A polynomial-time construction of self-orthogonal codes and applications to quantum error correction

机译：自正交码和应用于量子误差校正的多项式施工

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A polynomial-time construction of a sequence of self-orthogonal geometric Goppa codes attaining the Tsfasman-Vladut-Zink (TVZ) bound is presented. The issue of constructing such a code sequence was addressed in a context of constructing quantum error-correcting codes (Ashikhmin et al., 2001). Naturally, the obtained construction has implications on quantum error-correcting codes. In particular, the best known asymptotic lower bounds on the largest minimum distance of polynomially constructible quantum error-correcting codes are improved.

机译：呈现了获得Tsfasman-Vladut-zink（TVZ）绑定的一系列自正交几何GOPPA码的多项式施工。在构建量子误差校正代码的背景下解决了构建这种代码序列的问题（Ashikhmin等，2001）。当然，所获得的结构对量子纠错码有影响。特别地，改善了多项式可分解量子误差码码的最小最小距离上的最佳已知的渐近下限。

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《IEEE International Symposium on Information Theory》|2009年||共5页
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中图分类 G20-53;
关键词
Goppa codes; error correction; error correction codes; orthogonal codes; Tsfasman-Vladut-Zink bound; polynomial-time construction; quantum error correction; quantum error-correcting codes; self-orthogonal codes; self-orthogonal geometric Goppa codes;

机译：GOPPA代码;纠错;纠错码;正交码;TSFASMAN-VLADUT-ZINK绑定;多项式施工;量子误差校正;量子纠错码;自我正交的代码;自我正交的几何GOPPA代码;

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A polynomial-time construction of self-orthogonal codes and applications to quantum error correction

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