How to Construct Mutually Orthogonal Complementary Sets With Non-Power-of-Two Lengths?

Wu Shing-Wei; Chen Chao-Yu; Liu Zilong

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How to Construct Mutually Orthogonal Complementary Sets With Non-Power-of-Two Lengths?

机译：如何构建具有两个长度的相互正交的互补集？

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Mutually orthogonal complementary sets (MOCSs) have received significant research attention in recent years due to their wide applications in communications and radar. Existing MOCSs which are constructed based on generalized Boolean functions (GBFs) mostly have lengths of power-of-two. How to construct MOCSs with non-power-of-two lengths whilst having large set sizes is a largely open problem. With the aid of GBFs, in this paper, we present new constructions of such MOCSs and show that the maximal achievable set size is 1/2 of the flock size of an MOCS.

机译：近年来由于其在通信和雷达中广泛的应用，近年来，相互正交的互补集（MOCS）已经得到了显着的研究。基于广义布尔函数（GBFS）构造的现有MOCS主要具有两倍的功率长度。如何构建具有两个长度的非功率长度的MOCS，同时具有大型尺寸，这是一个很大程度上的开放问题。借助GBFS的借助，在本文中，我们提出了这种MOCS的新建筑，并表明最大可实现的集合尺寸为MOC的植绒大小的1/2。

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来源
《IEEE Transactions on Information Theory》 |2021年第6期|3464-3472|共9页
作者
Wu Shing-Wei; Chen Chao-Yu; Liu Zilong;
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作者单位

Natl Cheng Kung Univ Dept Engn Sci Tainan 70101 Taiwan;

Natl Cheng Kung Univ Dept Engn Sci Tainan 70101 Taiwan;

Univ Essex Sch Comp Sci & Elect Engn Colchester CO4 3SQ Essex England;

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正文语种 eng
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关键词
Correlation; Boolean functions; OFDM; Upper bound; Multicarrier code division multiple access; Chaotic communication; Radar applications; Golay complementary set (GCS); mutually orthogonal complementary set (MOCS); complete complementary code (CCC); generalized Boolean function;

机译：关联;布尔函数;OFDM;上限;多载波码分多次访问;混沌通信;雷达应用;Golay互补集（GCS）;相互正交的互补集（MOC）;完全互补代码（CCC）;概括的布尔函数;

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How to Construct Mutually Orthogonal Complementary Sets With Non-Power-of-Two Lengths?

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