Title :
Incidence Structures From the Blown–Up Plane and LDPC Codes
Author_Institution :
Lab. LIX, Ecole Polytech., Palaiseau, France
fDate :
7/1/2011 12:00:00 AM
Abstract :
In this paper, new regular incidence structures are presented. They arise from sets of conics in the affine plane blown-up at its rational points. The LDPC codes given by these incidence matrices are studied. These sparse incidence matrices turn out to be redundant, which means that their number of rows exceeds their rank. Such a feature is absent from random LDPC codes and is in general interesting for the efficiency of iterative decoding. The performance of some codes under iterative decoding is tested. Some of them turn out to perform better than regular Gallager codes having similar rate and row weight.
Keywords :
iterative decoding; parity check codes; random codes; sparse matrices; Gallager codes; LDPC codes; afflne plane blown-up; blowing up; iterative decoding; random codes; sparse incidence matrices; Geometry; Linear systems; Parity check codes; Polynomials; Sparse matrices; Transforms; Algebraic geometry; LDPC codes; blowing up; conics; finite geometry; incidence structures; linear systems of curves;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2011.2146490
