A short note on hyper Zagreb index

Auteurs-es

  • Suresh Elumalai Velammal Engineering College Department of Mathematics
  • Toufik Mansour University of Haifa Department of Mathematics http://orcid.org/0000-0001-8028-2391
  • Mohammad Ali Rostami Friedrich Schiller University Jena Institute for Computer Science
  • Gnanadhass Britto Antony Xavier Sacred Heart College Department of Mathematics

DOI :

https://doi.org/10.5269/bspm.v37i2.29148

Mots-clés :

Zagreb index, Second Zagreb index, Hyper Zagreb index

Résumé

In this paper, we present and analyze the upper and lower bounds on the Hyper Zagreb index $\chi^2(G)$ of graph $G$ in terms of the number of vertices $(n)$, number of edges $(m)$, maximum degree $(\Delta)$, minimum degree $(\delta)$ and the inverse degree $(ID(G))$. In addition, we give a counter example on the upper bound  of the second Zagreb index for Theorems 2.2 and  2.4 from \cite{ranjini}. Finally, we present lower and upper bounds on $\chi^2(G)+\chi^2(\overline G)$, where $\overline G$ denotes the complement of $G$.

Biographies de l'auteur-e

  • Suresh Elumalai, Velammal Engineering College Department of Mathematics
    Assistant Professor, Department of Mathematics.
  • Toufik Mansour, University of Haifa Department of Mathematics
    Professor of mathematics
  • Mohammad Ali Rostami, Friedrich Schiller University Jena Institute for Computer Science
    Department of Computer Science
  • Gnanadhass Britto Antony Xavier, Sacred Heart College Department of Mathematics
    Associate Professor, Department of Mathematics

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Publié

2017-04-23

Numéro

Vol. 37 No. 2 (2019)

Rubrique

Research Articles

Licence

When the manuscript is accepted for publication, the authors agree automatically to transfer the copyright to the (SPM).

The journal utilize the Creative Common Attribution (CC-BY 4.0).

 

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