Some Inequalities for the First General Zagreb Index of Graphs and Line Graphs

Abstract

The first general Zagreb index \(M^{\alpha }_{1}(G)\) of a graph G is equal to the sum of the \(\alpha \)th powers of the vertex degrees of G. For \(\alpha \ge 0\) and \(k \ge 1\), we obtain the lower and upper bounds for \(M^{\alpha }_{1}(G)\) and \(M^{\alpha }_{1}(L(G))\) in terms of order, size, minimum/maximum vertex degrees and minimal non-pendant vertex degree using some classical inequalities and majorization technique, where L(G) is the line graph of G. Also, we obtain some bounds and exact values of \(M^{\alpha }_{1}(J(G))\) and \(M^{\alpha }_{1}(L^{k}(G))\), where J(G) is a jump graph (complement of a line graph) and \(L^{k}(G)\) is an iterated line graph of a graph G.