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121 results on '"Bhatti, Akhlaq Ahmad"'

1. Towards the Solution of an Extremal Problem Concerning the Wiener Polarity Index of Alkanes

Author

Noureen, Sadia, Bhatti, Akhlaq Ahmad, and Ali, Akbar

Subjects
Mathematics - Combinatorics
Abstract

The Wiener polarity index $W_p$, one of the most studied molecular structure descriptors, was devised by the chemist Harold Wiener for predicting the boiling points of alkanes. The index $W_p$ for chemical trees (chemical graphs representing alkanes) is defined as the number of unordered pairs of vertices at distance 3. A vertex of a chemical tree with the degree at least 3 is called a branching vertex. A segment of a chemical tree $T$ is a path-subtree $S$ whose terminal vertices have degrees different from 2 in $T$ and every internal vertex (if exists) of $S$ has degree 2 in $T$. In this paper, the best possible sharp upper and lower bounds on the Wiener polarity index $W_p$ are derived for the chemical trees of order $n$ with a given number of branching vertices or segments, and the corresponding extremal chemical trees are characterized. As a consequence of the derived results, an open problem concerning the maximal $W_p$ value of chemical trees with a fixed number of segments or branching vertices is solved., Comment: 16 pages

Published
2020
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2. On the Extremal Zagreb Indices of $\mathbf{\textit{n}}$-Vertex Chemical Trees with Fixed Number of Segments or Branching Vertices

Author

Noureen, Sadia, Ali, Akbar, and Bhatti, Akhlaq Ahmad

Subjects
Mathematics - Combinatorics
Abstract

Let $\mathcal{CT}_{n,k}$ and $\mathcal{CT}^*_{n,b}$ be the classes of all $n$-vertex chemical trees with $k$ segments and $b$ branching vertices, respectively, where $3\le k\le n-1$ and $1\le b< \frac{n}{2}-1$. The solution of the problem of finding trees from the class $\mathcal{CT}_{n,k}$ or $\mathcal{CT}^*_{n,b}$, with the minimum first Zagreb index or minimum second Zagreb index follows directly from the main results of [MATCH Commun. Math. Comput. Chem. 72 (2014) 825-834] or [MATCH Commun. Math. Comput. Chem. 74 (2015) 57-79]. In this paper, the chemical trees with the maximum first/second Zagreb index are characterized from each of the aforementioned graph classes., Comment: 21 pages, no figure

Published
2019

3. A Note on the Modified Albertson Index

Author

Yousaf, Shumaila, Bhatti, Akhlaq Ahmad, and Ali, Akbar

Subjects
Mathematics - Combinatorics
Abstract

The modified Albertson index, denoted by $A\!^*\!$, of a graph $G$ is defined as $A\!^*\!(G)=\sum_{uv\in E(G)} |(d_{u})^{2}- (d_{v})^{2}|$, where $d_u$, $d_v$ denote the degrees of the vertices $u$, $v$, respectively, of $G$ and $E(G)$ is the edge set of $G$. In this note, a sharp lower bound of $A\!^*$ in terms of the maximum degree for the case of trees is derived. The $n$-vertex trees having maximal and minimal $A\!^*$ values are also characterized here. Moreover, it is shown that $A\!^*\!(G)$ is non-negative even integer for every graph $G$ and that there exist infinitely many connected graphs whose $A\!^*$ value is $2t$ for every integer $t\in\{0,3,4,5\}\cup\{8,9,10,\cdots\}$.

Published
2019

8. Extremal Triangular Chain Graphs for Bond Incident Degree (BID) Indices

Author

Ali, Akbar and Bhatti, Akhlaq Ahmad

Subjects
Mathematics - Combinatorics
Abstract

A general expression for calculating the bond incident degree (BID) indices of certain triangular chain graphs is derived. The extremal triangular chain graphs with respect to several well known BID indices are also characterized over a particular collection of triangular chain graphs., Comment: 15 pages, 4 Figures

Published
2016

9. A note on the augmented Zagreb index of cacti with fixed number of vertices and cycles

Author

Ali, Akbar and Bhatti, Akhlaq Ahmad

Subjects
Mathematics - Combinatorics
Abstract

Let $\mathcal{C}_{n,k}$ be the family of all cacti with $k$ cycles and $n\geq4$ vertices. In the present note, the element of the class $\mathcal{C}_{n,k}$ having minimum augmented Zagreb index ($AZI$) is characterized. Moreover, some structural properties of the graph(s) having maximum $AZI$ value over the collection $\mathcal{C}_{n,0}$, are also reported., Comment: 10 pages, 2 figures

