New improved lower bounds for Zagreb indices of graphs

Abstract

This paper presents new lower bounds for the first general Zagreb index Zα(G) involving two, three, and four arbitrary degrees of vertices of a simple graph G. For the special cases α = 2 and α = -2, the results give sharper bounds for the first Zagreb index M1(G) and the modified first Zagreb index mM1(G), thereby improving several well-known inequalities in the literature. Furthermore, some applications of the derived bounds for M1(G) are demonstrated, establishing new bounds for the second Zagreb index, the spectral radius, Nordhaus-Gaddum type bounds, and their corresponding coindices.