November 22, 2024
Reza Sharafdini

Reza Sharafdini

Academic Rank: Associate professor
Address:
Degree: Ph.D in Mathematics - Algebra
Phone: 77-31222750
Faculty: Faculty of Intelligent Systems and Data Science

Research

Title Wiener Polarity Index of Tensor Product of Graphs
Type Article
Keywords
Journal Mathematics Interdisciplinary Research
DOI
Researchers Mojgan Mogharrab (First researcher) , Reza Sharafdini (Second researcher) ,

Abstract

Mathematical chemistry is a branch of theoretical chemistry for discussion and prediction of the molecular structure using mathematical methods without necessarily referring to quantum mechanics. In theoretical chemistry, distance-based molecular structure descriptors are used for modeling physical, pharmacologic, biological and other properties of chemical compounds. The Wiener Polarity index of a graph G, denoted by WP (G), is the number of unordered pairs of vertices of distance 3. The Wiener polarity index is used to demonstrate quantitative structure-property relationships in a series of acyclic and cycle-containing hydrocarbons. Let G and H be two simple connected graphs, then the tensor product of them is denoted by G H whose vertex set is V (G H) = V (G)  V (H) and edge set is E (G H) = f(a; b) (c; d) j ac 2 E (G) ; bd 2 E (H)g. In this paper, we aim to compute the Wiener polarity index of G H which was computed wrongly in [J. Ma, Y. Shi and J. Yue, The Wiener polarity index of graph products, Ars Combin. 116 (2014) 235-244].