Computing Fifth Geometric-Arithmetic Index for Circumcoronene series of benzenoid Hk

Let G=(V; E) be a simple connected graph. The sets of vertices and edges of G are denoted by V=V(G) and E=E (G), respectively. The geometric-arithmetic index is a topological index was introduced by Vukicevic and Furtula in 2009 and defined as in which degree of vertex u denoted by dG(u) (or du for short). In 2011, A. Graovac et al defined a new version of GA index as where The goal of this paper is to compute the fifth geometric-arithmetic index for "Circumcoronene series of benzenoid Hk (k≥1)".

Download Full-text

Computing Atom-Bond Connectivity (ABC4) index for Circumcoronene Series of Benzenoid

JOURNAL OF ADVANCES IN CHEMISTRY ◽

10.24297/jac.v2i1.910 ◽

2013 ◽

Vol 2 (1) ◽

pp. 68-72 ◽

Cited By ~ 3

Author(s):

Mohammad Reza Farahani

Keyword(s):

Connected Graph ◽

Topological Index ◽

Molecular Graph ◽

Degree Of Vertex ◽

Abc Index ◽

Simple Connected Graph ◽

Atom Bond

Let G=(V; E) be a simple connected graph. The sets of vertices and edges of G are denoted by V=V(G) and E=E (G), respectively. In such a simple molecular graph, vertices represent atoms and edges represent bonds. The Atom-Bond Connectivity (ABC) index is a topological index was defined as where dv denotes degree of vertex v. In 2010, a new version of Atom-Bond Connectivity (ABC4) index was defined by M. Ghorbani et. al as where and NG(u)={vV(G)|uvE(G)}. The goal of this paper is to compute the ABC4 index for Circumcoronene Series of Benzenoid

Download Full-text

Bounds for symmetric division deg index of graphs

Filomat ◽

10.2298/fil1903683d ◽

2019 ◽

Vol 33 (3) ◽

pp. 683-698 ◽

Cited By ~ 1

Author(s):

Kinkar Das ◽

Marjan Matejic ◽

Emina Milovanovic ◽

Igor Milovanovic

Keyword(s):

Connected Graph ◽

Maximum Degree ◽

Topological Index ◽

Minimum Degree ◽

Topological Indices ◽

Symmetric Division ◽

Mathematical Properties ◽

Vertex Degrees ◽

Additive Modeling ◽

Simple Connected Graph

LetG = (V,E) be a simple connected graph of order n (?2) and size m, where V(G) = {1, 2,..., n}. Also let ? = d1 ? d2 ?... ? dn = ? > 0, di = d(i), be a sequence of its vertex degrees with maximum degree ? and minimum degree ?. The symmetric division deg index, SDD, was defined in [D. Vukicevic, Bond additive modeling 2. Mathematical properties of max-min rodeg index, Croat. Chem. Acta 83 (2010) 261- 273] as SDD = SDD(G) = ?i~j d2i+d2j/didj, where i~j means that vertices i and j are adjacent. In this paper we give some new bounds for this topological index. Moreover, we present a relation between topological indices of graph.

Download Full-text

New Results on the Forgotten Topological Index and Coindex

Journal of Mathematics ◽

10.1155/2021/8700736 ◽

2021 ◽

Vol 2021 ◽

pp. 1-11

Author(s):

Akbar Jahanbani ◽

Maryam Atapour ◽

Rana Khoeilar

Keyword(s):

Electron Energy ◽

Connected Graph ◽

Topological Index ◽

Nonadjacent Vertex ◽

Zagreb Indices ◽

Vertex Degrees ◽

Simple Connected Graph

The ℱ -coindex (forgotten topological coindex) for a simple connected graph G is defined as the sum of the terms ζ G 2 y + ζ G 2 x over all nonadjacent vertex pairs x , y of G , where ζ G y and ζ G x are the degrees of the vertices y and x in G , respectively. The ℱ -index of a graph is defined as the sum of cubes of the vertex degrees of the graph. This was introduced in 1972 in the same paper where the first and second Zagreb indices were introduced to study the structure dependency of total π -electron energy. Therefore, considering the importance of the ℱ -index and ℱ -coindex, in this paper, we study these indices, and we present new bounds for the ℱ -index and ℱ -coindex.

Download Full-text

Zagreb, multiplicative zagreb indices and coindices of 〖nc〗_n (k) and 〖ca〗_3 (c_6 ) graphs

Boletim da Sociedade Paranaense de Matemática ◽

10.5269/bspm.v36i2.30613 ◽

2018 ◽

Vol 36 (2) ◽

pp. 9-15

Author(s):

Vida Ahmadi ◽

Mohammad Reza Darafshe

Keyword(s):

Connected Graph ◽

Zagreb Indices ◽

The Third ◽

Degree Of Vertex ◽

Vertex Set ◽

Simple Connected Graph

Let be a simple connected graph with vertex set V and edge set E. The first, second and third Zagreb indices of G are defind, respectivly by: , and where is the degree of vertex u in G and uv is an edge of G, connecting the vertices u and v. Recently, the first and second multiplicative Zagreb indices of graph are defind by: and . The first and second Zagreb coindices of graph are defind by: and . and , named as multiplicative Zagreb coindices. In this article, we compute the first, second and the third Zagreb indices and the first and second multiplicative Zagreb indices of some graphs. The first and second Zagreb coindices and the first and second multiplicative Zagreb coindices of these graphs are also computed.

