Hosoya and Harary polynomials of Zigzag and Triangular Benzenoid Systems

Ali Ashaq; Gao Wei; Ahmad Haseeb; Nazeer Waqas

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Hosoya and Harary polynomials of Zigzag and Triangular Benzenoid Systems

机译：Zigzag和三角形卵突系统的Hosoya和Herary多项式

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摘要

In the fields of chemical graph theory, topological index is a type of a molecular descriptor that is calculated based on the graph of a chemical compound. In 1947 Harry Wiener introduced "path number" which is now known as Wiener index and is the oldest topological index related to molecular branching. Hosoya polynomial plays a vital role in determining Wiener index. In this report, we compute the Hosoya polynomials for Zigzag and Triangular Benzenoid systems and recover Wiener and hyper Wiener indices from them.

机译：在化学图论领域，拓扑指数是一种基于化合物图计算的分子描述符。1947年，哈里·维纳（Harry Wiener）引入了“路径数”，现在被称为维纳指数，是与分子分支有关的最古老的拓扑指数。Hosoya多项式在确定维纳指数方面起着至关重要的作用。在本报告中，我们计算了Z字形和三角形苯系的Hosoya多项式，并从中恢复Wiener和超Wiener指数。

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来源
《Utilitas mathematica》 |2020年第1期|共29页
作者
Ali Ashaq; Gao Wei; Ahmad Haseeb; Nazeer Waqas;
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作者单位

Univ Lahore Dept Math &

Stat Lahore 54000 Pakistan;

Yunnan Normal Univ Sch Informat Sci &

Technol Kunming 650500 Yunnan Peoples R China;

COMSATS Univ Islamabad Dept Math Lahore 54000 Pakistan;

Univ Educ Div Sci &

Technol Lahore Pakistan;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Hosoya polynomial; Harary polynomial; Modified wiener index; Modified hyper wiener index; Generalized;

机译：Hosoya多项式;Harary多项式;改性维纳指数;改进的超维纳指数;广义;

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Hosoya and Harary polynomials of Zigzag and Triangular Benzenoid Systems

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