High speed decoding of the binary (47, 24, 11) quadratic residue code

博士 === 義守大學 === 資訊工程學系博士班 === 99 === In this dissertation, an efficient table lookup decoding algorithm (TLDA) is presented to correct up to five possible errors in a binary systematic (47, 24, 11) quadratic residue (QR) code. The main idea of the TLDA is based on the weight of syndrome, the syndrom...

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Bibliographic Details
Main Authors: Hung-Peng Lee, 李鴻鵬
Other Authors: Trieu-Kien Truong
Format: Others
Language:en_US
Published: 2010
Online Access:http://ndltd.ncl.edu.tw/handle/66749928891749710209
Description
Summary:博士 === 義守大學 === 資訊工程學系博士班 === 99 === In this dissertation, an efficient table lookup decoding algorithm (TLDA) is presented to correct up to five possible errors in a binary systematic (47, 24, 11) quadratic residue (QR) code. The main idea of the TLDA is based on the weight of syndrome, the syndrome decoder together with a reduced-size lookup table (RSLT), and the shift-search method given by Reed et al. Thus, the size of the lookup table and computational complexity in a finite field can be significantly reduced. The memory size of the proposed condensed lookup table (CLT) consists of only 36.6 Kbytes and is only about 0.24% of the full lookup table (FLT) and about 3.4% of the lookup table given by Chen et al., respectively. These facts lead to significant reduction of computational time and the decoding complexity. A simulation result shows that the decoding speed of the proposed TLDA is much faster than all existing decoding algorithms. Moreover, it can be extended to decode all QR codes, including the class of the cyclic codes when the code length is moderate. The CLT makes this new decoding algorithm suitable for hardware or firmware implementations.