Equiseparability on Terminal Wiener Index and Distances

TL;DR

This paper introduces a novel method for constructing trees that are equiseparable with respect to the terminal Wiener index, focusing on distance parameters rather than pendent vertices, to better understand chemical compound similarities.

Contribution

It presents a new approach for creating equiseparable trees based on distance parameters, advancing the methods used in mathematical chemistry.

Findings

New method for constructing equiseparable trees

Focus on distance parameters over pendent vertices

Potential for improved chemical property prediction

Abstract

Teminal Wiener index is one of the commonly used topological index in mathematical chemistry. If two or more chemical compounds have the same terminal Wiener index then they will have similar physico-chemical properties. In this work we propose a new method for constructing equiseparable trees w.r.t terminal Wiener index. The existing method is based on the number of pendent vertices but the proposed method is based on distance parameters.