Department of Mathematics
 Search | Help | Login | pdf version | printable version

Math @ Duke



Publications [#319362] of Henry Pfister

Papers Published

  1. Nguyen, PS; Pfister, HD; Narayanan, KR, On multiple decoding attempts for Reed - Solomon codes: A rate-distortion approach, Ieee Transactions on Information Theory, vol. 57 no. 2 (February, 2011), pp. 668-691, Institute of Electrical and Electronics Engineers (IEEE) [doi]
    (last updated on 2019/07/16)

    One popular approach to soft-decision decoding of Reed - Solomon (RS) codes is based on using multiple trials of a simple RS decoding algorithm in combination with erasing or flipping a set of symbols or bits in each trial. This paper presents a framework based on rate-distortion (RD) theory to analyze these multiple-decoding algorithms. By defining an appropriate distortion measure between an error pattern and an erasure pattern, the successful decoding condition, for a single errors-and-erasures decoding trial, becomes equivalent to distortion being less than a fixed threshold. Finding the best set of erasure patterns also turns into a covering problem that can be solved asymptotically by RD theory. Thus, the proposed approach can be used to understand the asymptotic performance-versus-complexity tradeoff of multiple errors-and-erasures decoding of RS codes. This initial result is also extended a few directions. The rate-distortion exponent (RDE) is computed to give more precise results for moderate blocklengths. Multiple trials of algebraic soft-decision (ASD) decoding are analyzed using this framework. Analytical and numerical computations of the RD and RDE functions are also presented. Finally, simulation results show that sets of erasure patterns designed using the proposed methods outperform other algorithms with the same number of decoding trials. © 2006 IEEE.
ph: 919.660.2800
fax: 919.660.2821

Mathematics Department
Duke University, Box 90320
Durham, NC 27708-0320