Title :
Regular and irregular progressive edge-growth tanner graphs
Author :
Hu, Xiao-Yu ; Eleftheriou, Evangelos ; Arnold, Dieter M.
Author_Institution :
Zurich Res. Lab., IBM Res., Switzerland
Abstract :
We propose a general method for constructing Tanner graphs having a large girth by establishing edges or connections between symbol and check nodes in an edge-by-edge manner, called progressive edge-growth (PEG) algorithm. Lower bounds on the girth of PEG Tanner graphs and on the minimum distance of the resulting low-density parity-check (LDPC) codes are derived in terms of parameters of the graphs. Simple variations of the PEG algorithm can also be applied to generate linear-time encodeable LDPC codes. Regular and irregular LDPC codes using PEG Tanner graphs and allowing symbol nodes to take values over GF(q) (q>2) are investigated. Simulation results show that the PEG algorithm is a powerful algorithm to generate good short-block-length LDPC codes.
Keywords :
Galois fields; block codes; graph theory; iterative decoding; linear codes; parity check codes; GF(q); Galois field; PEG algorithm; Tanner graph construction; linear-time code; low-density parity-check code; progressive edge-growth; regular-irregular LDPC code; short-block-length code; symbol-check node; Bandwidth; Entropy; Image coding; Notice of Violation; Random processes; Rate distortion theory; Signal processing; Signal processing algorithms; Speech processing; Video compression; Girth; LDPC codes over; PEG Tanner graphs; low-density parity-check (LDPC) codes; progressive edge growth (PEG);
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2004.839541
