Greedy trees have minimum Sombor indices

Abstract

Recently, Gutman [MATCH Commun. Math. Comput. Chem. 86 (2021) 11-16] defined a new graph invariant which is named the Sombor index SO(G) of a graph G and is computed via the expression \[ SO(G) = Σu v deg(u)2 + deg(v)2 , \] where deg(u) represents the degree of the vertex u in G and the summing is performed across all the unordered pairs of adjacent vertices u and v. Here we take into consideration the set of all the trees TD that have a specified degree sequence D and show that the greedy tree attains the minimum Sombor index on the set TD.

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