Computing FGZ Index of Sum Graphs under Strong Product

Topological index (TI) is a function that assigns a numeric value to a (molecular) graph that predicts its various physical and structural properties. In this paper, we study the sum graphs (S-sum, R-sum, Q-sum and T-sum) using the subdivision related operations and strong product of graphs which create hexagonal chains isomorphic to many chemical compounds. Mainly, the exact values of first general Zagreb index (FGZI) for four sum graphs are obtained. At the end, FGZI of the two particular families of sum graphs are also computed as applications of the main results. Moreover, the dominating role of the FGZI among these sum graphs is also shown using the numerical values and their graphical presentations.

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On Some Properties of Multiplicative Topological Indices in Silicon-Carbon

Journal of Mathematics ◽

10.1155/2021/4611199 ◽

2021 ◽

Vol 2021 ◽

pp. 1-10

Author(s):

Abid Mahboob ◽

Sajid Mahboob ◽

Mohammed M. M. Jaradat ◽

Nigait Nigar ◽

Imran Siddique

Keyword(s):

Graph Theory ◽

Structural Properties ◽

Topological Index ◽

Molecular Graph ◽

Chemical Compounds ◽

Google Maps ◽

Chemical Graph ◽

Zagreb Indices ◽

Silicon Carbon ◽

Connectivity Indices

The use of graph theory can be visualized in nanochemistry, computer networks, Google maps, and molecular graph which are common areas to elaborate application of this subject. In nanochemistry, a numeric number (topological index) is used to estimate the biological, physical, and structural properties of chemical compounds that are associated with the chemical graph. In this paper, we compute the first and second multiplicative Zagreb indices ( M 1 G and ( M 1 G )), generalized multiplicative geometric arithmetic index ( GA α II G ), and multiplicative sum connectivity and multiplicative product connectivity indices ( SCII G and PCII G ) of SiC 4 − I m , n and SiC 4 − II m , n .

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On degree-based topological descriptors of strong product graphs

Canadian Journal of Chemistry ◽

10.1139/cjc-2015-0562 ◽

2016 ◽

Vol 94 (6) ◽

pp. 559-565 ◽

Cited By ~ 3

Author(s):

Shehnaz Akhter ◽

Muhammad Imran

Keyword(s):

Physicochemical Properties ◽

Strain Energy ◽

Chemical Compounds ◽

Topological Indices ◽

Topological Descriptors ◽

Zagreb Indices ◽

Strong Product ◽

Product Graphs ◽

Product Of Graphs ◽

Atom Bond

Topological descriptors are numerical parameters of a graph that characterize its topology and are usually graph invariant. In a QSAR/QSPR study, physicochemical properties and topological indices such as Randić, atom–bond connectivity, and geometric–arithmetic are used to predict the bioactivity of different chemical compounds. There are certain types of topological descriptors such as degree-based topological indices, distance-based topological indices, counting-related topological indices, etc. Among degree-based topological indices, the so-called atom–bond connectivity and geometric–arithmetic are of vital importance. These topological indices correlate certain physicochemical properties such as boiling point, stability, strain energy, etc., of chemical compounds. In this paper, analytical closed formulas for Zagreb indices, multiplicative Zagreb indices, harmonic index, and sum-connectivity index of the strong product of graphs are determined.

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Computing Analysis for First Zagreb Connection Index and Coindex of Resultant Graphs

Mathematical Problems in Engineering ◽

10.1155/2021/6019517 ◽

2021 ◽

Vol 2021 ◽

pp. 1-19 ◽

Cited By ~ 1

Author(s):

Muhammad Javaid ◽

Usman Ali ◽

Jia-Bao Liu

Keyword(s):

Tensor Product ◽

Physicochemical Properties ◽

Electron Energy ◽

Topological Index ◽

Chemical Compounds ◽

Upper Bounds ◽

Symmetric Difference ◽

Factor Graphs ◽

Strong Product ◽

Alternant Hydrocarbons

A numeric parameter which studies the behaviour, structural, toxicological, experimental, and physicochemical properties of chemical compounds under several graphs’ isomorphism is known as topological index. In 2018, Ali and Trinajstić studied the first Zagreb connection index Z C 1 to evaluate the value of a molecule. This concept was first studied by Gutman and Trinajstić in 1972 to find the solution of π -electron energy of alternant hydrocarbons. In this paper, the first Zagreb connection index and coindex are obtained in the form of exact formulae and upper bounds for the resultant graphs in terms of different indices of their factor graphs, where the resultant graphs are obtained by the product-related operations on graphs such as tensor product, strong product, symmetric difference, and disjunction. At the end, an analysis of the obtained results for the first Zagreb connection index and coindex on the aforesaid resultant graphs is interpreted with the help of numerical values and graphical depictions.

