Edwin van Dam
| Date of Ph.D. defense: | October 4, 1996 |
| Title of thesis: | Graphs with Few Eigenvalues - An Interplay Between Combinatorics and Algebra |
| ISBN: | 90 5668 019 6 |
| Promotors: | Prof.dr. Stef Tijs and Dr.ir. Willem Haemers |
Abstract:
Two standard matrix representations of a graph are the adjacency matrix and the Laplace
matrix. The eigenvalues of these matrices are interesting parameters of the graph. Graphs with
few eigenvalues in general have nice combinatorial properties and a rich structure. A well
investigated family of such graphs comprises the strongly regular graphs (the regular graphs
with three eigenvalues), and we may see other graphs with few eigenvalues as algebraic
generalizations of such graphs. We study the (nonregular) graphs with three adjacency
eigenvalues, graphs with three Laplace eigenvalues, and regular graphs with four eigenvalues.
The last ones are also studied in relation with three-class association schemes. We also derive
bounds on the diameter and on the size of special subsets in terms of the eigenvalues of the
graph. Included are lists of feasible parameter sets of graphs with three Laplace eigenvalues,
regular graphs with four eigenvalues, and three-class association schemes.
Global / English