Minimizing Degree-based Topological Indices for Trees with Given Number of Pendent Vertices + Erratum

Abstract

We derive sharp lower bounds for the first and the second Zagreb indices (M1 and M2 respectively) for trees and chemical trees with the given number of pendent vertices and find optimal trees. M1 is minimized by a tree with all internal vertices having degree 4, while M2 is minimized by a tree where each "stem" vertex is incident to 3 or 4 pendent vertices and one internal vertex, while the rest internal vertices are incident to 3 other internal vertices. The technique is shown to generalize to the weighted first Zagreb index, the zeroth order general Randi\'c index, as long as to many other degree-based indices. Later the erratum was added: Theorem 3 says that the second Zagreb index M2 cannot be less than 11n-27 for a tree with n 8 pendent vertices. Yet the tree exists with n=8 vertices (the two-sided broom) violating this inequality. The reason is that the proof of Theorem 3 relays on a tacit assumption that an index-minimizing tree contains no vertices of degree 2. This assumption appears to be invalid in general. In this erratum we show that the inequality M2 11n-27 still holds for trees with n 9 vertices and provide the valid proof of the (corrected) Theorem 3.