On a Conjecture Concerning the Complementary Second Zagreb Index

Abstract

The complementary second Zagreb index of a graph G is defined as cM2(G)=Σuv∈ E(G)|(du(G))2-(dv(G))2|, where du(G) denotes the degree of a vertex u in G and E(G) represents the edge set of G. Let G* be a graph having the maximum value of cM2 among all connected graphs of order n. Furtula and Oz [MATCH Commun. Math. Comput. Chem. 93 (2025) 247--263] conjectured that G* is the join Kk+Kn-k of the complete graph Kk of order k and the complement Kn-k of the complete graph Kn-k such that the inequality k< n/2 holds. We prove that (i) the maximum degree of G* is n-1 and (ii) no two vertices of minimum degree in G* are adjacent; both of these results support the aforementioned conjecture. We also prove that the number of vertices of maximum degree in G*, say k, is at most -23n+32+1652n2-132n+81, which implies that k<5352n/10000. Furthermore, we establish results that support the conjecture under consideration for certain bidegreed and tridegreed graphs. In the aforesaid paper, it was also mentioned that determining the k as a function of the n is far from being an easy task; we obtain the values of k for 5 n 149 in the case of certain bidegreed graphs by using computer software and found that the resulting sequence of the values of k does not exist in "The On-Line Encyclopedia of Integer Sequences" (an online database of integer sequences).