Discriminating and Identifying Codes in the Binary Hamming Space

Abstract

Let Fn be the binary n-cube, or binary Hamming space of dimension n, endowed with the Hamming distance, and En (respectively, On) the set of vectors with even (respectively, odd) weight. For r≥ 1 and x∈ Fn, we denote by Br(x) the ball of radius r and centre x. A code C⊂eq Fn is said to be r-identifying if the sets Br(x) C, x∈ Fn, are all nonempty and distinct. A code C⊂eq En is said to be r-discriminating if the sets Br(x) C, x∈ On, are all nonempty and distinct. We show that the two definitions, which were given for general graphs, are equivalent in the case of the Hamming space, in the following sense: for any odd r, there is a bijection between the set of r-identifying codes in Fn and the set of r-discriminating codes in Fn+1. We then extend previous studies on constructive upper bounds for the minimum cardinalities of identifying codes in the Hamming space.

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