On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata

Luca Mariot; Federico Mazzone

doi:10.48550/arXiv.2305.05340

On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata

Luca Mariot, Federico Mazzone

Research output: Working paper › Preprint › Academic

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Abstract

Motivated by applications to noncoherent network coding, we study subspace codes defined by sets of linear cellular automata (CA). As a first remark, we show that a family of linear CA where the local rules have the same diameter -- and thus the associated polynomials have the same degree -- induces a Grassmannian code. Then, we prove that the minimum distance of such a code is determined by the maximum degree occurring among the pairwise greatest common divisors (GCD) of the polynomials in the family. Finally, we consider the setting where all such polynomials have the same GCD, and determine the cardinality of the corresponding Grassmannian code. As a particular case, we show that if all polynomials in the family are pairwise coprime, the resulting Grassmannian code has the highest minimum distance possible.

Original language	English
Publisher	ArXiv.org
DOIs	https://doi.org/10.48550/arXiv.2305.05340
Publication status	Published - 9 May 2023

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cs.IT
math.CO
math.IT

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10.48550/arXiv.2305.05340

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On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata
Mariot, L. & Mazzone, F., 2023, Cellular Automata and Discrete Complex Systems - 29th IFIP WG 1.5 International Workshop, AUTOMATA 2023, Trieste, Italy, August 30 - September 1, 2023, Proceedings: 29th IFIP WG 1.5 International Workshop, AUTOMATA 2023, Trieste, Italy, August 30 – September 1, 2023, Proceedings. Manzoni, L., Mariot, L. & Roy Chowdhury, D. (eds.). Cham: Springer, p. 105-119 15 p. (Lecture Notes in Computer Science; vol. 14152).
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title = "On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata",

abstract = "Motivated by applications to noncoherent network coding, we study subspace codes defined by sets of linear cellular automata (CA). As a first remark, we show that a family of linear CA where the local rules have the same diameter -- and thus the associated polynomials have the same degree -- induces a Grassmannian code. Then, we prove that the minimum distance of such a code is determined by the maximum degree occurring among the pairwise greatest common divisors (GCD) of the polynomials in the family. Finally, we consider the setting where all such polynomials have the same GCD, and determine the cardinality of the corresponding Grassmannian code. As a particular case, we show that if all polynomials in the family are pairwise coprime, the resulting Grassmannian code has the highest minimum distance possible. ",

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N2 - Motivated by applications to noncoherent network coding, we study subspace codes defined by sets of linear cellular automata (CA). As a first remark, we show that a family of linear CA where the local rules have the same diameter -- and thus the associated polynomials have the same degree -- induces a Grassmannian code. Then, we prove that the minimum distance of such a code is determined by the maximum degree occurring among the pairwise greatest common divisors (GCD) of the polynomials in the family. Finally, we consider the setting where all such polynomials have the same GCD, and determine the cardinality of the corresponding Grassmannian code. As a particular case, we show that if all polynomials in the family are pairwise coprime, the resulting Grassmannian code has the highest minimum distance possible.

AB - Motivated by applications to noncoherent network coding, we study subspace codes defined by sets of linear cellular automata (CA). As a first remark, we show that a family of linear CA where the local rules have the same diameter -- and thus the associated polynomials have the same degree -- induces a Grassmannian code. Then, we prove that the minimum distance of such a code is determined by the maximum degree occurring among the pairwise greatest common divisors (GCD) of the polynomials in the family. Finally, we consider the setting where all such polynomials have the same GCD, and determine the cardinality of the corresponding Grassmannian code. As a particular case, we show that if all polynomials in the family are pairwise coprime, the resulting Grassmannian code has the highest minimum distance possible.

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BT - On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata

PB - ArXiv.org

ER -

On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata

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On the Minimum Distance of Subspace Codes Generated by Linear Cellular Automata

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