Download Full-text

SOME NEW LOWER BOUNDS FOR THE KIRCHHOFF INDEX OF A GRAPH

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972717000831 ◽

2017 ◽

Vol 97 (1) ◽

pp. 1-10

Author(s):

I. MILOVANOVIĆ ◽

M. MATEJIĆ ◽

E. GLOGIĆ ◽

E. MILOVANOVIĆ

Keyword(s):

Lower Bounds ◽

Connected Graph ◽

Topological Index ◽

Its Sequence ◽

Kirchhoff Index ◽

Laplacian Eigenvalues ◽

Vertex Degrees ◽

Simple Connected Graph

Let$G$be a simple connected graph with$n$vertices and$m$edges and$d_{1}\geq d_{2}\geq \cdots \geq d_{n}>0$its sequence of vertex degrees. If$\unicode[STIX]{x1D707}_{1}\geq \unicode[STIX]{x1D707}_{2}\geq \cdots \geq \unicode[STIX]{x1D707}_{n-1}>\unicode[STIX]{x1D707}_{n}=0$are the Laplacian eigenvalues of$G$, then the Kirchhoff index of$G$is$\mathit{Kf}(G)=n\sum _{i=1}^{n-1}\unicode[STIX]{x1D707}_{i}^{-1}$. We prove some new lower bounds for$\mathit{Kf}(G)$in terms of some of the parameters$\unicode[STIX]{x1D6E5}=d_{1}$,$\unicode[STIX]{x1D6E5}_{2}=d_{2}$,$\unicode[STIX]{x1D6E5}_{3}=d_{3}$,$\unicode[STIX]{x1D6FF}=d_{n}$,$\unicode[STIX]{x1D6FF}_{2}=d_{n-1}$and the topological index$\mathit{NK}=\prod _{i=1}^{n}d_{i}$.

Download Full-text

A sharp lower bound of the spectral radius of simple graphs

Applicable Analysis and Discrete Mathematics ◽

10.2298/aadm0902379s ◽

2009 ◽

Vol 3 (2) ◽

pp. 379-385 ◽

Cited By ~ 1

Author(s):

Shengbiao Hu

Keyword(s):

Lower Bound ◽

Spectral Radius ◽

Connected Graph ◽

Simple Graphs ◽

Degree Of Vertex ◽

Simple Connected Graph ◽

Two Parameter ◽

Sharp Lower Bound

Let G be a simple connected graph with n vertices and let p(G) be its spectral radius. The 2-degree of vertex i is denoted by ti, which is the sum of degrees of the vertices adjacent to i. Let Ni = ?j~i tj and Mi = ?j~i Nj. We find a sharp lower bound of p(G), which only contains two parameter Ni and Mi. Our result extends recent known results.

Download Full-text

Joins of paths and cycles of equal order with sigma chromatic number 2

Asian-European Journal of Mathematics ◽

10.1142/s1793557122500061 ◽

2021 ◽

pp. 2250006

Author(s):

Agnes D. Garciano ◽

Maria Czarina T. Lagura ◽

Reginaldo M. Marcelo

Keyword(s):

Chromatic Number ◽

Connected Graph ◽

Sufficient Conditions ◽

Necessary And Sufficient Conditions ◽

Odd Cycle ◽

Necessary And Sufficient ◽

Positive Integers ◽

Simple Connected Graph

For a simple connected graph [Formula: see text] let [Formula: see text] be a coloring of [Formula: see text] where two adjacent vertices may be assigned the same color. Let [Formula: see text] be the sum of colors of neighbors of any vertex [Formula: see text] The coloring [Formula: see text] is a sigma coloring of [Formula: see text] if for any two adjacent vertices [Formula: see text] [Formula: see text] The least number of colors required in a sigma coloring of [Formula: see text] is the sigma chromatic number of [Formula: see text] and is denoted by [Formula: see text] A sigma coloring of a graph is a neighbor-distinguishing type of coloring and it is known that the sigma chromatic number of a graph is bounded above by its chromatic number. It is also known that for a path [Formula: see text] and a cycle [Formula: see text] where [Formula: see text] [Formula: see text] and [Formula: see text] if [Formula: see text] is even. Let [Formula: see text] the join of the graphs [Formula: see text], where [Formula: see text] or [Formula: see text] [Formula: see text] and [Formula: see text] is not an odd cycle for any [Formula: see text]. It has been shown that if [Formula: see text] for [Formula: see text] and [Formula: see text] then [Formula: see text]. In this study, we give necessary and sufficient conditions under which [Formula: see text] where [Formula: see text] is the join of copies of [Formula: see text] and/or [Formula: see text] for the same value of [Formula: see text]. Let [Formula: see text] and [Formula: see text] be positive integers with [Formula: see text] and [Formula: see text] In this paper, we show that [Formula: see text] if and only if [Formula: see text] or [Formula: see text] is odd, [Formula: see text] is even and [Formula: see text]; and [Formula: see text] if and only if [Formula: see text] is even and [Formula: see text] We also obtain necessary and sufficient conditions on [Formula: see text] and [Formula: see text], so that [Formula: see text] for [Formula: see text] where [Formula: see text] or [Formula: see text] other than the cases [Formula: see text] and [Formula: see text]

