Alimon, N. I. and Sarmin, N. H. and Erfanian, A. (2020) The topological indices of the noncommuting graph for symmetric groups. ASM Science Journal, 13 . ISSN 18236782

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Official URL: https://dx.doi.org/10.32802/asmscj.2020.sm26(1.28)
Abstract
Topological indices are the numerical values that can be calculated from a graph and it is calculated based on the molecular graph of a chemical compound. It is often used in chemistry to analyse the physical properties of the molecule which can be represented as a graph with a set of vertices and edges. Meanwhile, the noncommuting graph is the graph of vertex set whose vertices are noncentral elements and two distinct vertices are joined by an edge if they do not commute. The symmetric group, denoted as, is a set of all permutation under composition. In this paper, two of the topological indices, namely the Wiener index and the Zagreb index of the noncommuting graph for symmetric groups of order 6 and 24 are determined.
Item Type:  Article 

Uncontrolled Keywords:  symmetric groups, wiener index, zagreb index 
Subjects:  Q Science > QA Mathematics 
Divisions:  Science 
ID Code:  86579 
Deposited By:  Narimah Nawil 
Deposited On:  30 Sep 2020 08:43 
Last Modified:  30 Sep 2020 08:43 
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