Wayne Barrett, Jason Grout, Raphael Loewy
Published 2006-12-12, updated 2008-09-03Version 3
Our main result is a sharp bound for the number of vertices in a minimal forbidden subgraph for the graphs having minimum rank at most 3 over the finite field of order 2. We also list all 62 such minimal forbidden subgraphs. We conclude by exploring how some of these results over the finite field of order 2 extend to arbitrary fields and demonstrate that at least one third of the 62 are minimal forbidden subgraphs over an arbitrary field for the class of graphs having minimum rank at most 3 in that field.
Comments: 40 pages, added Sage program and improvements from referee process
The minimum rank problem over finite fields
Sandpile groups of generalized de Bruijn and Kautz graphs and circulant matrices over finite fields
On the minimum rank of a graph over finite fields
![QR code for arXiv:math/0612331 [math.CO]](http://oss.arxitics.com/images/favicon.svg)