Title :
On the stopping distance of finite geometry LDPC codes
Author :
Xia, Shu-Tao ; Fu, Fang-Wei
Author_Institution :
Graduate Sch., Tsinghua Univ., Shenzhen, China
fDate :
5/1/2006 12:00:00 AM
Abstract :
In this letter, the stopping sets and stopping distance of finite geometry LDPC (FG-LDPC) codes are studied. It is known that FG-LDPC codes are majority-logic decodable and a lower bound on the minimum distance can be thus obtained. It is shown in this letter that this lower bound on the minimum distance of FG-LDPC codes is also a lower bound on the stopping distance of FG-LDPC codes, which implies that FG-LDPC codes have considerably large stopping distance. This may explain in one respect why some FG-LDPC codes perform well with iterative decoding in spite of having many cycles of length 4 in their Tanner graphs.
Keywords :
geometric codes; graph theory; iterative decoding; majority logic; parity check codes; FG-LDPC code; Tanner graph; finite geometry; iterative decoding; low density parity check code; majority-logic decodable code; minimum distance bound; stopping distance; Galois fields; Geometry; Iterative decoding; Laboratories; Linear code; Mathematics; Maximum likelihood decoding; Parity check codes;
Journal_Title :
Communications Letters, IEEE
DOI :
10.1109/LCOMM.2006.1633330
