Construction of Independent Set and Its Application for Designed Minimum Distance

Construction of Independent Set and Its Application for Designed Minimum Distance

The shift bound is a good lower bound of the minimum distance for cyclic codes, Reed-Muller codes and geometric Goppa codes. It is necessary to construct the maximum value of the independent set. However, its computational complexity is very large. In this paper, we consider cyclic codes defined by...

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Veröffentlicht in:IEICE transactions on fundamentals of electronics, communications and computer sciences communications and computer sciences, 2012-01, Vol.E95.A (12), p.np-np
Hauptverfasser: ZHENG, Junru, KAIDA, Takayasu
Format: Artikel
Sprache:jpn
Schlagworte:
Complexity
Computation
Construction
Electronics
Fourier transforms
Lower bounds
Mathematical analysis
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Zusammenfassung:The shift bound is a good lower bound of the minimum distance for cyclic codes, Reed-Muller codes and geometric Goppa codes. It is necessary to construct the maximum value of the independent set. However, its computational complexity is very large. In this paper, we consider cyclic codes defined by their defining set, and a new method to calculate the lower bound of the minimum distance using the discrete Fourier transform (DFT) is shown. The computational complexity of this method is compared with the shift bound's one. Moreover construction of independent set is shown.
ISSN:0916-8508
1745-1337