Trapping sets of structured LDPC codes

2011 IEEE International Symposium on Information Theory Proceedings Pub Date : 2011-10-03 DOI:10.1109/ISIT.2011.6033698

Qin Huang, Qiuju Diao, Shu Lin, K. Abdel-Ghaffar

引用次数: 13

Abstract

THIS PAPER IS ELIGIBLE FOR THE STUDENT PAPER AWARD. This paper analyzes trapping set structure of binary regular LDPC codes whose parity-check matrices satisfy the constraint that no two rows (or two columns) have more than one place where they both have non-zero components, which is called row-column (RC) constraint. For a (γ,ρ)-regular LDPC code whose parity-check matrix satisfies the RC-constraint, its Tanner graph contains no (к, τ) trapping set with size к ≤ γ and number τ of odd degree check nodes less than γ. For several classes of RC-constrained regular LDPC codes constructed algebraically, we show that their Tanner graphs contain no trapping sets of sizes smaller than their minimum weights.

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捕获结构化LDPC代码集

这篇论文有资格获得学生论文奖。本文分析了二元正则LDPC码的陷阱集结构，其奇偶校验矩阵满足两行(或两列)不存在一个以上的且两行(或两列)都有非零分量的约束，称为行列(RC)约束。对于奇偶校验矩阵满足rc约束的(γ，ρ)正则LDPC码，其Tanner图中不包含大小为γ≤γ且奇数次校验节点数τ小于γ的(_，τ)捕获集。对于几种代数构造的rc约束正则LDPC码，我们证明了它们的Tanner图不包含小于其最小权值的捕获集。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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2011 IEEE International Symposium on Information Theory Proceedings

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