Zero forcing sets and the minimum rank of graphs
- Holst, van der, H.
- Barioli, F.
- Barrett, W.
- Butler, S.
- Cioaba, S.M.
- Cvetkovic, D.M.
- Fallat, S.M.
- Godsil, C.D.
- Haemers, W.H.
- Hogben, L.
- Mikkelson, R.
- Narayan, S.
- Pryporova, O.
- Sciriha, I.
- So, W.
- Stevanovic, D.
- Vander Meulen, K.N.
- Wangsness Wehe, A.
Publication date
January 2008
DOIAbstract
The minimum rank of a simple graph G is defined to be the smallest possible rank over all symmetric real matrices whose ijth entry (for i¿j) is nonzero whenever {i,j} is an edge in G and is zero otherwise. This paper introduces a new graph parameter, Z(G), that is the minimum size of a zero forcing set of vertices and uses it to bound the minimum rank for numerous families of graphs, often enabling computation of the minimum rank
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