Asymptotic Improvement of the Gilbert-Varshamov Bound on the Size of Binary Codes

Abstract

Given positive integers n and d, let A2(n,d) denote the maximum size of a binary code of length n and minimum distance d. The well-known Gilbert-Varshamov bound asserts that A2(n,d) ≥ 2n/V(n,d-1), where V(n,d) = Σi=0d n i is the volume of a Hamming sphere of radius d. We show that, in fact, there exists a positive constant c such that A2(n,d) ≥ c 2nV(n,d-1) 2 V(n,d-1) whenever d/n 0.499. The result follows by recasting the Gilbert- Varshamov bound into a graph-theoretic framework and using the fact that the corresponding graph is locally sparse. Generalizations and extensions of this result are briefly discussed.

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