IEICE TRANSACTIONS on Fundamentals
Detailed Evolution of Degree Distributions in Residual Graphs with Joint Degree Distributions
Summary :
Luby et al. derived evolution of degree distributions in residual graphs for irregular LDPC code ensembles. Evolution of degree distributions in residual graphs is important characteristic which is used for finite-length analysis of the expected block and bit error probability over the binary erasure channel. In this paper, we derive detailed evolution of degree distributions in residual graphs for irregular LDPC code ensembles with joint degree distributions.
- Publication
- IEICE TRANSACTIONS on Fundamentals Vol.E91-A No.10 pp.2737-2744
- Publication Date
- 2008/10/01
- Publicized
- Online ISSN
- 1745-1337
- DOI
- 10.1093/ietfec/e91-a.10.2737
- Type of Manuscript
- Special Section PAPER (Special Section on Information Theory and Its Applications)
- Category
- Coding Theory
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Keyword
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Takayuki NOZAKI, Kenta KASAI, Tomoharu SHIBUYA, Kohichi SAKANIWA, "Detailed Evolution of Degree Distributions in Residual Graphs with Joint Degree Distributions" in IEICE TRANSACTIONS on Fundamentals,
vol. E91-A, no. 10, pp. 2737-2744, October 2008, doi: 10.1093/ietfec/e91-a.10.2737.
Abstract: Luby et al. derived evolution of degree distributions in residual graphs for irregular LDPC code ensembles. Evolution of degree distributions in residual graphs is important characteristic which is used for finite-length analysis of the expected block and bit error probability over the binary erasure channel. In this paper, we derive detailed evolution of degree distributions in residual graphs for irregular LDPC code ensembles with joint degree distributions.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1093/ietfec/e91-a.10.2737/_p
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@ARTICLE{e91-a_10_2737,
author={Takayuki NOZAKI, Kenta KASAI, Tomoharu SHIBUYA, Kohichi SAKANIWA, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={Detailed Evolution of Degree Distributions in Residual Graphs with Joint Degree Distributions},
year={2008},
volume={E91-A},
number={10},
pages={2737-2744},
abstract={Luby et al. derived evolution of degree distributions in residual graphs for irregular LDPC code ensembles. Evolution of degree distributions in residual graphs is important characteristic which is used for finite-length analysis of the expected block and bit error probability over the binary erasure channel. In this paper, we derive detailed evolution of degree distributions in residual graphs for irregular LDPC code ensembles with joint degree distributions.},
keywords={},
doi={10.1093/ietfec/e91-a.10.2737},
ISSN={1745-1337},
month={October},}
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TY - JOUR
TI - Detailed Evolution of Degree Distributions in Residual Graphs with Joint Degree Distributions
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 2737
EP - 2744
AU - Takayuki NOZAKI
AU - Kenta KASAI
AU - Tomoharu SHIBUYA
AU - Kohichi SAKANIWA
PY - 2008
DO - 10.1093/ietfec/e91-a.10.2737
JO - IEICE TRANSACTIONS on Fundamentals
SN - 1745-1337
VL - E91-A
IS - 10
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - October 2008
AB - Luby et al. derived evolution of degree distributions in residual graphs for irregular LDPC code ensembles. Evolution of degree distributions in residual graphs is important characteristic which is used for finite-length analysis of the expected block and bit error probability over the binary erasure channel. In this paper, we derive detailed evolution of degree distributions in residual graphs for irregular LDPC code ensembles with joint degree distributions.
ER -
English
