UNIQUENESS OF REAL AND COMPLEX LINEAR INDEPENDENT COMPONENT ANALYSIS REVISITED

机译：修订了实数和复数线性独立成分分析的唯一性

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Comon showed using the Darmois-Skitovitch theorem that under mild assumptions a real-valued random vector and its linear image are both independent if and only if the linear mapping is the product of a permutation and a scaling matrix. In this work, a much simpler, direct proof is given for this theorem and generalized to the case of random vectors with complex values. The idea is based on the fact that a random vector is independent if and only if locally the Hessian of its logarithmic density is diagonal.

机译：Comon使用Darmois-Skitovitch定理证明，在温和的假设下，当且仅当线性映射是排列和缩放矩阵的乘积时，实值随机向量及其线性图像才是独立的。在这项工作中，对此定理给出了一个更简单，直接的证明，并将其推广到具有复杂值的随机向量的情况。这个想法是基于这样一个事实，即当且仅当其对数密度的Hessian局部为对角线时，随机向量才是独立的。

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来源
《European Signal Processing Conference(EUSIPCO 2004) vol.3; 20040906-10; Vienna(AT)》|2004年|P.1705-1708|共4页
会议地点 Vienna(AT)
作者
F.J. Theis;
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作者单位

Institute of Biophysics, University of Regensburg 93040 Regensburg, Germany;

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原文格式 PDF
正文语种 eng
中图分类信息处理（信息加工）;
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UNIQUENESS OF REAL AND COMPLEX LINEAR INDEPENDENT COMPONENT ANALYSIS REVISITED

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