On the difference between the Szeged and the Wiener index
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摘要
We prove a conjecture of Nadjafi-Arani et al. on the difference between the Szeged and the Wiener index of a graph (Nadjafi-Aranifi et al., 2012). Namely, if G is a 2-connected non-complete graph on n vertices, then Sz(G)−W(G)≥2n−6. Furthermore, the equality is obtained if and only if G is the complete graph Kn−1 with an extra vertex attached to either 2 or n−2 vertices of Kn−1. We apply our method to strengthen some known results on the difference between the Szeged and the Wiener index of bipartite graphs, graphs of girth at least five, and the difference between the revised Szeged and the Wiener index. We also propose a stronger version of the aforementioned conjecture.
论文关键词:Wiener index,Szeged index,Revised Szeged index,Szeged–Wiener relation
论文评审过程:Received 16 March 2016, Revised 8 May 2017, Accepted 10 May 2017, Available online 2 June 2017, Version of Record 2 June 2017.
论文官网地址:https://doi.org/10.1016/j.amc.2017.05.047