Abstract
A set D of vertices in a graph G is a dominating set of G if every vertex not in D is adjacent to a vertex in D. The domination number, gamma(G), is the minimum cardinality among all dominating sets of G. The degree, degG(v), of a vertex v in G is the number of vertices adjacent to v in G, and the connection number, tau G(v), of v in G is the number of vertices at distance 2 from v in G. The first Zagreb and modified Zagreb connection indices of G are defined by ZC1(G)=& sum;v is an element of V(G)tau G2(v) and MZC1(G)=& sum;v is an element of V(G)degG(v)tau G(v), respectively. We obtain new upper bounds for the first and modified Zagreb connection indices of a tree in terms of the its order, the number of leaves and the domination number, and we characterize the extremal trees that achieve equality in the obtained bounds. These results improve results of Raza and Akhter [Chaos, Solitons and Fractals 169 (2023) 113242].