Low-density constructions can achieve the Wyner-Ziv and Gelfand-Pinsker bounds

Author

Martinian, Emin ; Wainwright, Martin J.

Author_Institution

Mitsubishi Electr. Res. Labs, Cambridge, MA

fYear

2006

fDate

9-14 July 2006

Firstpage

484

Lastpage

488

Abstract

We describe and analyze sparse graphical code constructions for the problems of source coding with decoder side information (the Wyner-Ziv problem), and channel coding with encoder side information (the Gelfand-Pinsker problem). Our approach relies on a combination of low-density parity check (LDPC) codes and low-density generator matrix (LDGM) codes, and produces sparse constructions that are simultaneously good as both source and channel codes. In particular, we prove that under maximum likelihood encoding/decoding, there exist low-density codes (i.e., with finite degrees) from our constructions that can saturate both the Wyner-Ziv and Gelfand-Pinsker bounds

Keywords

channel coding; maximum likelihood decoding; parity check codes; source coding; Gelfand-Pinsker bounds; Wyner-Ziv bounds; channel coding; decoder side information; encoder side information; low-density generator matrix codes; low-density parity check codes; maximum likelihood encoding-decoding; source coding; sparse graphical code constructions; Channel coding; Entropy; Information analysis; Maximum likelihood decoding; Parity check codes; Quantization; Rate-distortion; Source coding; Sparse matrices; Statistical analysis;

fLanguage

English

Publisher

ieee

Conference_Titel

Information Theory, 2006 IEEE International Symposium on

Conference_Location

Seattle, WA

Print_ISBN

1-4244-0505-X

Electronic_ISBN

1-4244-0504-1

Type

conf

DOI

10.1109/ISIT.2006.261716

Filename

4036008