Miscorrection probability beyond the minimum distance

Miscorrection probability beyond the minimum distance

The miscorrection probability of a list decoder is the probability that the decoder will have at least one noncausal codeword in its decoding sphere. Evaluating this probability is important when using a list-decoder as a conventional decoder since in that case we require the list to contain at most...

Ausführliche Beschreibung

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Bibliographische Detailangaben
Hauptverfasser: Cassuto, Y., Bruck, J.
Format: Tagungsbericht
Sprache:eng
Schlagworte:
Applied sciences
Block codes
Computer networks
Computer science
control theory
systems
Decoding
Exact sciences and technology
Information theory
Information, signal and communications theory
Linear code
Probability
Reed-Solomon codes
Telecommunications and information theory
Upper bound
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Beschreibung
Zusammenfassung:The miscorrection probability of a list decoder is the probability that the decoder will have at least one noncausal codeword in its decoding sphere. Evaluating this probability is important when using a list-decoder as a conventional decoder since in that case we require the list to contain at most one codeword for most of the errors. A lower bound on the miscorrection is the main result. The key ingredient in the proof is a new combinatorial upper bound on the list-size for a general q-ary block code. This bound is tighter than the best known on large alphabets, and it is shown to be very close to the algebraic bound for Reed-Solomon codes. Finally we discuss two known upper bounds on the miscorrection probability and unify them for linear MDS codes.
DOI:10.1109/ISIT.2004.1365561