Title :
On the Hardness of Approximating Stopping and Trapping Sets in LDPC Codes
Author :
McGregor, Andrew ; Milenkovic, Olgica
Author_Institution :
Univ. of California at San Diego, La Jolla
Abstract :
We prove that approximating the size of the smallest trapping set in Tanner graphs of linear block codes, and more restrictively, LDPC codes, is NP-hard. The proof techniques rely on reductions from three NP-hard problems, the set cover, minimum three-dimensional matching, and the minimum Hamming distance problem. The ramifications of our findings are that methods used for estimating the height of the error-floor of long LDPC codes, centered around trapping set enumeration, cannot provide accurate worst-case performance predictions.
Keywords :
Hamming codes; block codes; graph theory; linear codes; parity check codes; set theory; LDPC Codes; NP-hard; Tanner graphs; approximating stopping hardness; linear block codes; minimum Hamming distance problem; three-dimensional matching; trapping sets; AWGN; Approximation algorithms; Bipartite graph; Block codes; Iterative algorithms; Iterative decoding; Maximum likelihood decoding; Message passing; Parity check codes; Performance loss;
Conference_Titel :
Information Theory Workshop, 2007. ITW '07. IEEE
Conference_Location :
Tahoe City, CA
Print_ISBN :
1-4244-1564-0
Electronic_ISBN :
1-4244-1564-0
DOI :
10.1109/ITW.2007.4313082
