Asymptotic Results on the Spectral Radius and the Diameter of Graphs

We study graphs with spectral radius at most $\frac{3}{2}\sqrt{2}$ and refine results by Woo and Neumaier [On graphs whose spectral radius is bounded by $\frac{3}{2}\sqrt{2}$, Graphs Combinatorics 23 (2007), 713-726]. We study the limit points of the spectral radii of certain families of graphs, and apply the results to the problem of minimizing the spectral radius among the graphs with a given number of vertices and diameter. In particular, we consider the cases when the diameter is about half the number of vertices, and when the diameter is near the number of vertices. We prove certain instances of a conjecture posed by Van Dam and Kooij [The minimal spectral radius of graphs with a given diameter, Linear Algebra Appl. 423 (2007), 408-419] and show that the conjecture is false for the other instances.

Keywords: graphs, spectral radius, diameter, limit points, quipus, $\sqrt{2+sqrt{5}}$, $\frac{3}{2}\sqrt{2}$

JEL Classification: C0

Suggested Citation: Suggested Citation

Cioaba, Sebastian and van Dam, Edwin and Koolen, Jack and Lee, Jae-Ho, Asymptotic Results on the Spectral Radius and the Diameter of Graphs (August 29, 2008). CentER Discussion Paper Series No. 2008-71, Available at SSRN: https://ssrn.com/abstract=1262243 or http://dx.doi.org/10.2139/ssrn.1262243