English

On a Conjecture Concerning the Complementary Second Zagreb Index

Combinatorics 2025-01-03 v1

Abstract

The complementary second Zagreb index of a graph GG is defined as cM2(G)=uvE(G)(du(G))2(dv(G))2cM_2(G)=\sum_{uv\in E(G)}|(d_u(G))^2-(d_v(G))^2|, where du(G)d_u(G) denotes the degree of a vertex uu in GG and E(G)E(G) represents the edge set of GG. Let GG^* be a graph having the maximum value of cM2cM_2 among all connected graphs of order nn. Furtula and Oz [MATCH Commun. Math. Comput. Chem. 93 (2025) 247--263] conjectured that GG^* is the join Kk+KnkK_k+\overline{K}_{n-k} of the complete graph KkK_k of order kk and the complement Knk\overline{K}_{n-k} of the complete graph KnkK_{n-k} such that the inequality k<n/2k<\lceil n/2 \rceil holds. We prove that (i) the maximum degree of GG^* is n1n-1 and (ii) no two vertices of minimum degree in GG^* are adjacent; both of these results support the aforementioned conjecture. We also prove that the number of vertices of maximum degree in GG^*, say kk, is at most 23n+32+1652n2132n+81-\frac{2}{3}n+\frac{3}{2}+\frac{1}{6}\sqrt{52n^2-132n+81}, which implies that k<5352n/10000k<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 kk as a function of the nn is far from being an easy task; we obtain the values of kk for 5n1495\le n\le 149 in the case of certain bidegreed graphs by using computer software and found that the resulting sequence of the values of kk does not exist in "The On-Line Encyclopedia of Integer Sequences" (an online database of integer sequences).

Keywords

Cite

@article{arxiv.2501.01295,
  title  = {On a Conjecture Concerning the Complementary Second Zagreb Index},
  author = {Hicham Saber and Tariq Alraqad and Akbar Ali and Abdulaziz M. Alanazi and Zahid Raza},
  journal= {arXiv preprint arXiv:2501.01295},
  year   = {2025}
}

Comments

13 pages, 1 figure

R2 v1 2026-06-28T20:54:39.706Z