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Computing Analysis of Zagreb Indices for Generalized Sum Graphs under Strong Product

Journal of Chemistry ◽

10.1155/2021/6663624 ◽

2021 ◽

Vol 2021 ◽

pp. 1-20

Author(s):

Muhammad Javaid ◽

Saira Javed ◽

Abdulaziz Mohammed Alanazi ◽

Majdah R. Alotaibi

Keyword(s):

Chemical Engineering ◽

Chemical Properties ◽

Chemical Compounds ◽

Vital Role ◽

Molecular Structures ◽

Zagreb Indices ◽

Graph Theoretic ◽

Strong Product ◽

Physicochemical And Structural Properties ◽

Product Of Graphs

Numerous studies based on mathematical models and tools indicate that there is a strong inherent relationship between the chemical properties of the chemical compounds and drugs with their molecular structures. In the last two decades, the graph-theoretic techniques are frequently used to analyse the various physicochemical and structural properties of the molecular graphs which play a vital role in chemical engineering and pharmaceutical industry. In this paper, we compute Zagreb indices of the generalized sum graphs in the form of the different indices of their factor graphs, where generalized sum graphs are obtained under the operations of subdivision and strong product of graphs. Moreover, the obtained results are illustrated with the help of particular classes of graphs and analysed to find the efficient subclass with dominant indices.

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On Computation Degree-Based Topological Descriptors for Planar Octahedron Networks

Journal of Mathematics ◽

10.1155/2021/4880092 ◽

2021 ◽

Vol 2021 ◽

pp. 1-12

Author(s):

Wang Zhen ◽

Parvez Ali ◽

Haidar Ali ◽

Ghulam Dustigeer ◽

Jia-Bao Liu

Keyword(s):

Graph Theory ◽

Chemical Compound ◽

Topological Index ◽

Molecular Graph ◽

Topological Descriptors ◽

Zagreb Index ◽

Chemical Graph ◽

Symmetric Division ◽

Chemical Graph Theory ◽

Augmented Zagreb Index

A molecular graph is used to represent a chemical molecule in chemical graph theory, which is a branch of graph theory. A graph is considered to be linked if there is at least one link between its vertices. A topological index is a number that describes a graph’s topology. Cheminformatics is a relatively young discipline that brings together the field of sciences. Cheminformatics helps in establishing QSAR and QSPR models to find the characteristics of the chemical compound. We compute the first and second modified K-Banhatti indices, harmonic K-Banhatti index, symmetric division index, augmented Zagreb index, and inverse sum index and also provide the numerical results.

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The Second Hyper-Zagreb Coindex of Chemical Graphs and Some Applications

Journal of Chemistry ◽

10.1155/2021/3687533 ◽

2021 ◽

Vol 2021 ◽

pp. 1-8

Author(s):

Ahmed Ayache ◽

Abdu Alameri ◽

Mohammed Alsharafi ◽

Hanan Ahmed

Keyword(s):

Tensor Product ◽

Topological Index ◽

Molecular Graph ◽

Cartesian Product ◽

Explicit Formulas ◽

Chemical Graph ◽

Strong Product ◽

Chemical Graphs ◽

Product Composition ◽

Graph Structures

The second hyper-Zagreb coindex is an efficient topological index that enables us to describe a molecule from its molecular graph. In this current study, we shall evaluate the second hyper-Zagreb coindex of some chemical graphs. In this study, we compute the value of the second hyper-Zagreb coindex of some chemical graph structures such as sildenafil, aspirin, and nicotine. We also present explicit formulas of the second hyper-Zagreb coindex of any graph that results from some interesting graphical operations such as tensor product, Cartesian product, composition, and strong product, and apply them on a q-multiwalled nanotorus.

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F-index and hyper-Zagreb index of four new tensor products of graphs and their complements

Discrete Mathematics Algorithms and Applications ◽

10.1142/s1793830919500393 ◽

2019 ◽

Vol 11 (03) ◽

pp. 1950039 ◽

Cited By ~ 1

Author(s):

B. Basavanagoud ◽

Anand P. Barangi

Keyword(s):

Topological Index ◽

Molecular Graph ◽

Tensor Products ◽

Zagreb Index

For a molecular graph [Formula: see text], the [Formula: see text]-index or forgotten topological index is defined as the sum of cubes of degree of all vertices of the graph and the hyper-Zagreb index is equal to the sum of square of sum of degree of all adjacent vertices of the graph. In this paper, we obtain [Formula: see text]-index, hyper-Zagreb index and their coindices of [Formula: see text]-tensor products (four new tensor products based on transformations of a graph) of graphs and their complements.

