Zagreb Polynomials and redefined Zagreb indices of Dendrimers and Polyomino Chains

Farooq, Adeel; Habib, Mustafa; Mahboob, Abid; Nazeer, Waqas; Kang, Shin Min

doi:10.1515/chem-2019-0144

Cited by 17 publications

(11 citation statements)

References 26 publications

(24 reference statements)

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“…Let G � (V, E) be a simple, undirected, and finite graph with the vertex set V(G) and the edge set E(G). e (open) neighborhood of a vertex u ∈ V(G), denoted by N(u), is the set of all vertices adjacent to u, i.e., [17][18][19]. For a set…”

Section: Preliminariesmentioning

confidence: 99%

The Numerical Invariants concerning the Total Domination for Generalized Petersen Graphs

Ting

Ali

Hameed

et al. 2020

Journal of Mathematics

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A subset S of V G is called a total dominating set of a graph G if every vertex in V G is adjacent to a vertex in S . The total domination number of a graph G denoted by γ t G is the minimum cardinality of a total dominating set in G . The maximum order of a partition of V G into total dominating sets of G is called the total domatic number of G and is denoted by d t G . Domination in graphs has applications to several fields. Domination arises in facility location problems, where the number of facilities (e.g., hospitals and fire stations) is fixed, and one attempts to minimize the distance that a person needs to travel to get to the closest facility. In this paper, the numerical invariants concerning the total domination are studied for generalized Petersen graphs.

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Section: Preliminariesmentioning

confidence: 99%

The Numerical Invariants concerning the Total Domination for Generalized Petersen Graphs

Ting

Ali

Hameed

et al. 2020

Journal of Mathematics

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“…Similarly, first and second Zagreb index can be derived by differentiating their polynomials at

respectively. There are some citable work on Zagreb and other polynomials of special structures ( Farooq et al, 2019 , Fath-Tabar, 2009 , Gao et al, 2016b , Kwun et al, 2018 , Liu et al, 2019 , Shi et al, 2016 , Zheng et al, 2019 ). Some general graph polynomials ( Vetrík, 2019 ) associated with topological indices are as follows…”

Section: Introductionmentioning

confidence: 99%

Degree-based topological indices and polynomials of hyaluronic acid-curcumin conjugates

Ali

Kirmani

Rugaie

et al. 2020

Saudi Pharmaceutical Journal

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Quantitative structure–activity relationship (QSAR) represents quantitative correlation of chemical structural features called as molecular descriptors and pharmacological activity as response endpoints. Topological index is a molecular descriptor extensively used to study QSAR of pharmaceuticals to assess their molecular characteristics by numerical computation. Theoretical assessment of drug like molecules helps to expedite the drug design and discovery process by rationalizing the lead identification, lead optimization and understanding their mechanism of actions. Therefore, in this article, we have computed the general inverse sum indeg index, of Hyaluronic acid-curcumin conjugates by using molecular structure analysis and edge partitioning technique. Many standard topological indices are obtained as a special case of . We also proposed general inverse sum indeg polynomial of Hyaluronic acid-curcumin conjugates from which many well-known polynomials are deduced.

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“…Bo-Zhou and Ivan Gutman presented the upper bound for these Zagreb indices w.r.t the min-max degree [11,12].…”

Section: Introductionmentioning

confidence: 99%

Computation of Irregularity Indices of Certain Computer Networks

Liu

Cai

Virk

et al. 2020

Mathematical Problems in Engineering

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A graph is said to be a regular graph if all its vertices have the same degree; otherwise, it is irregular. In general, irregularity indices are used for computational analysis of nonregular graph topological composition. The creation of irregular indices is based on the conversion of a structural graph into a total count describing the irregularity of the molecular design on the map. It is important to be notified how unusual a molecular structure is in various situations and problems in structural science and chemistry. In this paper, we will compute irregularity indices of certain networks.

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Zagreb Polynomials and redefined Zagreb indices of Dendrimers and Polyomino Chains

Cited by 17 publications

References 26 publications

The Numerical Invariants concerning the Total Domination for Generalized Petersen Graphs

The Numerical Invariants concerning the Total Domination for Generalized Petersen Graphs

Degree-based topological indices and polynomials of hyaluronic acid-curcumin conjugates

Computation of Irregularity Indices of Certain Computer Networks

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