An Algebraic Approach of Topological Indices Connected with Finite Quasigroups

IF 1.9 3区数学 Q1 MATHEMATICS

Journal of Function Spaces Pub Date : 2024-04-20 DOI:10.1155/2024/1948465

Muhammad Nadeem, Md. Ashraful Alam, Nwazish Ali, M. I. Elashiry

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引用次数: 0

Abstract

In mathematical chemistry, the algebraic polynomial serves as essential for calculating the most accurate expressions of distance-based, degree-distance-based, and degree-based topological indices. The chemical reactivity of molecules, which includes their tendency to engage in particular chemical processes or go through particular reactions, can be predicted using topological indices. Considerable effort has been put into examining the many topological descriptors of simple graphs using ring structures and well-known groups instead of nonassociative algebras, quasigroups, and loops. Both finite quasigroups and loops are the generalizations of groups. In this article, we calculate topological descriptors and some well-known polynomials, -polynomial, Hosoya’s polynomial, Schultz’s polynomial, and modified Schultz polynomial of finite relatively prime graphs of most orders connected with two classes of quasigroups and go through their graphical aspects.

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与有限准群相关的拓扑索引代数方法

在数学化学中，代数多项式是计算基于距离的拓扑指数、基于度数的拓扑指数和基于度数的拓扑指数的最准确表达式的基本要素。分子的化学反应性，包括其参与特定化学过程或经历特定反应的倾向，可以用拓扑指数来预测。在研究简单图形的许多拓扑描述符时，人们花费了大量精力，使用环结构和众所周知的群，而不是非关联代数、准群和环。有限准群和环都是群的一般化。在本文中，我们计算了与两类准群相连的大多数阶的有限相对素数图的拓扑描述符和一些著名的多项式、-多项式、细谷多项式、舒尔茨多项式和修正的舒尔茨多项式，并对它们的图形方面进行了研究。

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

Journal of Function Spaces MATHEMATICS, APPLIEDMATHEMATICS -MATHEMATICS

CiteScore

4.10

自引率

10.50%

发文量

451

审稿时长

15 weeks

期刊介绍： Journal of Function Spaces (formerly titled Journal of Function Spaces and Applications) publishes papers on all aspects of function spaces, functional analysis, and their employment across other mathematical disciplines. As well as original research, Journal of Function Spaces also publishes focused review articles that assess the state of the art, and identify upcoming challenges and promising solutions for the community.