Convolution on the    -Sphere With Application to PDF Modeling

Dokmanic I.; Petrinovic D.

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Convolution on the -Sphere With Application to PDF Modeling

机译：-Sphere上的卷积及其在PDF建模中的应用

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摘要

In this paper, we derive an explicit form of the convolution theorem for functions on an n -sphere. Our motivation comes from the design of a probability density estimator for n -dimensional random vectors. We propose a probability density function (pdf) estimation method that uses the derived convolution result on Sn. Random samples are mapped onto the n -sphere and estimation is performed in the new domain by convolving the samples with the smoothing kernel density. The convolution is carried out in the spectral domain. Samples are mapped between the n-sphere and the n-dimensional Euclidean space by the generalized stereographic projection. We apply the proposed model to several synthetic and real-world data sets and discuss the results.

机译：在本文中，我们导出了n球面上函数的卷积定理的显式形式。我们的动机来自于n维随机向量的概率密度估计器的设计。我们提出一种概率密度函数（pdf）估计方法，该方法使用在Sn上得出的卷积结果。将随机样本映射到n球上，并通过将样本与平滑核密度进行卷积在新域中执行估计。卷积在光谱域中进行。通过广义立体投影，将样本映射到n球体和n维欧几里德空间之间。我们将建议的模型应用于多个综合和现实数据集并讨论结果。

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来源
《Signal Processing, IEEE Transactions on》 |2010年第3期|共14页
作者
Dokmanic I.; Petrinovic D.;
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作者单位

Dept. of Electron. Syst. & Inf. Process., Univ. of Zagreb, Zagreb, Croatia;

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原文格式 PDF
正文语种 eng
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关键词
$n$ -sphere; Convolution; density estimation; hypersphere; hyperspherical harmonics; rotations; spherical harmonics;

机译：$ n $-球;卷积;密度估计;超球;超球谐;旋转;球谐;

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Convolution on the -Sphere With Application to PDF Modeling

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