AN OPTIMAL LINEAR FILTER FOR ESTIMATION OF RANDOM FUNCTIONS IN HILBERT SPACE

The ANZIAM journal Pub Date : 2020-07-01 DOI:10.1017/S1446181120000188

P. Howlett, A. Torokhti

引用次数: 0

Abstract

Abstract Let $\boldsymbol{f}$ be a square-integrable, zero-mean, random vector with observable realizations in a Hilbert space H, and let $\boldsymbol{g}$ be an associated square-integrable, zero-mean, random vector with realizations which are not observable in a Hilbert space K. We seek an optimal filter in the form of a closed linear operator X acting on the observable realizations of a proximate vector $\boldsymbol{f}_{\epsilon } \approx \boldsymbol{f}$ that provides the best estimate $\widehat{\boldsymbol{g}}_{\epsilon} = X \boldsymbol{f}_{\epsilon}$ of the vector $\boldsymbol{g}$ . We assume the required covariance operators are known. The results are illustrated with a typical example.

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希尔伯特空间中随机函数估计的最优线性滤波器

设$\boldsymbol{f}$为Hilbert空间H中具有可观测实现的平方可积、零均值随机向量，设$\boldsymbol{g}$为相关平方可积、零均值、具有在Hilbert空间k中不可观察到的实现的随机向量。我们寻求一个最优滤波器，其形式为一个封闭线性算子X作用于一个近似向量$\boldsymbol{f}_{\epsilon } \approx \boldsymbol{f}$的可观察实现，该近似向量提供了对该向量$\boldsymbol{g}$的最佳估计$\widehat{\boldsymbol{g}}_{\epsilon} = X \boldsymbol{f}_{\epsilon}$。我们假设所需的协方差算子是已知的。最后用一个典型实例说明了计算结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The ANZIAM journal

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