Describing Quaternary Codes Using Binary Codes: Basics, Theory, Analysis - Fatma Salim Al Kharousi - 書籍 - LAP LAMBERT Academic Publishing - 9783659427268 - 2013年11月13日
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Describing Quaternary Codes Using Binary Codes: Basics, Theory, Analysis

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発送予定日 年8月3日 - 年8月13日
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Binary Codes are studied in information theory, electrical engineering, mathematics and computer science. They are used to design efficient and reliable data transmission methods. Linear codes are easier to deal with compared to nonlinear codes. Certain nonlinear binary codes though contain more codewords than any known linear codes with the same length and minimum distance. These include the Nordstrom-Robinson code, Kerdock, Preparata and Goethals codes. The Kerdock and Preparata codes are formal duals. It was not clear if these codes are duals in some more algebraic sense. Then, It was shown that when the Kerdock and Preparata codes are properly defined, they can be simply constructed as binary images under the Gray map of dual quaternary codes. Decoding codes mentioned is greatly simplified by working in the Z_4-domain, where they are linear. Observing Quaternary codes might lead to better binary codes. Here we define a class of quaternary codes, C(C_1, C_2) giving rise to a fixed pair of binary codes C_1= X (mod 2) and C_2= even words in X mapped coordinatewise to the Z_2 domain for X in C(C_1, C_2). We describe this class using the fixed pair of binary codes {C_1, C_2}.

メディア 書籍     Paperback Book   (ソフトカバーで背表紙を接着した本)
リリース済み 2013年11月13日
ISBN13 9783659427268
出版社 LAP LAMBERT Academic Publishing
ページ数 168
寸法 150 × 10 × 226 mm   ·   268 g
言語 ドイツ語