algebraic decoding 中文意思是什麼
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Since 1980s, many mathematicians have been engaged in studying the applications of the grobner basis such as solving the system of algebraic equations, factoring polynomials, testing primary ideals, factoring algebraic manifolds, decoding circular codes in corrected codes and algebraically geometrical codes, analyzing and synthesizing high dimensional linear recurring arrays in cryptology, dealing with multidimensional systematic theory, signaling, solving integer programming and so on
) bner基的應用研究包括代數方程組求解,多項式的因子分解,素理想的檢驗,代數流形的分解,糾錯碼中循環碼和代數幾何碼的譯碼,密碼學中高維線性遞歸陣列的分析與綜合,多維系統理論,信號處理和求解整數規劃等諸多領域。 -
The principles of rs coding are fully studied. several classical algebraic algorithms for decoding reed - solomon codes are investigated, and the implementation complexity of these algorithms is compared. 3
詳細研究了rs碼的編譯碼原理,論述了幾種經典的rs碼的代數譯碼演算法,並且比較了它們的實現復雜度。 -
Firstly, this paper discusses several algebraic algorithms for encoding and decoding reed - solomon codes from the view of engineering. then their applications in atm and dvb systems are investigated particularly. finally, fpga implementation of reed - solomon codes is discussed
本文主要是從工程應用的角度,討論了rs碼的幾種編譯碼演算法,並且著重論述了rs碼的兩個應用和如何用fpga設計編譯碼器。 -
The algebraic decoding algorithms are researched, and such as the common algorithm for the codes whose error correction ability is low, and the iterative algorithm for those whose error correction ability is great. programs are implemented for ( 27, 9 ) rs and ( 54, 18 ) rs
首先本文討論了rs碼的代數譯碼演算法,包括糾錯能力比較小的一般譯碼演算法和適用於糾錯能力強的迭代譯碼演算法,並針對兩種特定碼字rs ( 27 , 9 )和rs ( 54 , 18 )進行了具體編程實現。
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