On the rank of a random binary matrix

Abstract

We study the rank of the random n× m 0/1 matrix An,m;k where each column is chosen independently from the set n,k of 0/1 vectors with exactly k 1's. Here 0/1 are the elements of the field GF2. We obtain an asymptotically correct estimate for the rank in terms of c,n,k, assuming that m=cn. In addition, we assign i.i.d. U[0,1] weights X c, c∈n,k and let the weight of a set of columns C be X(C)=Σ c∈ CX c. Let a basis be a set of n-1keven linearly independent columns. We obtain an asymptotically correct estimate for the minimum weight of a basis. This generalises the well-known result for k=2 viz. that the expected length of a minimum weight spanning tree tends to ζ(3).