On Zagreb indices of graphs

Abstract

Let Gn be the set of class of graphs of order n. The first Zagreb index M1(G) is equal to the sum of squares of the degrees of the vertices, and the second Zagreb index M2(G) is equal to the sum of the products of the degrees of pairs of adjacent vertices of the underlying molecular graph G. The three set of graphs are as follows: eqnarray* &&A=\G∈ Gn:\,M1(G)n>M2(G)m\,~B=\G∈ Gn:\,M1(G)n=M2(G)m\ and && &&~~~~~~~~~~~~~~~~~~~~~~~~~C=\G∈ Gn:\,M1(G)n<M2(G)m\. eqnarray* In this paper we prove that |A|+|B|<|C|. Finally, we give a conjecture |A|<|B|.