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Designs, Codes and Cryptography

Erschienen in:

01.07.2016

Rank-metric codes and their duality theory

verfasst von: Alberto Ravagnani

Erschienen in: Designs, Codes and Cryptography | Ausgabe 1/2016

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Abstract

We compare the two duality theories of rank-metric codes proposed by Delsarte and Gabidulin, proving that the former generalizes the latter. We also give an elementary proof of MacWilliams identities for the general case of Delsarte rank-metric codes. The identities which we derive are very easy to handle, and allow us to re-establish in a very concise way the main results of the theory of rank-metric codes first proved by Delsarte employing association schemes and regular semilattices. We also show that our identities imply as a corollary the original MacWilliams identities established by Delsarte. We describe how the minimum and maximum rank of a rank-metric code relate to the minimum and maximum rank of the dual code, giving some bounds and characterizing the codes attaining them. Then we study optimal anticodes in the rank metric, describing them in terms of optimal codes (namely, MRD codes). In particular, we prove that the dual of an optimal anticode is an optimal anticode. Finally, as an application of our results to a classical problem in enumerative combinatorics, we derive both a recursive and an explicit formula for the number of \(k \times m\) matrices over a finite field with given rank and \(h\)-trace.

Vorheriger Artikel Constructions and analysis of some efficient --visual cryptographic schemes using linear algebraic techniques

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Titel: Rank-metric codes and their duality theory
verfasst von: Alberto Ravagnani
Publikationsdatum: 01.07.2016
Verlag: Springer US
Erschienen in: Designs, Codes and Cryptography / Ausgabe 1/2016
Print ISSN: 0925-1022
Elektronische ISSN: 1573-7586
DOI: https://doi.org/10.1007/s10623-015-0077-3

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