Tilings With <formula formulatype='inline'>  src='/images/tex/388.gif' alt='n'> </formula>-Dimensional Chairs and Their Applications to Asymmetric Codes

Buzaglo S.; Etzion T.

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Tilings With src='/images/tex/388.gif' alt='n'> -Dimensional Chairs and Their Applications to Asymmetric Codes

机译：带有 src =“ / images / tex / 388.gif” alt =“ n”> 的尺寸椅子及其在非对称代码中的应用

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An $n$-dimensional chair consists of an $n$ -dimensional box from which a smaller $n$-dimensional box is removed. A tiling of an $n$-dimensional chair has two nice applications in some memories using asymmetric codes. The first one is in the design of codes that correct asymmetric errors with limited magnitude. The second one is in the design of $n$ cells $q$ -ary write-once memory codes. We show an equivalence between the design of a tiling with an integer lattice and the design of a tiling from a generalization of splitting (or of Sidon sequences). A tiling of an $n$ -dimensional chair can define a perfect code for correcting asymmetric errors with limited magnitude. We present constructions for such tilings and prove cases where perfect codes for these type of errors do not exist.

机译：$ n $维的椅子由一个$ n $维的盒子组成，从中删除了一个较小的$ n $维盒子。平铺$ n $维椅子在某些使用不对称代码的记忆中有两个不错的应用。第一个是在设计中以有限的幅度校正不对称错误的代码。第二个是在$ n $单元$ q $ -ary写一次存储代码的设计中。我们展示了具有整数点阵的平铺设计与根据拆分（或Sidon序列）的广义化进行平铺设计之间的等效关系。一维椅子的平铺可以定义一个完美的代码，用于校正幅度有限的不对称误差。我们介绍了这种平铺的结构，并证明了不存在针对此类错误的完善代码的情况。

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来源
《Information Theory, IEEE Transactions on》 |2013年第3期|p.1573-1582|共10页
作者
Buzaglo S.; Etzion T.;
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作者单位

Department of Computer Science, Technion—Israel Institute of Technology, Haifa, Israel;

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正文语种 eng
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关键词
Ash; Encoding; Lattices; Media; Shape; Vectors; Zinc; formula formulatype="inline" tex Notation="TeX"$n$/tex/formula-dimensional chair; Asymmetric limited-magnitude errors; lattice; perfect codes; splitting; tiling; write-once memory (WOM) codes;

机译：灰;编码;格子媒体;形状;向量;锌;formula Formulatype =“ inline” tex Notation =“ TeX” $ n $ / tex / formula-维椅子;不对称的限幅误差;格子;完善的代码;分裂平铺一次写入存储器（WOM）代码;

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Tilings With src='/images/tex/388.gif' alt='n'> -Dimensional Chairs and Their Applications to Asymmetric Codes

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