熵条件中心极限定理和 Hadamard 压缩

Zhi-Ming Ma, Liu-Quan Yao, Shuai Yuan, Hua-Zi Zhang
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引用次数: 0

摘要

我们利用熵属性建立了一个收敛定理(主定理),揭示了条件熵衡量渐近高斯性。作为应用,我们建立了{it entropic conditionalcentral limit theorem}(CCLT),它比经典的 CCLT 更强。作为另一个应用,我们证明了在迭代哈达玛变换下的连续输入,几乎所有以先前信号值为条件的输出分布都将趋于高斯分布,而且条件分布实际上对条件不敏感。这些结果使我们能够对 Hadamard 压缩进行理论研究,为之前文献中的模拟结果提供了坚实的理论分析支持。我们还证明了条件费雪信息可以用来测量渐近高斯性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Entropic Conditional Central Limit Theorem and Hadamard Compression
We make use of an entropic property to establish a convergence theorem (Main Theorem), which reveals that the conditional entropy measures the asymptotic Gaussianity. As an application, we establish the {\it entropic conditional central limit theorem} (CCLT), which is stronger than the classical CCLT. As another application, we show that continuous input under iterated Hadamard transform, almost every distribution of the output conditional on the values of the previous signals will tend to Gaussian, and the conditional distribution is in fact insensitive to the condition. The results enable us to make a theoretic study concerning Hadamard compression, which provides a solid theoretical analysis supporting the simulation results in previous literature. We show also that the conditional Fisher information can be used to measure the asymptotic Gaussianity.
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