Distance-Based Topological Descriptors on Ternary Hypertree Networks

Yun Yu; D. Antony Xavier; Eddith Sarah Varghese; Deepa Mathew; Muhammad Kamran Siddiqui; Samuel Asefa Fufa

doi:10.1155/2022/4634326

Complexity (Jan 2022)

Distance-Based Topological Descriptors on Ternary Hypertree Networks

Yun Yu,
D. Antony Xavier,
Eddith Sarah Varghese,
Deepa Mathew,
Muhammad Kamran Siddiqui,
Samuel Asefa Fufa

Affiliations

Yun Yu: School of Big Data and Artificial Intelligence
D. Antony Xavier: Department of Mathematics
Eddith Sarah Varghese: Department of Mathematics
Deepa Mathew: Department of Mathematics
Muhammad Kamran Siddiqui: Department of Mathematics
Samuel Asefa Fufa: Department of Mathematics

DOI: https://doi.org/10.1155/2022/4634326
Journal volume & issue: Vol. 2022

Abstract

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Topological indices are numeric parameters which portray the topology of a subatomic structure. In QSAR/QSPR analysis, topological descriptors play a vital role to examine the topology of a network. An interconnection network is a structure whose components are connected physically according to some pattern. In this paper, an interconnection network, ternary hypertree, which is a structural combination of complete ternary tree and hypertree, is introduced. We have evaluated the topological descriptors grounded on the distances for the ternary hypertree. The analytical expressions for Wiener, different types of Szeged, and Mostar indices are determined.

Published in Complexity

ISSN: 1076-2787 (Print); 1099-0526 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: https://onlinelibrary.wiley.com/journal/8503

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