groups (1) Discrete Mathematics (278)

Abstract

A Monad graph is a graph Γ in which each of its vertices belongs to a finite group G and connects with its image under the action of a linear map f. This kind of graph was introduced by V. Arnold in 2003. In this paper, we compute the Monad graphs in which G is isomorphic to a cyclic group Cn of order n and f the fifth power function, i.e. f(g) = g5. Furthermore, some algebraic and dynamical properties of the studied Monad graphs are obtained. The proofs of our results are based on various tools and results with regard to the fields of number theory, algebra and graph theory.

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