Inverse Problem for Leap Zagreb Indices

Q3 Engineering

推进技术 Pub Date : 2023-12-03 DOI:10.52783/tjjpt.v44.i5.2767

Asfiya Ferdose, K. Shivashankara

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Abstract

The structure of a chemical compound is usually modelled as a graph, which is so-called a molecular graph. It has been found that some topological indices of a molecular graph are closely related to many physicochemical properties of its chemical compounds. From this relation, it arises the important inverse topological indices problem, that carry out a thorough search of the existence of a graph having its index value equal to a given integer. In this paper, we are interested in solving this problem for the first, second and third leap Zagreb indices of connected graphs. We are also restricting the solutions to trees and unicyclic graphs. It is shown that for every even non-negative integer k there exists a graph having its first leap Zagreb index value equal to k. For every non-negative integer k, except 2, there exists a graph having its second leap Zagreb index value equal to k and for every non-negative integer k, except 1, 3, 5, 7, 9, 11, 17, there exists a graph having its third leap Zagreb index value equal to k. The general formulas of leap Zagreb indices values for some certain trees and unicyclic graphs which are useful in this work are presented.

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闰年萨格勒布指数的逆问题

化合物的结构通常用图来表示，即所谓的分子图。研究发现，分子图的一些拓扑指标与其化合物的许多物理化学性质密切相关。从这一关系中，产生了重要的逆拓扑指标问题，它对索引值等于给定整数的图的存在性进行了彻底的搜索。本文研究了连通图的一、二、三跃萨格勒布指数的这一问题。我们也将解限制为树和单环图。证明了对于每一个偶非负整数k存在一个图，其第一次跳跃的萨格勒布索引值等于k，对于每一个非负整数k，除了2，存在一个图，其第二次跳跃的萨格勒布索引值等于k，对于每一个非负整数k，除了1,3,5,7,9,11,17，存在第三跳萨格勒布指标值等于k的图。给出了某些树和单环图的跳萨格勒布指标值的一般公式，这对本文的工作是有用的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

推进技术 Engineering-Aerospace Engineering

CiteScore

1.40

自引率

0.00%

发文量

6610

期刊介绍：