Abstract
AbstractWe show that for a fixed
$q$
, the number of
$q$
-ary
$t$
-error correcting codes of length
$n$
is at most
$2^{(1 + o(1)) H_q(n,t)}$
for all
$t \leq (1 - q^{-1})n - 2\sqrt{n \log n}$
, where
$H_q(n, t) = q^n/ V_q(n,t)$
is the Hamming bound and
$V_q(n,t)$
is the cardinality of the radius
$t$
Hamming ball. This proves a conjecture of Balogh, Treglown, and Wagner, who showed the result for
$t = o(n^{1/3} (\log n)^{-2/3})$
.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Computational Theory and Mathematics,Statistics and Probability,Theoretical Computer Science
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