Litcius/Paper detail

M-polynomials and degree-based topological indices of tadpole graph

Faryal Chaudhry, Mohamad Nazri Husin, Farkhanda Afzal, Deeba Afzal, Muhammad Ehsan, Murat Cancan, Mohammad Reza Farahani

2021Journal of Discrete Mathematical Sciences and Cryptography34 citationsDOI

Abstract

Chemical graph theory is a branch of mathematical chemistry which has an important outcome on the development of the chemical sciences. A chemical graph is a graph which is produced from some molecular structure by applying some graphical operations. The demonstration of chemical compounds and chemical networks with M-polynomials is a new idea and the M-polynomial of different molecular structures supports us to calculate many topological indices.A topological index is a numeric quantity that describes the whole structure of a molecular graph of the chemical compound and supports to understand its physical features, chemical reactivates and boiling activities. In this paper, we compute M-polynomial and topological indices of tadpole graph, then we recover numerous topological indices using the M-polynomial.

Topics & Concepts

Topological indexMolecular graphMathematicsGraphDegree (music)PolynomialDiscrete mathematicsCombinatoricsTopology (electrical circuits)PhysicsAcousticsMathematical analysisGraph theory and applicationsComputational Drug Discovery MethodsFree Radicals and Antioxidants