Open AccessM-polynomial and topological indices of some transformed networks
Author(s) -
Fei Yu,
Hifza Iqbal,
Sadaf Munir,
JiaBao Liu
Publication year - 2021
Publication title -
aims mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.329
H-Index - 15
ISSN - 2473-6988
DOI - 10.3934/math.2021804
Subject(s) - topological index , mathematics , zigzag , index (typography) , invariant (physics) , polynomial , bounded function , discrete mathematics , reciprocal , topology (electrical circuits) , combinatorics , computer science , geometry , mathematical analysis , linguistics , philosophy , world wide web , mathematical physics
In the chemical industry, topological indices play an important role in defining the properties of chemical compounds. They are numerical parameters and structure invariant. It is a proven fact by scientists that topological properties are influential tools for interconnection networks. In this paper, we will use stellation, medial and bounded dual operations to build transformed networks from zigzag and triangular benzenoid structures. Using M-polynomial, we compute the first and second Zagreb indices, second modified Zagreb indices, symmetric division index, general Randic index, reciprocal general Randic index. We also calculate atomic bond connectivity index, geometric arithmetic index, harmonic index, first and second Gourava indices, first and second hyper Gourava indices.