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Computing Analysis of Degree and Connection Based Irregular Indices of Polycyclic Aromatic Hydrocarbons

Current Organic Synthesis ◽

10.2174/1570179418666210309145043 ◽

2021 ◽

Vol 18 ◽

Author(s):

Muhammad Javaid ◽

Muhammad Ibraheem ◽

Abdul Raheem

Keyword(s):

Polycyclic Aromatic Hydrocarbons ◽

Aromatic Hydrocarbons ◽

Topological Index ◽

Medical Science ◽

Molecular Graph ◽

Chemical Compounds ◽

Molecular Graphs ◽

Equal Degree ◽

Physical Chemical ◽

Polycyclic Aromatic

Introduction: A graph is supposed to be regular if all vertices have equal degree, otherwise irregular. Materials and Methods: Polycyclic aromatic hydrocarbons are important combusting material and considered as class of carcinogens. These polycyclic aromatic hydrocarbons play an important role in graphitisation of medical science. A topological index is a function that assigns a numerical value to a (molecular) graph which predicts various physical, chemical, biological, thermodynamical and structural properties of (molecular) graphs. An irregular index is a topological index that measures the irregularity of atoms with respect to their bonding for the chemical compounds which are involved in the under studying graphs. Results and Discussion: In this paper, we will compute an analysis of distance based irregular indices of polycyclic aromatic hydrocarbons. A comparison among the obtained indices with the help of their numerical values and the 3D presentations is also included. The efficient and steady indices of polycyclic aromatic hydrocarbons are addressed in the form of their irregularities. Conclusion: Connection based study of the molecular graphs is more suitable than the degree based irregularity indices.

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Expected Values of Some Molecular Descriptors in Random Cyclooctane Chains

Symmetry ◽

10.3390/sym13112197 ◽

2021 ◽

Vol 13 (11) ◽

pp. 2197

Author(s):

Zahid Raza ◽

Muhammad Imran

Keyword(s):

Molecular Descriptors ◽

Saturated Hydrocarbon ◽

Molecular Graph ◽

Chemical Compounds ◽

Total Surface Area ◽

Single Bond ◽

Zagreb Index ◽

Augmented Zagreb Index ◽

Explicit Formulae ◽

Expected Values

The modified second Zagreb index, symmetric difference index, inverse symmetric index, and augmented Zagreb index are among the molecular descriptors which have good correlations with some physicochemical properties (such as formation heat, total surface area, etc.) of chemical compounds. By a random cyclooctane chain, we mean a molecular graph of a saturated hydrocarbon containing at least two rings such that all rings are cyclooctane, every ring is joint with at most two other rings through a single bond, and exactly two rings are joint with one other ring. In this article, our main purpose is to determine the expected values of the aforementioned molecular descriptors of random cyclooctane chains explicitly. We also make comparisons in the form of explicit formulae and numerical tables consisting of the expected values of the considered descriptors of random cyclooctane chains. Moreover, we outline the graphical profiles of these comparisons among the mentioned descriptors.

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Some Bounds on Bond Incident Degree Indices with Some Parameters

Mathematical Problems in Engineering ◽

10.1155/2021/8417486 ◽

2021 ◽

Vol 2021 ◽

pp. 1-10

Author(s):

Muhammad Rizwan ◽

Akhlaq Ahmad Bhatti ◽

Muhammad Javaid ◽

Fahd Jarad

Keyword(s):

Partition Coefficient ◽

Polyaromatic Hydrocarbons ◽

Molecular Graph ◽

Chemical Compounds ◽

Molar Refraction ◽

Quantitative Structure ◽

Structure Property ◽

Acentric Factor ◽

Zagreb Index ◽

Water Partition Coefficient

It is considered that there is a fascinating issue in theoretical chemistry to predict the physicochemical and structural properties of the chemical compounds in the molecular graphs. These properties of chemical compounds (boiling points, melting points, molar refraction, acentric factor, octanol-water partition coefficient, and motor octane number) are modeled by topological indices which are more applicable and well-used graph-theoretic tools for the studies of quantitative structure-property relationships (QSPRs) and quantitative structure-activity relationships (QSARs) in the subject of cheminformatics. The π -electron energy of a molecular graph was calculated by adding squares of degrees (valencies) of its vertices (nodes). This computational result, afterwards, was named the first Zagreb index, and in the field of molecular graph theory, it turned out to be a well-swotted topological index. In 2011, Vukicevic introduced the variable sum exdeg index which is famous for predicting the octanol-water partition coefficient of certain chemical compounds such as octane isomers, polyaromatic hydrocarbons (PAH), polychlorobiphenyls (PCB), and phenethylamines (Phenet). In this paper, we characterized the conjugated trees and conjugated unicyclic graphs for variable sum exdeg index in different intervals of real numbers. We also investigated the maximum value of SEIa for bicyclic graphs depending on a > 1 .

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