Title :
Concatenated codes: serial and parallel
Author :
Barg, Alexander ; Zémor, Gilles
Author_Institution :
Rutgers Univ., Piscataway, NJ, USA
fDate :
5/1/2005 12:00:00 AM
Abstract :
An analogy is examined between serially concatenated codes and parallel concatenations whose interleavers are described by bipartite graphs with good expanding properties. In particular, a modified expander code construction is shown to behave very much like Forney´s classical concatenated codes, though with improved decoding complexity. It is proved that these new codes achieve the Zyablov bound δZ on the minimum distance. For these codes, a soft-decision, reliability-based, linear-time decoding algorithm is introduced, that corrects any fraction of errors up to almost δZ/2. For the binary-symmetric channel, this algorithm´s error exponent attains the Forney bound previously known only for classical (serial) concatenations.
Keywords :
concatenated codes; graph theory; interleaved codes; linear codes; Forney´s classical code; Zyablov bound; binary-symmetric channel; bipartite graphs; decoding complexity; error exponent; expander code construction; interleavers; linear-time decoding algorithm; minimum distance; minsum algorithm; serial-parallel concatenated codes; soft-decision codes; Bipartite graph; Concatenated codes; Convergence; Equations; Error correction; Error correction codes; Graph theory; Information theory; Iterative decoding; Product codes; Bipartite-graph codes; Forney bound; Zyablov bound; concatenated codes; expander codes; min-sum algorithm; soft-decision decoding;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2005.846392
