Optimal Combinatorial Neural Codes with Matched Metric δr: Characterization and Constructions

Abstract

Based on the theoretical neuroscience, G. Cotardo and A. Ravagnavi in CR introduced a kind of asymmetric binary codes called combinatorial neural codes (CN codes for short), with a "matched metric" δr called asymmetric discrepancy, instead of the Hamming distance dH for usual error-correcting codes. They also presented the Hamming, Singleton and Plotkin bounds for CN codes with respect to δr and asked how to construct the CN codes with large size || and δr(). In this paper we firstly show that a binary code reaches one of the above bounds for δr() if and only if reaches the corresponding bounds for dH and r is sufficiently closed to 1. This means that all optimal CN codes come from the usual optimal codes. %(perfect codes, MDS codes or the codes meet the usual Plotkin bound). Secondly we present several constructions of CN codes with nice and flexible parameters (n,K, δr()) by using bent functions.

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