ScienceDirect - Discrete Applied Mathematics : Randić ordering of chemical trees

Discrete Applied Mathematics
Volume 150, Issues 1-3, 1 September 2005, Pages 232-250

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doi:10.1016/j.dam.2005.02.014

Randić ordering of chemical trees

Juan Rada and Carlos Uzcátegui

Departamento de Matemáticas, Facultad de Ciencias, Universidad de Los Andes, 5101 Mérida, Venezuela

Received 21 May 2003;

revised 4 November 2004;

accepted 15 February 2005.

Available online 23 May 2005.

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Abstract

We study the behavior of the Randić index χ subject to the operation on a tree T which creates a new tree T^′≠T by deleting an edge ax of T and adding a new edge incident to either a or x. Let _mso be the smallest poset containing all pairs (T,T^′) such that χ(T)<χ(T^′) and (where is the collection of trees with n vertices and of maximum degree 4). We will determine the maximal and minimal elements of . We present an algorithm to construct χ-monotone chains of trees T₀,T₁,T₂,…,T_m such that T_i_msoT_i+1. As a corollary of our results, we present a new method to calculate the first values of χ on .