论两个高斯点与 $$\boldsymbol\{mathbb{R}}^{boldsymbol{d}}$ 的正态协方差图之间的欧氏距离

Pub Date : 2024-04-09 DOI:10.3103/s1068362324010059

D. M. Martirosyan, V. K. Ohanyan

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引用次数: 0

摘要

摘要协方差的概念从$\mathbb{R}^{d}$中的有界凸体扩展到了$\mathbb{R}^{d}$的整个空间，得到了两个$d$维高斯点之间欧氏距离的分布和概率密度函数的积分表示，这两个高斯点具有由协方差矩阵支配的相关坐标。当 $d=2$ 时，可以得到密度函数的闭式表达式。根据协方差矩阵的极值特征值，可以找到所考虑的距离矩的精确边界。

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On the Euclidean Distance between Two Gaussian Points and the Normal Covariogram of $$\boldsymbol{\mathbb{R}}^{\boldsymbol{d}}$$

Abstract

The concept of covariogram is extended from bounded convex bodies in $\mathbb{R}^{d}$ to the entire space $\mathbb{R}^{d}$ by obtaining integral representations for the distribution and probability density functions of the Euclidean distance between two $d$-dimensional Gaussian points that have correlated coordinates governed by a covariance matrix. When $d=2$, a closed-form expression for the density function is obtained. Precise bounds for the moments of the considered distance are found in terms of the extreme eigenvalues of the covariance matrix.

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