In this paper, two particular instances of LT codes with short message blocklength $k$ and maximum likelihood (ML) decoding are investigated, i.e., random linear fountain (RLF) codes and (nearly) check-concentrated LT codes. Both show an almost equally good performance. The focus of this paper will be on RLF codes, a type of LT codes whose generator matrices are constructed from independent Bernoulli trials and have a binomial check node degree distribution. A new simple expression for an upper bound on the bit erasure probability under ML decoding is derived for RLF codes with density 0.5, i.e., with check node degree distribution $Omega(x) = 2^{-k}(1+x)^k$. It is shown that RLF codes with a minimum density far less than 0.5 are equally well suited to achieve a certain bit erasure probability for a given reception overhead. Furthermore, a characteristic term from a general upper bound on the bit erasure probability under ML decoding is identified that can be used to optimise check node degree distributions. Its implications on the performance of LT codes are qualitatively analysed.
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机译:在本文中,研究了具有短消息块长$ k $和最大似然(ML)解码的LT码的两个特定实例,即随机线性喷泉(RLF)码和(几乎)检查集中的LT码。两者均显示几乎相同的良好性能。本文的重点将放在RLF码上,这是一种LT码,其生成器矩阵是根据独立的Bernoulli试验构建的,并且具有二项式校验节点度分布。对于密度为0.5,即校验节点度分布为$ Omega(x)= 2 ^ {-k}(1 + x)^的RLF码,得出了ML解码时比特擦除概率上限的新的简单表达式。 k $。结果表明,对于给定的接收开销,最小密度远小于0.5的RLF码同样适用于实现一定的比特擦除概率。此外,识别出在ML解码下来自比特擦除概率的一般上限的特征项,该特征项可以用于优化校验节点度分布。定性地分析了其对LT代码性能的影响。
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