Comparative Study of Planar Octahedron Molecular Structure via Eccentric Invariants

A branch of graph theory that makes use of a molecular graph is called chemical graph theory. Chemical graph theory is used to depict a chemical molecule. A graph is connected if there is an edge between every pair of vertices. A topological index is a numerical value related to the chemical structu...

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Bibliographic Details
Published in:Molecules (Basel, Switzerland) Switzerland), 2023-01, Vol.28 (2), p.556
Main Authors: Chu, Zheng-Qing, Ali, Haidar, Ali, Didar Abdulkhaleq, Nadeem, Muhammad, Kirmani, Syed Ajaz K, Ali, Parvez
Format: Article
Language:English
Subjects:
Apexes
atom bond connectivity eccentricity ABC5(G)
average eccentricity avec(G)
Biological activity
Chemical reactions
Chemistry
Comparative studies
Eccentricity
eccentricity ξ(p)
geometric arithmetic eccentricity GA4(G)
Graph theory
Molecular structure
Topology
total eccentricity ϑ(G)
Zagreb eccentricity index ℵ(G)
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Summary:A branch of graph theory that makes use of a molecular graph is called chemical graph theory. Chemical graph theory is used to depict a chemical molecule. A graph is connected if there is an edge between every pair of vertices. A topological index is a numerical value related to the chemical structure that claims to show a relationship between chemical structure and various physicochemical attributes, chemical reactivity, or, you could say, biological activity. In this article, we examined the topological properties of a planar octahedron network of dimensions and computed the total eccentricity, average eccentricity, Zagreb eccentricity, geometric arithmetic eccentricity, and atom bond connectivity eccentricity indices, which are used to determine the distance between the vertices of a planar octahedron network.
ISSN:1420-3049
1420-3049
DOI:10.3390/molecules28020556