Published
2016

12. Killing and Noether Symmetries of Plane Symmetric Spacetime

Author

Shamir, M. Farasat, Jhangeer, Adil, and Bhatti, Akhlaq Ahmad

Subjects
General Relativity and Quantum Cosmology
Abstract

This paper is devoted to investigate the Killing and Noether symmetries of static plane symmetric spacetime. For this purpose, five different cases have been discussed. The Killing and Noether symmetries of Minkwoski spacetime in cartesian coordinates are calculated as a special case and it is found that Lie algebra of the Lagrangian is 10 and 17 dimensional respectively. The symmetries of Taub's universe, anti-deSitter universe, self similar solutions of infinite kind for parallel perfect fluid case and self similar solutions of infinite kind for parallel dust case are also explored. In all the cases, the Noether generators are calculated in the presence of gauge term. All these examples justify the conjecture that Killing symmetries form a subalgebra of Noether symmetries [1]., Comment: 17 Pages

Published
2015
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13. On the Augmented Zagreb Index

Author

Ali, Akbar, Raza, Zahid, and Bhatti, Akhlaq Ahmad

Subjects
Mathematics - Combinatorics
Abstract

Topological indices play an important role in mathematical chemistry especially in the quantitative structure-property relationship (QSPR) and quantitative structure-activity relationship (QSAR). Recent research indicates that the augmented Zagreb index (AZI) possess the best correlating ability among several topological indices. The main purpose of the current study is to establish some mathematical properties of this index, or more precisely, to report tight bounds for the AZI of chemical bicyclic and chemical unicyclic graphs. A Nordhaus-Gaddum-type result for the AZI (of connected graph whose complement is connected) is also derived., Comment: 13 pages, 3 figures

Published
2014

14. More on Comparison Between First Geometric-Arithmetic Index and Atom-Bond Connectivity Index

Author

Raza, Zahid, Bhatti, Akhlaq Ahmad, and Ali, Akbar

Subjects
Mathematics - Combinatorics
Abstract

The first geometric-arithmetic (GA) index and atom-bond connectivity (ABC) index are molecular structure descriptors which play a significant role in quantitative structure-property relationship (QSPR) and quantitative structure-activity relationship (QSAR) studies. Das and Trinajsti\'{c} [\textit{Chem. Phys. Lett.} \textbf{497} (2010) 149-151] showed that $GA$ index is greater than $ABC$ index for all those graphs (except $K_{1,4}$ and $T^{*}$, see Figure 1) in which the difference between maximum and minimum degree is less than or equal to 3. In this note, it is proved that $GA$ index is greater than $ABC$ index for line graphs of molecular graphs, for general graphs in which the difference between maximum and minimum degree is less than or equal to $(2\delta-1)^{2}$ (where $\delta$ is the minimum degree and $\delta\geq2$) and for some families of trees. Thereby, a partial solution to an open problem proposed by Das and Trinajsti\'{c} is given., Comment: 10 pages, 2 tables, 1 figure, revised version

Published
2014
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15. Further Inequalities Between Vertex-Degree-Based Topological Indices

Author

Ali, Akbar, Bhatti, Akhlaq Ahmad, and Raza, Zahid

Subjects
Mathematics - Combinatorics
Abstract

Continuing the recent work of L. Zhong and K. Xu [MATCH Commun. Math. Comput. Chem.71(2014) 627-642], we determine inequalities among several vertex-degree-based topological indices; first geometric-arithmetic index(GA), augmented Zagreb index (AZI), Randi$\acute{c}$ index (R), atom-bond connectivity index (ABC), sum-connectivity index (X)and harmonic index (H)., Comment: 9 pages and one table, Submitted

Published
2014
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16. Conserved Quantities in $f(R)$ Gravity via Noether Symmetry

Author

Shamir, M. Farasat, Jhangeer, Adil, and Bhatti, Akhlaq Ahmad

Subjects
General Relativity and Quantum Cosmology
Abstract

This paper is devoted to investigate $f(R)$ gravity using Noether symmetry approach. For this purpose, we consider Friedmann Robertson-Walker (FRW) universe and spherically symmetric spacetimes. The Noether symmetry generators are evaluated for some specific choice of $f(R)$ models in the presence of gauge term. Further, we calculate the corresponding conserved quantities in each case. Moreover, the importance and stability criteria of these models are discussed., Comment: 14 pages, accepted for publication in Chin. Phys. Lett

Published
2012
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17. Exact Solutions of Bianchi Types $I$ and $V$ Models in $f(R,T)$ Gravity

Author

Shamir, M. Farasat, Jhangeer, Adil, and Bhatti, Akhlaq Ahmad

Subjects
General Relativity and Quantum Cosmology
Abstract

This paper is devoted to investigate the exact solutions of Bianchi types I and V spacetimes in the context of f(R, T) gravity [1]. For this purpose, we found two exact solutions in each case by using assumption of constant deceleration parameter and the variation law of Hubble parameter. The obtained solutions correspond to two different models of this universe. The physical behavior of these models is also discussed., Comment: 16 pages

