Primal-dual distance bounds of linear codes with application to cryptography
Abstract
Let N(d,d) denote the minimum length n of a linear code C with d and d, where d is the minimum Hamming distance of C and d is the minimum Hamming distance of C. In this paper, we show a lower bound and an upper bound on N(d,d). Further, for small values of d and d, we determine N(d,d) and give a generator matrix of the optimum linear code. This problem is directly related to the design method of cryptographic Boolean functions suggested by Kurosawa et al.
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