English

Stopping Sets of Algebraic Geometry Codes

Information Theory 2013-04-30 v1 math.IT

Abstract

Stopping sets and stopping set distribution of a linear code play an important role in the performance analysis of iterative decoding for this linear code. Let CC be an [n,k][n,k] linear code over \f\f with parity-check matrix HH, where the rows of HH may be dependent. Let [n]={1,2,...,n}[n]=\{1,2,...,n\} denote the set of column indices of HH. A \emph{stopping set} SS of CC with parity-check matrix HH is a subset of [n][n] such that the restriction of HH to SS does not contain a row of weight 1. The \emph{stopping set distribution} {Ti(H)}i=0n\{T_{i}(H)\}_{i=0}^{n} enumerates the number of stopping sets with size ii of CC with parity-check matrix HH. Denote HH^{*} the parity-check matrix consisting of all the non-zero codewords in the dual code CC^{\bot}. In this paper, we study stopping sets and stopping set distributions of some residue algebraic geometry (AG) codes with parity-check matrix HH^*. First, we give two descriptions of stopping sets of residue AG codes. For the simplest AG codes, i.e., the generalized Reed-Solomon codes, it is easy to determine all the stopping sets. Then we consider AG codes from elliptic curves. We use the group structure of rational points of elliptic curves to present a complete characterization of stopping sets. Then the stopping sets, the stopping set distribution and the stopping distance of the AG code from an elliptic curve are reduced to the search, counting and decision versions of the subset sum problem in the group of rational points of the elliptic curve, respectively. Finally, for some special cases, we determine the stopping set distributions of AG codes from elliptic curves.

Keywords

Cite

@article{arxiv.1304.7402,
  title  = {Stopping Sets of Algebraic Geometry Codes},
  author = {Jun Zhang and Fang-Wei Fu and Daqing Wan},
  journal= {arXiv preprint arXiv:1304.7402},
  year   = {2013}
}

Comments

17 pages

R2 v1 2026-06-22T00:07:29.692Z