Some results on the Wiener index related to the Solt\'es problem of graphs

Abstract

The Wiener index, W(G), of a connected graph G is the sum of distances between its vertices. In 2021, Akhmejanova et al. posed the problem of finding graphs G with large Rm(G)= |\v∈ V(G)\,|\,W(G)-W(G-v)=m ∈ Z \|/ |V(G)|. It is shown that there is a graph G with Rm(G) > 1/2 for any integer m 0. In particular, there is a regular graph of even degree with this property for any odd m 1. The proposed approach allows to construct new families of graphs G with R0(G) → 1/2 when the order of G increases.

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