可变拓扑指数的新界限及其应用

IF 1.7 3区 化学 Q3 CHEMISTRY, MULTIDISCIPLINARY
Ana Granados, Ana Portilla, Yamilet Quintana, Eva Tourís
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引用次数: 0

摘要

与分子图有关的最重要信息之一是确定(在可能的情况下)其相应拓扑指数的上下限。通过这些界限可以确定拓扑指数在分子结构参数方面的大致范围。本文旨在提供与几类可变拓扑指数相关的新不等式,包括第一和第二一般萨格勒布指数、一般和连接性指数以及可变逆和 deg 指数。此外,还发现了第一一般萨格勒布指数的逆度上下限。此外,还获得了极值图在许多这些不等式方面的特征。最后,还给出了一些应用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

New bounds for variable topological indices and applications

New bounds for variable topological indices and applications

One of the most important information related to molecular graphs is given by the determination (when possible) of upper and lower bounds for their corresponding topological indices. Such bounds allow to establish the approximate range of the topological indices in terms of molecular structural parameters. The purpose of this paper is to provide new inequalities relating several classes of variable topological indices including the first and second general Zagreb indices, the general sum-connectivity index, and the variable inverse sum deg index. Also, upper and lower bounds on the inverse degree in terms of the first general Zagreb are found. Moreover, the characterization of extremal graphs with respect to many of these inequalities is obtained. Finally, some applications are given.

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来源期刊
Journal of Mathematical Chemistry
Journal of Mathematical Chemistry 化学-化学综合
CiteScore
3.70
自引率
17.60%
发文量
105
审稿时长
6 months
期刊介绍: The Journal of Mathematical Chemistry (JOMC) publishes original, chemically important mathematical results which use non-routine mathematical methodologies often unfamiliar to the usual audience of mainstream experimental and theoretical chemistry journals. Furthermore JOMC publishes papers on novel applications of more familiar mathematical techniques and analyses of chemical problems which indicate the need for new mathematical approaches. Mathematical chemistry is a truly interdisciplinary subject, a field of rapidly growing importance. As chemistry becomes more and more amenable to mathematically rigorous study, it is likely that chemistry will also become an alert and demanding consumer of new mathematical results. The level of complexity of chemical problems is often very high, and modeling molecular behaviour and chemical reactions does require new mathematical approaches. Chemistry is witnessing an important shift in emphasis: simplistic models are no longer satisfactory, and more detailed mathematical understanding of complex chemical properties and phenomena are required. From theoretical chemistry and quantum chemistry to applied fields such as molecular modeling, drug design, molecular engineering, and the development of supramolecular structures, mathematical chemistry is an important discipline providing both explanations and predictions. JOMC has an important role in advancing chemistry to an era of detailed understanding of molecules and reactions.
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