Double-Hamming based QC LDPC codes with large minimum distance

Author

Bocharova, Irina E. ; Hug, Florian ; Johannesson, Rolf ; Kudryashov, Boris D.

Author_Institution

Dept. of Inf. Syst., St. Petersburg Univ. of Inf. Technol., Mech. & Opt., St. Petersburg, Russia

fYear

2011

fDate

July 31 2011-Aug. 5 2011

Firstpage

923

Lastpage

927

Abstract

A new method using Hamming codes to construct base matrices of (J,K)-regular LDPC convolutional codes with large free distance is presented. By proper labeling the corresponding base matrices and tailbiting these parent convolutional codes to given lengths, a large set of quasi-cyclic (QC) (J,K)-regular LDPC block codes with large minimum distance is obtained. The corresponding Tanner graphs have girth up to 14. This new construction is compared with two previously known constructions of QC (J,K)-regular LDPC block codes with large minimum distance exceeding (J + 1)!. Applying all three constructions, new QC (J,K)-regular block LDPC codes with J = 3 or 4, shorter codeword lengths and/or better distance properties than those of previously known codes are presented.

Keywords

Hamming codes; convolutional codes; cyclic codes; graph theory; matrix algebra; parity check codes; LDPC convolutional code; QC LDPC codes; Tanner graph; base matrices; double-Hamming codes; large minimum distance; quasicyclic codes; regular LDPC block codes; Block codes; Convolutional codes; Labeling; Parity check codes; Polynomials; Upper bound;

fLanguage

English

Publisher

ieee

Conference_Titel

Information Theory Proceedings (ISIT), 2011 IEEE International Symposium on

Conference_Location

St. Petersburg

ISSN

2157-8095

Print_ISBN

978-1-4577-0596-0

Electronic_ISBN

2157-8095

Type

conf

DOI

10.1109/ISIT.2011.6034273

Filename

6034273