Published
2012

18. Anisotropic Dark Energy Bianchi Type III Cosmological Models in Brans Dicke Theory of Gravity

Author

Shamir, M. Farasat and Bhatti, Akhlaq Ahmad

Subjects
General Relativity and Quantum Cosmology
Abstract

The main purpose of this paper is to explore the solutions of Bianchi type $III$ cosmological model in Brans Dicke theory of gravity in the background of anisotropic dark energy. We use the assumption of constant deceleration parameter and power law relation between scalar field $\phi$ and scale factor $a$ to find the solutions. The physical behavior of the solutions has been discussed using some physical quantities., Comment: 14 pages, accepted for publication in Canadian Journal of Physics. arXiv admin note: substantial text overlap with arXiv:0910.5787

Published
2012
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22. On the Hyper Zagreb Index of Trees with a Specified Degree of Vertices.

Author

Rizwan, Muhammad, Shahab, Sana, Bhatti, Akhlaq Ahmad, Javaid, Muhammad, and Anjum, Mohd

Subjects
MOLECULAR connectivity index, LATENT heat of fusion, CHEMICAL properties, BOILING-points, VAPORIZATION
Abstract

Topological indices are the numerical descriptors that correspond to some certain physicochemical properties of a chemical compound such as the boiling point, acentric factor, enthalpy of vaporisation, heat of fusion, etc. Among these topological indices, the Hyper Zagreb index, is the most effectively used topological index to predict the acentric factor of some octane isomers. In the current work, we investigate the extremal values of the Hyper Zagreb index for some classes of trees. [ABSTRACT FROM AUTHOR]

Published
2023
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23. Extremal pentagonal chains with respect to bond incident degree indices

Author

Ali, Akbar, Raza, Zahid, and Bhatti, Akhlaq Ahmad

Subjects
Molecular structure -- Observations, Chemical bonds -- Observations, Chemistry
Abstract

Abstract: Numerous molecular structure descriptors, which may be used in theoretical chemistry, are the bond incident degree (BID) indices. This study is devoted to establish a general expression for calculating [...]

Published
2016
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24. Minimum total irregularity index of tricyclic graphs.

Author

Ahmed, Hassan and Bhatti, Akhlaq Ahmad

Subjects
*STRUCTURE-activity relationships, *CHEMICAL properties, *MOLECULAR connectivity index
Abstract

The quantitative characterization of the topological structures of irregular graphs has been demonstrated through several irregularity measures. In the literature, not only different chemical and physical properties can be well comprehended but also quantitative structure-activity relationship (QSPR) and quantitative structure-property relationship (QSAR) are documented through these measures. A simple graph G = (V, E) is a collection of V and E as vertex and edge sets respectively, with no multiple edges or loops. Keeping in view the importance of various irregularity measures, in (Abdo et al., 2014a) the authors defined the total irregularity of a simple graph G = G(V, E) as irrt(G) = 1 2 P u,v∈V |dG(u) - dG(v)|, where dG(u) indicates the degree of the vertex u, where u ∈ V (G). In this paper, we have determined the first minimum, second minimum and third minimum total irregularity index of the tricyclic graphs on the n vertices. [ABSTRACT FROM AUTHOR]

Published
2023
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30. On Bond Incident Degree Indices of Chemical Graphs.

Author

Albalahi, Abeer M., Ali, Akbar, Du, Zhibin, Bhatti, Akhlaq Ahmad, Alraqad, Tariq, Iqbal, Naveed, and Hamza, Amjad E.

Subjects
MOLECULAR graphs, MOLECULAR structure, SYMMETRIC functions, BONDS (Finance), MOLECULAR connectivity index
Abstract

By swapping out atoms for vertices and bonds for edges, a graph may be used to model any molecular structure. A graph G is considered to be a chemical graph in graph theory if no vertex of G has a degree of 5 or greater. The bond incident degree (BID) index for a chemical graph G is defined as the total of contributions f (d G (u) , d G (v)) from all edges u v of G, where d G (w) stands for the degree of a vertex w of G, E (G) is the set of edges of G, and f is a real-valued symmetric function. This paper addresses the problem of finding graphs with extremum BID indices over the class of all chemical graphs of a fixed number of edges and vertices. [ABSTRACT FROM AUTHOR]

Published
2023
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32. Study of Carbon Nanbotubes and Boron Nanotubes Using Degree Based Topological Indices.

