Title :
Improved Linear Programming Decoding of LDPC Codes and Bounds on the Minimum and Fractional Distance
Author :
Burshtein, David ; Goldenberg, Idan
Author_Institution :
Sch. of Electr. Eng., Tel-Aviv Univ., Tel-Aviv, Israel
Abstract :
We examine LDPC codes decoded using linear programming (LP). Four contributions to the LP framework are presented. First, a new method of tightening the LP relaxation, and thus improving the LP decoder, is proposed. Second, we present an algorithm which calculates a lower bound on the minimum distance of a specific code. This algorithm exhibits complexity which scales quadratically with the block length. Third, we propose a method to obtain a tight lower bound on the fractional distance, also with quadratic complexity, and thus less than previously-existing methods. Finally, we show how the fundamental LP polytope for generalized LDPC codes and nonbinary LDPC codes can be obtained.
Keywords :
decoding; linear programming; parity check codes; LP decoder; LP relaxation; block length; fractional distance; generalized LDPC codes; linear programming decoding; lower bound; nonbinary LDPC codes; quadratic complexity; Approximation algorithms; Complexity theory; Decoding; Iterative decoding; Linear programming; Fractional distance; linear programming decoding; low-density parity-check (LDPC) codes; maximum likelihood (ML) decoding; minimum distance;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2011.2162224
