渐近好同源纠错码

Q3 Mathematics Journal of Algebra Combinatorics Discrete Structures and Applications Pub Date : 2019-09-13 DOI:10.13069/jacodesmath.617235

J. McCullough, Heather Newman

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引用次数: 0

摘要

设$\Delta$是一个抽象的简单复合体。我们研究了与$\Delta$相关的经典同调纠错码，它推广了简单图的循环码。众所周知，图的循环码不能产生渐近好的码族。我们证明了与维数至少为$2$的简单复形相关的同调码确实存在渐近好的码族。我们还证明了任意域上任意简单复合体的(共)环和(共)边界码的一般界和公式。

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Asymptotically good homological error correcting codes

Let $\Delta$ be an abstract simplicial complex. We study classical homological error correcting codes associated to $\Delta$, which generalize the cycle codes of simple graphs. It is well-known that cycle codes of graphs do not yield asymptotically good families of codes. We show that asymptotically good families of codes do exist for homological codes associated to simplicial complexes of dimension at least $2$. We also prove general bounds and formulas for (co-)cycle and (co-)boundary codes for arbitrary simplicial complexes over arbitrary fields.

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