Download Full-text

ON MOSTAR INDEX OF GRAPHS

Advances in Mathematics: Scientific Journal ◽

10.37418/amsj.10.4.26 ◽

2021 ◽

Vol 10 (4) ◽

pp. 2115-2129

Author(s):

P. Kandan ◽

S. Subramanian

Keyword(s):

Connected Graph ◽

Cartesian Product ◽

Bipartite Graphs ◽

Topological Indices ◽

Great Success ◽

Complete Graphs ◽

Molecular Graphs ◽

Graphs And Networks ◽

Complete Bipartite Graphs ◽

Simple Connected Graph

On the great success of bond-additive topological indices like Szeged, Padmakar-Ivan, Zagreb, and irregularity measures, yet another index, the Mostar index, has been introduced recently as a peripherality measure in molecular graphs and networks. For a connected graph G, the Mostar index is defined as $$M_{o}(G)=\displaystyle{\sum\limits_{e=gh\epsilon E(G)}}C(gh),$$ where $C(gh) \,=\,\left|n_{g}(e)-n_{h}(e)\right|$ be the contribution of edge $uv$ and $n_{g}(e)$ denotes the number of vertices of $G$ lying closer to vertex $g$ than to vertex $h$ ($n_{h}(e)$ define similarly). In this paper, we prove a general form of the results obtained by $Do\check{s}li\acute{c}$ et al.\cite{18} for compute the Mostar index to the Cartesian product of two simple connected graph. Using this result, we have derived the Cartesian product of paths, cycles, complete bipartite graphs, complete graphs and to some molecular graphs.

Download Full-text

On relations between Kirchhoff index, Laplacian energy, Laplacian-energy-like invariant and degree deviation of graphs

Filomat ◽

10.2298/fil2003025m ◽

2020 ◽

Vol 34 (3) ◽

pp. 1025-1033

Author(s):

Predrag Milosevic ◽

Emina Milovanovic ◽

Marjan Matejic ◽

Igor Milovanovic

Keyword(s):

Topological Index ◽

Degree Sequence ◽

Laplacian Matrix ◽

Vertex Degree ◽

Graph Invariants ◽

Kirchhoff Index ◽

Laplacian Eigenvalues ◽

Laplacian Energy ◽

Degree Deviation ◽

Simple Connected Graph

Let G be a simple connected graph of order n and size m, vertex degree sequence d1 ? d2 ?...? dn > 0, and let ?1 ? ? 2 ? ... ? ?n-1 > ?n = 0 be the eigenvalues of its Laplacian matrix. Laplacian energy LE, Laplacian-energy-like invariant LEL and Kirchhoff index Kf, are graph invariants defined in terms of Laplacian eigenvalues. These are, respectively, defined as LE(G) = ?n,i=1 |?i-2m/n|, LEL(G) = ?n-1 i=1 ??i and Kf (G) = n ?n-1,i=1 1/?i. A vertex-degree-based topological index referred to as degree deviation is defined as S(G) = ?n,i=1 |di- 2m/n|. Relations between Kf and LE, Kf and LEL, as well as Kf and S are obtained.

Download Full-text

Joins, coronas and their vertex-edge Wiener polynomials

Tamkang Journal of Mathematics ◽

10.5556/j.tkjm.47.2016.1824 ◽

2016 ◽

Vol 47 (2) ◽

pp. 163-178

Author(s):

Mahdieh Azari ◽

Ali Iranmanesh

Keyword(s):

Generating Function ◽

Connected Graph ◽

Wiener Index ◽

First Derivative ◽

Sum Of Distances ◽

Simple Connected Graph ◽

Product Of Graphs ◽

Corona Product

The vertex-edge Wiener index of a simple connected graph $G$ is defined as the sum of distances between vertices and edges of $G$. The vertex-edge Wiener polynomial of $G$ is a generating function whose first derivative is a $q-$analog of the vertex-edge Wiener index. Two possible distances $D_1(u, e|G)$ and $D_2(u, e|G)$ between a vertex $u$ and an edge $e$ of $G$ can be considered and corresponding to them, the first and second vertex-edge Wiener indices of $G$, and the first and second vertex-edge Wiener polynomials of $G$ are introduced. In this paper, we study the behavior of these indices and polynomials under the join and corona product of graphs. Results are applied for some classes of graphs such as suspensions, bottlenecks, and thorny graphs.

Download Full-text