A new bounded-distance (BD) decoding algorithm is presented for binary linear (n, k, d) block codes on additive white Gaussian noise channels. The algorithm is based on the generalized minimum distance (GMD) decoding algorithm of Forney (1989) using the acceptance criterion of Taipale and Pursley (GMD/TP) proposed in 1991. It is shown that the GMD/TP decoding algorithm is a BD decoding algorithm with effective error coefficient (/sup n//sub d/). It is also shown that the decision regions of GMD/TP are good inner approximations of those of full GMD decoding, and therefore full GMD decoding is BD and has an effective error coefficient that is well approximated by (/sup n//sub d/). Moreover, by adding a d-erasure-correction step to GMD decoding, the effective error coefficient can be reduced to A/sub d/, the number of minimum-weight codewords, which is the same as the effective error coefficient of maximum-likelihood decoding. The decoding algorithm is mainly based on algebraic errors-and-erasures decoding and therefore has polynomial rather than exponential complexity.
展开▼
机译:针对加性白高斯噪声信道上的二进制线性(n,k,d)分组码,提出了一种新的有界距离(BD)解码算法。该算法基于1991年提出的Taipale和Pursley(GMD / TP)的验收准则,采用Forney(1989)的广义最小距离(GMD)解码算法。表明GMD / TP解码算法是BD解码有效误差系数(/ sup n // sub d /)的算法。还表明,GMD / TP的决策区域是完整GMD解码的决策区域的良好内近似,因此完整GMD解码为BD,并且有效误差系数近似为(/ sup n // sub d / )。此外,通过在GMD解码中添加d消除校正步骤,可以将有效误差系数减小为最小权码字数A / sub d /,这与最大似然的有效误差系数相同解码。该解码算法主要基于代数错误和擦除解码,因此具有多项式而不是指数复杂度。
展开▼
