On the second Feng-Rao distance of Algebraic Geometry codes related to Arf semigroups

February 27, 2017 Β· Declared Dead Β· πŸ› Designs, Codes and Cryptography

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Authors J. I. FarrΓ‘n, P. A. GarcΓ­a-SΓ‘nchez, B. A. Heredia arXiv ID 1702.08225 Category cs.IT: Information Theory Cross-listed math.CO Citations 3 Venue Designs, Codes and Cryptography Last Checked 4 months ago
Abstract
We describe the second (generalized) Feng-Rao distance for elements in an Arf numerical semigroup that are greater than or equal to the conductor of the semigroup. This provides a lower bound for the second Hamming weight for one point AG codes. In particular, we can obtain the second Feng-Rao distance for the codes defined by asymptotically good towers of function fields whose Weierstrass semigroups are inductive. In addition, we compute the second Feng-Rao number, and provide some examples and comparisons with previous results on this topic. These calculations rely on ApΓ©ry sets, and thus several results concerning ApΓ©ry sets of Arf semigroups are presented.
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