On Weighted Vertex and Edge Mostar Index for Trees and Cacti with Fixed Parameter

IF 1 Q1 MATHEMATICS European Journal of Pure and Applied Mathematics Pub Date : 2023-07-30 DOI:10.29020/nybg.ejpam.v16i3.4722

Farwa Asmat, Humaira Asmat, Sameh E Askar, H. Ahmad, Muhammad Ijaz Khan

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Abstract

It was introduced by Doˇsli ́c and Ivica et al. (Journal of Mathematical chemistry, 56(10) (2018): 2995–3013), as an innovative graph-theoretic topological identifier, the Mostar index is significant in simulating compounds’ thermodynamic properties in simulations, which is defined as sum of absolute values of the differences among nu(e|Ω) and nv(e|Ω) over all lines e = uv ∈ Ω, where nu(e|Ω) (resp. nv(e|Ω)) is the collection of vertices of Ω closer to vertex u (resp. v) than to vertex v (resp. u). Let C(n, k) be the set of all n-vertex cacti graphs with exactly k cycles and T(n, d) be the set of all n-vertex tree graphs with diameter d. It is said that a cacti is a connected graph with blocks that comprise of either cycles or edges. Beginning with the weighted Mostar index of graphs, we developed certain transformations that either increase or decrease index. To advance this analysis, we determine the extreme graphs where the maximum and minimum values of the weighted edge Mostar index are accomplished. Moreover, we compute the maximum weighted vertex Mostar invariant for trees with order n and fixed diameter d.

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固定参数树和仙人掌的加权顶点和边Mostar指数

Mostar指数是由Do + sli + c和Ivica等人提出的(Journal of Mathematical chemistry, 56(10)(2018): 2995-3013)，作为一种创新的图论拓扑标识符，它在模拟化合物的热力学性质方面具有重要意义，它被定义为所有直线e = uv∈Ω上nu(e|Ω)和nv(e|Ω)之间的差值的绝对值之和，其中nu(e|Ω)(代表p = uv∈Ω)。Nv (e|Ω))是离顶点u (resp. 0)更近的Ω的顶点集合。V)比到顶点V (p。设C(n, k)为所有恰好有k个环的n顶点仙人掌图的集合，T(n, d)为所有直径为d的n顶点树图的集合。我们说仙人掌是一个连通图，其块由环或边组成。从图的加权Mostar指数开始，我们开发了一些增加或减少指数的转换。为了推进这一分析，我们确定了加权边Mostar指数的最大值和最小值实现的极值图。此外，我们还计算了n阶且直径为d的树的最大加权顶点Mostar不变量。

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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