On Semigroups Generated by Two Consecutive Integers and Improved Hermitian Codes

On Semigroups Generated by Two Consecutive Integers and Improved Hermitian Codes

Analysis of the Berlekamp-Massey-Sakata algorithm for decoding one-point codes leads to two methods for improving code rate. One method, due to Feng and Rao, removes parity checks that may be recovered by their majority voting algorithm. The second method is to design the code to correct only those...

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Veröffentlicht in:IEEE transactions on information theory 2007-07, Vol.53 (7), p.2560-2566
Hauptverfasser: Bras-Amoros, M., O'Sullivan, M.E.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithm design and analysis
Algorithms
Analysis
Applied sciences
Arithmetic
Coding, codes
Criteria
Decoding
Design engineering
Design methodology
Error correction codes
Exact sciences and technology
Feng-Rao improved code
Galois fields
Geometry
Hermitian curve
Information systems
Information theory
Information, signal and communications theory
Integer programming
Integers
Mathematical analysis
Mathematical models
Methods
numerical semigroup
Parity check codes
Redundancy
Signal and communications theory
Telecommunications and information theory
Vectors (mathematics)
Voting
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Zusammenfassung:Analysis of the Berlekamp-Massey-Sakata algorithm for decoding one-point codes leads to two methods for improving code rate. One method, due to Feng and Rao, removes parity checks that may be recovered by their majority voting algorithm. The second method is to design the code to correct only those error vectors of a given weight that are also geometrically generic. In this work, formulae are given for the redundancies of Hermitian codes optimized with respect to these criteria as well as the formula for the order bound on the minimum distance. The results proceed from an analysis of numerical semigroups generated by two consecutive integers.
ISSN:0018-9448
1557-9654
DOI:10.1109/TIT.2007.899548