On the maximal Sombor index of quasi-tree graphs

Abstract

The Sombor index SO(G) of a graph G is the sum of the edge weights d2G(u)+d2G(v) of all edges uv of G, where dG(u) denotes the degree of the vertex u in G. A connected graph G = (V ,E) is called a quasi-tree, if there exists u∈ V (G) such that G-u is a tree. Denote Q(n,k)=\G: G is a quasi-tree graph of order n with G-u being a tree and dG(u)=k\. In this paper, we determined the maximum, the second maximum and the third maximum Sombor indices of all quasi-tree graphs in Q(n,k), respectively. Moreover, we characterized their corresponding extremal graphs, respectively.