On the number of error correcting codes
Abstract
We show that for a fixed q, the number of q-ary t-error correcting codes of length n is at most 2(1 + o(1)) Hq(n,t) for all t ≤ (1 - q-1)n - Cqn n (for sufficiently large constant Cq), where Hq(n, t) = qn / Vq(n,t) is the Hamming bound and Vq(n,t) is the cardinality of the radius t Hamming ball. This proves a conjecture of Balogh, Treglown, and Wagner, who showed the result for t = o(n1/3 ( n)-2/3).
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