Minimum rank and zero forcing number for butterfly networks
Abstract
The minimum rank of a simple graph G is the smallest possible rank over all symmetric real matrices A whose nonzero off-diagonal entries correspond to the edges of G. Using the zero forcing number, we prove that the minimum rank of the butterfly network is 19[(3r+1)2r+1-2(-1)r] and that this is equal to the rank of its adjacency matrix.
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