Some New Multiplicative Geometric-Arithmetic Indices

AUTHOR AND
AFFILIATION

V.R. KULLI
Department of Mathematics Gulbarga University, Gulbarga 585106, India

Corresponding Author Email: vrkulli@gmail.com

KEYWORDS:

molecular graph, fifth multiplicative geometric-arithmetic index, nanostructures. Mathematics Subject Classification: 05C05, 05C12, 05C35

Issue Date:

February, 2017

Pages:

52-57

ISSN:

2319-8044 (Online) – 2231-346X (Print)

Source:

Vol.29 – No.2

PDF

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DOI:

http://dx.doi.org/10.22147/jusps-A/290201

ABSTRACT:

In this paper, we propose some new topological indices: second, third, fourth and fifth multiplicative geometricarithmetic indices of a molecular graph. A topological index is a numeric quantity from the structural graph of a molecule. Here, we compute the fifth multiplicative geometric arithmetic index of line graphs of subdivision graphs of 2D-lattice, nanotube and nanotorus of TUC4C8[p,q].

Copy the following to cite this Article:

V.R. KULLI, “Some New Multiplicative Geometric-Arithmetic Indices”, Journal of Ultra Scientist of Physical Sciences, Volume 29, Issue 2, Page Number 52-57, 2017


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V.R. KULLI, “Some New Multiplicative Geometric-Arithmetic Indices”, Journal of Ultra Scientist of Physical Sciences, Volume 29, Issue 2, Page Number 52-57, 2017
Available from: http://www.ultrascientist.org/paper/759/some-new-multiplicative-geometric-arithmetic-indices


In this paper, we propose some new topological indices: second, third, fourth and fifth multiplicative geometricarithmetic indices of a molecular graph. A topological index is a numeric quantity from the structural graph of a molecule. Here, we compute the fifth multiplicative geometric arithmetic index of line graphs of subdivision graphs of 2D-lattice, nanotube and nanotorus of TUC4C8[p,q].