JOURNAL ARTICLE
基于圈收缩的图的(Sum-)Balaban指标
Abstract
$连通图G的Balaban指标(也叫J指标)的定义是 $ J\left( G \right) = \frac{m}{{m - n + 2}}\sum\limits_{uv \in E\left( G \right)} {\frac{1}{{\sqrt {{\sigma _G}\left( u \right){\sigma _G}\left( v \right)} }}} $ 连通图G的Sum-Balaban指标定义为 $ SJ\left( G \right) = \frac{m}{{m - n + 2}}\sum\limits_{uv \in E\left( G \right)} {\frac{1}{{\sqrt {{\sigma _G}\left( u \right) + {\sigma _G}\left( v \right)} }}} $ 其中m,n分别是图G的边数和点数,σG(u)表示G中从顶点u到其它各个顶点的距离之和.Balaban指标和Sum-Balaban指标被广泛应用于QSAR和QSPR的研究.证明了:经过圈收缩后,一类单圈图的Balaban指标和Sum-Balaban指标是增大的.观察Balaban指标和Sum-Balaban指标在圈收缩操作中的变化规律,对这两类拓扑指标提出了一种新的比较方法.$
Keywords:
Combinatorics Sigma Mathematics Physics Quantum mechanics
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Topics
Computational Drug Discovery Methods
Physical Sciences → Computer Science → Computational Theory and Mathematics
Rough Sets and Fuzzy Logic
Physical Sciences → Computer Science → Computational Theory and Mathematics
Fuzzy and Soft Set Theory
Social Sciences → Decision Sciences → Management Science and Operations Research
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Journal: Laser & Optoelectronics Progress Year: 2024 Vol: 61 (24)Pages: 2437004-2437004