Algebraic Geometry Codes With Complementary Duals Exceed the Asymptotic Gilbert-Varshamov Bound

Lingfei Jin; Chaoping Xing

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Algebraic Geometry Codes With Complementary Duals Exceed the Asymptotic Gilbert-Varshamov Bound

机译：具有互补对偶的代数几何代码超过了渐近的Gilbert-Varshamov界

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摘要

It was shown by Massey that linear complementary dual (LCD) codes are asymptotically good. In 2004, Sendrier proved that LCD codes meet the asymptotic Gilbert–Varshamov (GV) bound. Until now, the GV bound still remains to be the best asymptotical lower bound for LCD codes. In this paper, we show that an algebraic geometry code over a finite field of even characteristic is equivalent to an LCD code and consequently there exists a family of LCD codes that are equivalent to algebraic geometry codes and exceed the asymptotical GV bound.

机译：Massey证明线性互补对偶（LCD）码在渐近性上是好的。 2004年，Sendrier证明LCD代码符合渐近的Gilbert–Varshamov（GV）界线。到目前为止，GV界限仍然是LCD代码的最佳渐近下界。在本文中，我们证明了在偶数特征的有限域上的代数几何代码等效于LCD代码，因此，存在一系列LCD代码，这些代数几何代码等效于代数几何代码并且超过了渐近GV边界。

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来源
《Information Theory, IEEE Transactions on》 |2018年第9期|6277-6282|共6页
作者
Lingfei Jin; Chaoping Xing;
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作者单位

Shanghai Key Laboratory of Intelligent Information Processing, School of Computer Science, Fudan University, Shanghai, China;

School of Physical and Mathematical Sciences, Nanyang Technological University, Singapore;

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原文格式 PDF
正文语种 eng
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关键词
Liquid crystal displays; Geometry; Linear codes; Poles and towers; Chaotic communication; Mobile communication; Cost accounting;

机译：液晶显示器;几何;线性代码;杆和塔;混沌通信;移动通信;成本核算;

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2. Nonbinary quantum goppa codes exceeding the quantum Gilbert-Varshamov bound [J] . Niehage A Quantum information processing . 2007,第3期

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3. Asymptotic bounds on quantum codes from algebraic geometry codes [J] . Keqin Feng, San Ling, Chaoping Xing IEEE Transactions on Information Theory . 2006,第3期

机译：来自代数几何代码的量子代码的渐近界
4. Linear codes with complementary duals meet the Gilbert-Varshamov bound [C] . Sendrier, N. . 2004

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5. Algebraic function fields with asymptotically many rational places and improvements of the Gilbert-Varshamov bound. [D] . Maharaj, Hiren. 2000

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7. Algebraic geometry codes with complementary duals exceed the asymptotic Gilbert-Varshamov bound [O] . Jin, Lingfei, Xing, Chaoping 2017

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8. Algebraic Hilbert Field Characterizations of Asymptotic Duality States and Optimal Paths to Infinity [R] . Jeroslow, R. G., Kortanek, K. O. 1970

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Algebraic Geometry Codes With Complementary Duals Exceed the Asymptotic Gilbert-Varshamov Bound

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