Extremal Collections of k-Uniform Vectors
Abstract
We show any matrix of rank r over Fq can have ≤ rk(q-1)k distinct columns of weight k if k ≤ Oq( r) (up to divisibility issues), and ≤ rk(q-1)r-k distinct columns of co-weight k if k ≤ Oq(r2/3). This shows the natural examples consisting of only r rows are optimal for both, and the proofs will recover some form of uniqueness of these examples in all cases.
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