Litcius/Paper detail

Topological Properties of Para-Line Graph of Some Convex Polytopes Using Neighborhood M-Polynomial

Sourav Mondal, Nilanjan De, Muhammad Kamran Siddiqui, Anita Pal, H Wiener, S Hosamani, M Ghorbani, M Hosseinzadeh, V Kulli, V Kulli, S Mondal, N De, A Pal, I Gutman, V Alamian, A Bahrami, B Edalatzadeh, Pi, M Farahani, A Ashrafi, B Manoochehrian, H Azari, Z Shao, M Siddiqui, M Muhammad, E Deutsch, S Klavzar, Y Kwun, M Munir, W Nazeer, S Rafque, S Kang, S Mondal, N De, A Pal, S Mondal, M Siddiqui, N De, A Pal, P Ranjini, V Lokesha, M Ranjan, I Gutman, E Estrada, F Asif, Z Zahid, S Zafar, M Farahani, W Gao, Z Foruzanfar, F Asif, Z Zahid, S Zafar, M Farahani, M Baca, M Baca, J Liu, J Zhao, H He, Z Shao, S Mondal, N De, A Pal, J Liu, J Zhao, J Min, J Cao, S Mondal, N De, A Pal, S Mondal, N De, A Pal, J Liu, J Zhao, Z Cai

2020Biointerface Research in Applied Chemistry21 citationsDOIOpen Access PDF

Abstract

The neighborhood M-polynomial is effective in recovering neighborhood degree sum based topological indices that predict different physicochemical properties and biological activities of molecular structures. Topological indices can transform the information found in molecular graphs and networks into numerical characteristics and thus make a major contribution to the study of structure-property and structure-activity relationships. In this work, the neighborhood M-polynomial of the para-line graph of some convex polytopes is obtained. From the neighborhood M-polynomial, some neighborhood degree-based topological indices are recovered. Applications of the work are described. In addition, a quantitative and graphical comparison is made.

Topics & Concepts

PolytopeCombinatoricsPolynomialMathematicsRegular polygonGraphDegree (music)Topological indexLine (geometry)Discrete mathematicsTopology (electrical circuits)GeometryMathematical analysisPhysicsAcousticsComputational Drug Discovery MethodsGraph theory and applicationsFree Radicals and Antioxidants