论文信息 - Two new edge grafting operations on the energy of unicyclic graphs and their applications

Two new edge grafting operations on the energy of unicyclic graphs and their applications

Abstract The energy of a graph is the sum of the absolute values of the eigenvalues of its adjacency matrix. The edge grafting operation on a graph is a kind of edge moving between two vertices of the graph. In this paper, we introduce two new edge grafting operations and show how the graph energy changes under these edge grafting operations. Let G ( n ) be the set of all unicyclic graphs with n vertices. Using these edge grafting operations and the Coulson integral formula for the energy of a monic real polynomial, we characterize the unicyclic graphs with the first to the seventh minimal energies in G ( n ) ( n ≥ 11 ) .

Jianming Zhu

[1] Jia-Yu Shao,et al. New Approaches for the Real and Complex Integral Formulas of the Energy of a Polynomial , 2011 .

[2] I. Gutman. The Energy of a Graph: Old and New Results , 2001 .

[3] R. Balakrishnan. The energy of a graph , 2004 .

[4] Bo Zhou,et al. Minimal energy of unicyclic graphs of a given diameter , 2008 .

[5] Jia-Yu Shao,et al. An edge grafting theorem on the energy of unicyclic and bipartite graphs , 2010 .

[6] D. Cvetkovic,et al. Spectra of Graphs: Theory and Applications , 1997 .

[7] I. Gutman,et al. Mathematical Concepts in Organic Chemistry , 1986 .

[8] Yaoping Hou,et al. Unicyclic Graphs with Minimal Energy , 2001 .

[9] Ying Liu. Some results on energy of unicyclic graphs with n vertices , 2009 .

[10] Ivan Gutman,et al. Energy of a polynomial and the Coulson integral formula , 2010 .