Minimum number of distinct eigenvalues of graphs

Date

2013-09

Authors

Ahmadi, Bahman
Alinaghipour, Fatemeh
Cavers, Michael
Fallat, Shaun
Meagher, Karen
Nasserasr, Shahla

Journal Title

Journal ISSN

Volume Title

Publisher

International Linear Algebra Society

Abstract

The minimum number of distinct eigenvalues, taken over all real symmetric matrices compatible with a given graph G, is denoted by q(G). Using other parameters related to G, bounds for q(G) are proven and then applied to deduce further properties of q(G). It is shown that there is a great number of graphs G for which q(G) = 2. For some families of graphs, such as the join of a graph with itself, complete bipartite graphs, and cycles, this minimum value is obtained. Moreover, examples of graphs G are provided to show that adding and deleting edges or vertices can dramatically change the value of q(G). Finally, the set of graphs G with q(G) near the number of vertices is shown to be a subset of known families of graphs with small maximum multiplicity.

Description

Keywords

diameter, eigenvalue

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