Hosoya and Harary Polynomials of Hourglass and Rhombic Benzenoid Systems

Zhong-Lin Cheng; Ashaq Ali; Haseeb Ahmad; Asim Naseem; Maqbool Ahmad Chaudhary

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Hosoya and Harary Polynomials of Hourglass and Rhombic Benzenoid Systems

机译：Hosoya和Harary of South Glass和Herary多项式系统

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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 hourglass and rhombic benzenoid systems and recover Wiener and hyper-Wiener indices from them.

机译：在化学图理论的领域中，拓扑指数是基于化合物图计算的分子描述符的类型。 1947年，Harry Wiener推出了“路径编号”，现在称为Wiener指数，是与分子分支相关的最古老的拓扑指数。 Hosoya多项式在确定维纳指数方面发挥着至关重要的作用。在本报告中，我们将Hosoya多项式用于沙漏和菱形卵形系统，并从中恢复维纳和超级维纳指数。

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《Journal of Chemistry》 |2020年第4期|共14页
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Zhong-Lin Cheng; Ashaq Ali; Haseeb Ahmad; Asim Naseem; Maqbool Ahmad Chaudhary;
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入库时间 2022-08-19 00:46:21

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机译：Hosoya和Harary of South Glass和Herary多项式系统

Hosoya and Harary Polynomials of Hourglass and Rhombic Benzenoid Systems

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