The rank of random regular digraphs of constant degree
Abstract
Let d be a fixed large integer. For any n larger than d, let An be the adjacency matrix of the random directed d-regular graph on n vertices, with the uniform distribution. We show that An has rank at least n-1 with probability going to one as n goes to infinity. The proof combines the method of simple switchings and a recent result of the authors on delocalization of eigenvectors of An.
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