A note on chemical trees with minimum Wiener polarity index
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摘要
The Wiener polarity index (usually denoted by Wp) of a graph G is defined as the number of unordered pairs of the vertices of G which are at distance 3. Denote by CTn the family of all n-vertex chemical trees. In a recent paper, Ashrafi and Ghalavand [1] determined the first three minimum Wp values of n-vertex chemical trees for n ≥ 7 and characterized the chemical trees attaining the first two minimum Wp values among all the members of CTn for n ≥ 4. In this note, the chemical trees with the third minimum Wp value are characterized from the graph family CTn for n ≥ 7, and the chemical trees from the family CTn, n ≥ 4, with the first two minimum Wp values are also obtained in an alternative but shorter way.
论文关键词:Chemical graph theory,Topological index,Wiener polarity index,Chemical tree,Extremal value
论文评审过程:Received 24 August 2017, Revised 20 April 2018, Accepted 22 April 2018, Available online 16 May 2018, Version of Record 16 May 2018.
论文官网地址:https://doi.org/10.1016/j.amc.2018.04.051