The F-coindex of some graph operations

De, Nilanjan; Nayeem, Sk. Md. Abu; Pal, Anita

doi:10.1186/s40064-016-1864-7

Cited by 88 publications

(48 citation statements)

References 22 publications

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“…Furtula et al,in [5], investigate some basic properties and bounds of F-index and in [6] Abdoa et al found the extremal trees with respect to the F-index. Recently, the present author studied this index for different graph operations [7] and of different classes of nanostar dendrimers [9] and also introduced F-coindex in [8]. Also, the present author studied F-index of different transformation graphs and four sum of graphs in [10] and [11] respectively.…”

Section: Introductionmentioning

confidence: 99%

F-index of graphs based on four operations related to the lexicographic product

De¹

2020

Malaya J. Mat.

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The forgotten topological index or F-index of a graph is defined as the sum of cubes of the degree of all the vertices of the graph. In this paper we study the F-index of four operations related to the lexicographic product on graphs which were introduced by Sarala et al. [D. Sarala, H. Deng, S.K. Ayyaswamya and S. Balachandrana, The Zagreb indices of graphs based on four new operations related to the lexicographic product, Applied Mathematics and Computation, 309 (2017) 156-169.]. MSC (2010): Primary: 05C35; Secondary: 05C07, 05C40

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Section: Introductionmentioning

confidence: 99%

F-index of graphs based on four operations related to the lexicographic product

De¹

2020

Malaya J. Mat.

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“…They also proposed its basic properties in the same paper and reported that it can enhance the physico-chemical capability of the molecules. The F-index and its co-index of the di erent graphs are studied by De et al [5], Milovanovic et al [6] and Basavanagoud et al [7]. Khaksari and Ghorbani [8] studied the certain product of graphs with the same index.…”

Section: Introductionmentioning

confidence: 99%

Bounds on F-index of tricyclic graphs with fixed pendant vertices

2020

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Abstract The F-index F(G) of a graph G is obtained by the sum of cubes of the degrees of all the vertices in G. It is defined in the same paper of 1972 where the first and second Zagreb indices are introduced to study the structure-dependency of total π-electron energy. Recently, Furtula and Gutman [J. Math. Chem. 53 (2015), no. 4, 1184–1190] reinvestigated F-index and proved its various properties. A connected graph with order n and size m, such that m = n + 2, is called a tricyclic graph. In this paper, we characterize the extremal graphs and prove the ordering among the different subfamilies of graphs with respect to F-index in $\begin{array}{} \displaystyle {\it\Omega}^{\alpha}_n \end{array}$, where $\begin{array}{} \displaystyle {\it\Omega}^{\alpha}_n \end{array}$ is a complete class of tricyclic graphs with three, four, six and seven cycles, such that each graph has α ≥ 1 pendant vertices and n ≥ 16 + α order. Mainly, we prove the bounds (lower and upper) of F(G), i.e $$\begin{array}{} \displaystyle 8n+12\alpha +76\leq F(G)\leq 8(n-1)-7\alpha + (\alpha+6)^3 ~\mbox{for each}~ G\in {\it\Omega}^{\alpha}_n. \end{array}$$

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“…There are several study concerning topological indices of different graph operations. In [11], [12] and [13] [17], derived explicit formulae for computing the eccentric-distance sum of different graph operations. Recently, De computes the vertex Zagreb indices of different graph operations in [18].…”

Section: Introductionmentioning

confidence: 99%

Computing Reformulated First Zagreb Index of Some Chemical Graphs as an Application of Generalized Hierarchical Product of Graphs

De¹

2018

Open J. Math. Sci

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The generalized hierarchical product of graphs was introduced by L. Barriére et al in 2009. In this paper, reformulated first Zagreb index of generalized hierarchical product of two connected graphs and hence as a special case cluster product of graphs are obtained. Finally using the derived results the reformulated first Zagreb index of some chemically important graphs such as square comb lattice, hexagonal chain, molecular graph of truncated cube, dimer fullerene, zig-zag polyhex nanotube and dicentric dendrimers are computed.

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The F-coindex of some graph operations

Cited by 88 publications

References 22 publications

F-index of graphs based on four operations related to the lexicographic product

F-index of graphs based on four operations related to the lexicographic product

Bounds on F-index of tricyclic graphs with fixed pendant vertices

Computing Reformulated First Zagreb Index of Some Chemical Graphs as an Application of Generalized Hierarchical Product of Graphs

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