Title :
On algebraic construction of Gallager and circulant low-density parity-check codes
Author :
Tang, Heng ; Xu, Jun ; Kou, Yu ; Lin, Shu ; Abdel-Ghaffar, Khaled
Author_Institution :
PMC-Sierra Inc., Portland, OR, USA
fDate :
6/1/2004 12:00:00 AM
Abstract :
This correspondence presents three algebraic methods for constructing low-density parity-check (LDPC) codes. These methods are based on the structural properties of finite geometries. The first method gives a class of Gallager codes and a class of complementary Gallager codes. The second method results in two classes of circulant-LDPC codes, one in cyclic form and the other in quasi-cyclic form. The third method is a two-step hybrid method. Codes in these classes have a wide range of rates and minimum distances, and they perform well with iterative decoding.
Keywords :
cyclic codes; iterative decoding; parity check codes; Euclidean geometry; Gallager codes; LDPC codes; algebraic construction; circulant low-density parity-check codes; cyclic code; finite geometries; iterative decoding; projective geometry; quasicyclic code; sum-product algorithm; two-step hybrid method; Bipartite graph; Combinatorial mathematics; Design for experiments; Galois fields; Geometry; Iterative algorithms; Iterative decoding; Parity check codes; Performance analysis; Turbo codes; Cyclic code; Euclidean geometry; SPA; projective geometry; quasi-cyclic code; sum–product algorithm;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2004.828088
