Title :
Improved Probabilistic Bounds on Stopping Redundancy
Author :
Han, Junsheng ; Siegel, Paul H. ; Vardy, Alexander
Author_Institution :
Univ. of California San Diego, La Jolla
fDate :
4/1/2008 12:00:00 AM
Abstract :
For a linear code C, the stopping redundancy of C is defined as the minimum number of check nodes in a Tanner graph T for C such that the size of the smallest stopping set in T is equal to the minimum distance of C. Han and Siegel recently proved an upper bound on the stopping redundancy of general linear codes, using probabilistic analysis. For most code parameters, this bound is the best currently known. In this correspondence, we present several improvements upon this bound.
Keywords :
decoding; graph theory; iterative methods; linear codes; Tanner graph; code parameters; iterative decoding; linear code; probabilistic analysis; stopping redundancy; Bipartite graph; Hamming distance; Iterative decoding; Linear code; Magnetic recording; Maximum likelihood decoding; Parity check codes; Upper bound; Binary erasure channel; iterative decoding; linear codes; stopping redundancy; stopping sets;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2008.917624
