Eccentricity Based Topological Indices of an Oxide Network

Imran, Muhammad; Siddiqui, Muhammad Kamran; Abunamous, Amna A. E.; Adi, Dana; Rafique, Saida Hafsa; Baig, Abdul Qudair

doi:10.3390/math6070126

Cited by 23 publications

(14 citation statements)

References 17 publications

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“…Then, applying vertex partition (10) and (ii) Let G ∼ = RHOX(n). Now, applying the vertex partition (12) and the E (12,14) E (14,14) E (14,16) E (16,16)…”

Section: V(rhsl(n)mentioning

confidence: 99%

“…(i) Let G be the rhombus-type silicate network having dimension n. Applying the edge partition (10) and Table 11,on the definition of the neighborhood version of the second Zagreb index, we get the desired result as follows. (ii) Let G be the rhombus-type oxide network having dimension n. Applying the edge partition (12) and Table 12 on the definition of the neighborhood version of the second Zagreb index, we get the desired result as follows.…”

Section: Theorem 14mentioning

confidence: 99%

“…Now, applying edge partition (10) and (ii) Let G ∼ = RHOX(n). Now, applying edge partition (12) and Table 12 on the definition of the HM N index, we get the following computation.…”

Section: Proofmentioning

confidence: 99%

“…In [11][12][13][14][15][16][17][18][19], topological indices for different chemically important graphs were discussed. Baig et al [20] derived topological indices for some silicate and oxide networks.…”

Section: Introductionmentioning

confidence: 99%

See 3 more Smart Citations

On Some New Neighborhood Degree-Based Indices for Some Oxide and Silicate Networks

Mondal

De²,

Pal

2019

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Topological indices are numeric quantities that describes the topology of molecular structure in mathematical chemistry. An important area of applied mathematics is the chemical reaction network theory. Real-world problems can be modeled using this theory. Due to its worldwide applications, chemical networks have attracted researchers since their foundation. In this report, some silicate and oxide networks are studied, and exact expressions of some newly-developed neighborhood degree-based topological indices named as the neighborhood Zagreb index ( M N ), the neighborhood version of the forgotten topological index ( F N ), the modified neighborhood version of the forgotten topological index ( F N ∗ ), the neighborhood version of the second Zagreb index ( M 2 ∗ ), and neighborhood version of the hyper Zagreb index ( H M N ) are obtained for the aforementioned networks. In addition, a comparison among all the indices is shown graphically.

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“…Then, applying vertex partition (10) and (ii) Let G ∼ = RHOX(n). Now, applying the vertex partition (12) and the E (12,14) E (14,14) E (14,16) E (16,16)…”

Section: V(rhsl(n)mentioning

confidence: 99%

Section: Theorem 14mentioning

confidence: 99%

“…Now, applying edge partition (10) and (ii) Let G ∼ = RHOX(n). Now, applying edge partition (12) and Table 12 on the definition of the HM N index, we get the following computation.…”

Section: Proofmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

On Some New Neighborhood Degree-Based Indices for Some Oxide and Silicate Networks

Mondal

De²,

Pal

2019

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“…For more information and properties of Eccentricity based topological index, see [15][16][17][18][19][20][21][22].…”

Section: Introductionmentioning

confidence: 99%

Degree-Distance Based Topological Indices of Crystal Cubic Carbon Structure

Hong

Siddiqui

Arshad

et al. 2018

Atoms

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Chemical graph theory comprehends the basic properties of an atomic graph. The sub-atomic diagrams are the graphs that are comprised of particles called vertices and the covalent bond between them are called edges. The eccentricity ϵ u of vertex u in an associated graph G, is the separation among u and a vertex farthermost from u. In this article, we consider the precious stone structure of cubic carbon and registered Eccentric-connectivity index ξ ( G ) , Eccentric connectivity polynomial E C P ( G , x ) and Connective Eccentric index C ξ ( G ) of gem structure of cubic carbon for n-levels.

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Computing Some Eccentricity-Based Topological Indices of Para-Line Graphs of Hexagonal Cactus Chains

Durgut

Turaci

2021

Polycyclic Aromatic Compounds

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Eccentricity Based Topological Indices of an Oxide Network

Cited by 23 publications

References 17 publications

On Some New Neighborhood Degree-Based Indices for Some Oxide and Silicate Networks

On Some New Neighborhood Degree-Based Indices for Some Oxide and Silicate Networks

Degree-Distance Based Topological Indices of Crystal Cubic Carbon Structure

Computing Some Eccentricity-Based Topological Indices of Para-Line Graphs of Hexagonal Cactus Chains

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