SOME COMPUTATIONAL ASPECTS OF N-PYRENE USING CERTAIN DEGREE BASED TOPOLOGICAL INDICES AND THEIR M POLYNOMIALS
Keywords:
Graph Invariant, Topological indices, Invariant polynomials, n-pyrene, Subdivision graph, Semi-total point graph.Abstract
In this article, we first summarized the graph invariants and derive the M-polynomial of n pyrene. Here, we focus on the structure of pyrene polycyclic aromatic hydrocarbons PAH2 and we draft some general expression for discrete invariant polynomials and some connectivity indices like Randic index, Zagreb indices.
References
A. R. Bindusree, V. Lokesha and P. S. Ranjini, ABC index on subdivision graphs and line graphs, IOSR Journal of Mathematics, (2016), 01-06.
D. Amic, D. Beslo, B. Lucic, S. Nikolic and N. Trinajstic, The vertex connectivity index revisited, J. Chem. Inf. Comput. Sci., 38 (1998), 819-822.
B. Bollobas and P. Erdos, Graphs of extremal weights, Ars Combin., 50 (1998), 225 233.
Downloads
Published
2024-10-12
How to Cite
B. MANOHAR, B. B. NAVEENA, M. MANJUNATHA. (2024). SOME COMPUTATIONAL ASPECTS OF N-PYRENE USING CERTAIN DEGREE BASED TOPOLOGICAL INDICES AND THEIR M POLYNOMIALS. Journal of Computational Analysis and Applications (JoCAAA), 33(08), 1655–1663. Retrieved from https://eudoxuspress.com/index.php/pub/article/view/1777
Issue
Section
Articles
