Explicit optimal and asymptotically good constructions of linearized algebraic geometry codes in the sum-rank metric are provided by extending prior work on quotients of Ore polynomials over algebraic function fields.
Generalization of Gabidulin Codes over Fields of Rational Functions
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
We transpose the theory of rank metric and Gabidulin codes to the case of fields which are not finite fields. The Frobenius automorphism is replaced by any element of the Galois group of a cyclic algebraic extension of a base field. We use our framework to define Gabidulin codes over the field of rational functions using algebraic function fields with a cyclic Galois group. This gives a linear subspace of matrices whose coefficients are rational function, such that the rank of each of this matrix is lower bounded, where the rank is comprised in term of linear combination with rational functions. We provide two examples based on Kummer and Artin-Schreier extensions.The matrices that we obtain may be interpreted as generating matrices of convolutional codes.
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2026 1verdicts
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Explicit and asymptotically good constructions of Algebraic Geometry codes in the sum-rank metric
Explicit optimal and asymptotically good constructions of linearized algebraic geometry codes in the sum-rank metric are provided by extending prior work on quotients of Ore polynomials over algebraic function fields.