2018
DOI: 10.1007/s10623-018-0483-4
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On the second Feng-Rao distance of Algebraic Geometry codes related to Arf semigroups

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 wi… Show more

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Cited by 2 publications
(1 citation statement)
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“…Farrán and Munuera showed the existence of a constant, which they named the Feng-Rao number, depending only on the dimension of the Hamming weights and the Weierstrass semigroup, which completely determined the order bounds for codes of rate low enough. The references [41][42][43][44] deal with the generalized order bounds and the Feng-Rao numbers related to particular classes of semigroups.…”
Section: Ideals and Generalized Hamming Weightsmentioning
confidence: 99%
“…Farrán and Munuera showed the existence of a constant, which they named the Feng-Rao number, depending only on the dimension of the Hamming weights and the Weierstrass semigroup, which completely determined the order bounds for codes of rate low enough. The references [41][42][43][44] deal with the generalized order bounds and the Feng-Rao numbers related to particular classes of semigroups.…”
Section: Ideals and Generalized Hamming Weightsmentioning
confidence: 99%