Author

Yousaf, Shamaila, Bhatti, Akhlaq Ahmad, and Aslam, Adnan

Subjects
*MOLECULAR connectivity index, *TOPOLOGICAL degree, *BORON, *CHEMICAL structure, *NANOTUBES, *CARBON
Abstract

The numerical quantity that correlates chemical structure of a molecule with its physico–chemical properties is known as topological index. Topological indices are widely used to investigate the characteristics of molecular structres. Boron and carbon nanostructures are widely studied by researchers due to their novel properties. In this paper, the first extended first–order connectivity index and neighborhood second Zagreb index are calculated due to their better correlation ability among existing indices. In addition to this, closed formulae of these topological indices are also presented for the above mentioned nanostructure networks. [ABSTRACT FROM AUTHOR]

Published
2022
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38. Maximum total irregularity index of some families of graph with maximum degree n−1.

Author

Yousaf, Shamaila and Bhatti, Akhlaq Ahmad

Subjects
MATHEMATICS
Abstract

The total irregularity index of a graph G is defined by Abdo et al. [H. Abdo, S. Brandt and D. Dimitrov, The total irregularity of a graph, Discrete Math. Theor. Comput. Sci. 16 (2014) 201–206] as irr t (G) = 1 2 ∑ u , v ∈ V (G) | deg G (u) − deg G (v) | , where deg G (u) denotes the degree of a vertex u ∈ V. In 2014, You et al. [L. H. You, J. S. Yang and Z. F. You, The maximal total irregularity of unicyclic graphs, Ars Comb. 114 (2014) 153–160.] characterized the graph having maximum i r r t value among all elements of the class U n (Unicyclic graphs) and Zhou et al. [L. H. You, J. S. Yang, Y. X. Zhu and Z. F. You, The maximal total irregularity of bicyclic graphs, J. Appl. Math. 2014 (2014) 785084, http://dx.doi.org/10.1155/2014/785084] characterized the graph having maximum irr t value among all elements of the class B n (Bicyclic graphs). In this paper, we characterize the aforementioned graphs with an alternative but comparatively simple approach. Also, we characterized the graphs having maximum irr t value among the classes T n (Tricyclic graphs), TET n (Tetracyclic graphs), PNT n (Pentacyclic graphs) and HEX n (Hexacyclic graphs). [ABSTRACT FROM AUTHOR]

Published
2022
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47. Extremum Modified First Zagreb Connection Index of n-Vertex Trees with Fixed Number of Pendent Vertices.

Author

Noureen, Sadia, Bhatti, Akhlaq Ahmad, and Ali, Akbar

Subjects
*GEOMETRIC vertices, *MOLECULAR models
Abstract

The modified first Zagreb connection index ZC 1 ∗ is a graph invariant that appeared about fifty years ago within a study of molecular modeling, and after a long time, it has been revisited in two papers ((Ali and Trinajstić, 2018) and (Naji et al., 2017)) independently. For a graph G , this graph invariant is defined as ZC 1 ∗ G = ∑ v ∈ V G d v τ v , where d v is the degree of the vertex v and τ v is the connection number of v (that is, the number of vertices having distance 2 from v). In this paper, the graphs with maximum/minimum ZC 1 ∗ value are characterized from the class of all n -vertex trees with fixed number of pendent vertices (that are the vertices of degree 1). [ABSTRACT FROM AUTHOR]

Published
2020
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48. Extremal trees for the modified first Zagreb connection index with fixed number of segments or vertices of degree 2.

Author

Noureen, Sadia, Bhatti, Akhlaq Ahmad, and Ali, Akbar

Abstract

The modified first Zagreb connection index Z C 1 ∗ is a graph invariant, initially appeared within a formula of the total electron energy of alternant hydrocarbons in 1972, and revisted in a recent paper [A. Ali, N. Trinajstić. A novel/old modification of the first Zagreb index. Mol Inform. 2018;37(6). Art# 1800008; arXiv:1705.10430 [math.CO]]. In this paper, the graph(s) with the maximum/minimum Z C 1 ∗ value is/are characterized from the class of all n-vertex trees with fixed number of segments. As the number of segments in a tree can be determined from the number of vertices of degree 2 (and vice versa), the trees with the extremum Z C 1 ∗ values are also determined from the class of all n-vertex trees having a fixed number of vertices of degree 2. [ABSTRACT FROM AUTHOR]

Published
2020
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49. Extremal Triangular Chain Graphs for Bond Incident Degree (BID) Indices

Author

Akbar Ali and Bhatti, Akhlaq Ahmad

Subjects
Computer Science::Computer Science and Game Theory, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, Mathematics - Combinatorics, natural sciences, Combinatorics (math.CO)
Abstract

A general expression for calculating the bond incident degree (BID) indices of certain triangular chain graphs is derived. The extremal triangular chain graphs with respect to several well known BID indices are also characterized over a particular collection of triangular chain graphs., 15 pages, 4 Figures

Published
2016

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