THE MERRIFIELD-SIMMONS INDEX FOR THE LINEAR OCTAGONAL CHAINS

机译：线性八角形链的Merrifield-Simmons索引

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摘要

The Merrifield-Simmons index for a simple undirected graph G= (V,E) is given by the number of subsets U of V such that no two vertices in U are adjacent. This number is one of the most popular topological index in chemistry, which was firstly defined and called as the Fibonacci number of a graph. Octagonal chains are cata-condensed systems of octagons and represent a class of polycyclic conjugated hydrocarbons. In this contribution we obtain an exact formula for the Merrifield-Simmons index of linear octagonal chains.

机译：用于简单无向图G =（v，e）的Merrifield-Simmons索引由V的子集U给出，使得U中的两个顶点是相邻的。该号码是化学中最受欢迎的拓扑指数之一，首先定义并称为图形的斐波纳契数。八角形链是辛棒的CATA凝聚系统，代表一类多环共轭烃。在这一贡献中，我们获得了线性八角链的Merrifield-Simmons索引的确切公式。

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来源
《Conference on Applied Mathematics》|2019年|685-1359p|共8页
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SEIBERT Jaroslav; ZAHRADKA Jaromir;
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中图分类 O29-53;
关键词
Simple graph; Decomposition theorem; Difference equation; Octagonal chain; Linear chain; Merrifield-Simmons index;

机译：简单的图形;分解定理;差异方程;八角链;线性链;梅里菲尔德 - Simmons指标;

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4. THE MERRIFIELD-SIMMONS INDEX FOR THE LINEAR OCTAGONAL CHAINS [C] . SEIBERT Jaroslav, ZAHRADKA Jaromir Conference on Applied Mathematics . 2019

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THE MERRIFIELD-SIMMONS INDEX FOR THE LINEAR OCTAGONAL CHAINS

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