Explicit symmetric pseudo-random matrices

机译：显式对称伪随机矩阵

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We consider the problem of generating symmetric pseudo-random sign (±1) matrices based on the similarity of their spectra to Wigner's semicircular law. Using binary m-sequences (Golomb sequences) of lengths n = 2^{m- 1, we give a simple explicit construction of circulant n × n sign matrices and show that their spectra converge to the semicircular law when n grows. The Kolmogorov complexity of the proposed matrices equals to that of Golomb sequences and is at most 2log₂(n) bits.}

机译：我们考虑基于它们的光谱与维格纳半圆定律的相似性来生成对称伪随机符号（±1）矩阵的问题。使用长度为n = 2的二进制m序列（Golomb序列） ^{m
-1，我们给出循环n×n符号矩阵的简单显式构造，并证明当n增大时，它们的光谱收敛于半圆定律。拟议矩阵的Kolmogorov复杂度等于Golomb序列的复杂度，最大为2log
_{2
（n）个位。}}

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《IEEE Information Theory Workshop》|2017年|424-428|共5页
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Ilya Soloveychik; Yu Xiang; Vahid Tarokh;
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Symmetric matrices; Complexity theory; Limiting; Information theory; Convergence; Signal processing algorithms; Conferences;

机译：对称矩阵复杂性理论限制信息论收敛信号处理算法会议;

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6. mbend: an R package for bending non-positive-definite symmetric matrices to positive-definite [O] . Mohammad Ali Nilforooshan 2020

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8. Explicit Block Diagonal Decomposition of Block Matrices Corresponding to Symmetric and Regular Structures of Finite Size [R] . Dinkevich, S. 1986

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Explicit symmetric pseudo-random matrices

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