Stopping Redundancy Hierarchy Beyond the Minimum Distance

Abstract

Stopping sets play a crucial role in failure events of iterative decoders over a binary erasure channel (BEC). The -th stopping redundancy is the minimum number of rows in the parity-check matrix of a code, which contains no stopping sets of size up to . In this work, a notion of coverable stopping sets is defined. In order to achieve maximum-likelihood performance under iterative decoding over the BEC, the parity-check matrix should contain no coverable stopping sets of size , for 1 n-k, where n is the code length, k is the code dimension. By estimating the number of coverable stopping sets, we obtain upper bounds on the -th stopping redundancy, 1 n-k. The bounds are derived for both specific codes and code ensembles. In the range 1 d-1, for specific codes, the new bounds improve on the results in the literature. Numerical calculations are also presented.