Browsing by Author "Ehsan, Muhammad"
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Article Calculating the Topological Indices of Starphene Graph Via M-Polynomial Approach(Sami Publishing Co-spc, 2021) Chaudhry, Faryal; Sattar, Sumera; Ehsan, Muhammad; Afzal, Farkhanda; Farahani, Mohammad Reza; Cancan, MuratChemical graph theory is related to the structure of different chemical compounds. A chemical graph represents the molecule of the substance. Chemical graph theory provides the connection between the real number and the different physical, chemical, and biological properties of the chemical species. By implementing the mathematical tools, a chemical graph is converted into a real number. This number can have the predicating ability about the properties of the molecule. In this article, we find some topological indices via M-polynomial for the Starphene graph.Article Computing M-Polynomial and Topological Indices of Tuhrc4 Molecular Graph(Sami Publishing Co-spc, 2021) Chaudhry, Faryal; Ehsan, Muhammad; Afzal, Farkhanda; Farahani, Mohammad Reza; Cancan, Murat; Ciftci, IdrisChemical graph theory has an important role in the development of chemical sciences. A graph is produced from certain molecular structure by means of applying several graphical operations. The local graph parameter is valency, which is defined for every vertex as the number associates with other vertices in a graph, for example an atom in a molecule. The demonstration of chemical networks and chemical compounds with the help of M-polynomials is a novel idea. The M-polynomial of different molecular structures help to compute several topological indices. A topological index is a numeric quantity that describes the whole structure of a molecular graph of the chemical compound and clarifies its physical features, chemical reactivates and boiling activities. In this paper we computed M-Polynomial and topological indices of TUHRC4 Graph, then we recovered numerous topological indices using the M-polynomials.Article Degree Based Topological Indices of Tadpole Graph Via M-Polynomial(Sami Publishing Co-spc, 2021) Chaudhry, Faryal; Ehsan, Muhammad; Afzal, Farkhanda; Farahani, Mohammad Reza; Cancan, Murat; Ciftci, IdrisChemical graph theory has an important impact on the development of the chemical sciences. A chemical graph is a graph that is produced from some molecular structure by applying some graphical operations. The demonstration of chemical compounds and chemical networks with the M-polynomials is a revolution and the M-polynomial of different molecular structures contributes to evaluating many topological indices. In this paper we worked out M-Polynomial and topological indices of the tadpole graph, then we recovered numerous topological indices using the M-polynomials.Article On Computation of M-Polynomial and Topological Indices of Starphene Graph(Taru Publications, 2021) Chaudhry, Faryal; Ehsan, Muhammad; Afzal, Deeba; Farahani, Mohammad Reza; Cancan, Murat; Ediz, SuleymanChemical graph theory is a sub field of mathematical chemistry that is very beneficial in the progress of the computational analysis of the chemical compounds. A chemical graph is the outcome of the molecular structure by applying some graph The demonstration of chemical compounds with the M-polynomials is a developing idea and the M-polynomial of different molecular structures supports us to calculate many topological indices. In this paper we calculate M-polynomial and topological indices for the starphene graph, then we recover numerous topological indices using the M-polynomials.Article Topological Analysis of Zigzag-Edge Coronoid Graph by Using M-Polynomial(Sami Publishing Co-spc, 2021) Ehsan, Muhammad; Sattar, Sumera; Chaudhry, Faryal; Afzal, Farkhanda; Farahani, Mohammad Reza; Cancan, MuratThe chemical graph theory is interrelated with the chemical structure of different compounds. This graph represents the molecule of the sub-stance. A chemical graph is rehabilitated into a real number by applying some mathematical tackles. This number can elaborate on the properties of the molecule. This number is called topological catalogs. Here, we find some topological catalogs via M-polynomial for the zigzag-edge coronoid graph.
