Optimal Estimation and Cramér-Rao Bounds for Partial Non-Gaussian State Space Models

Niclas Bergman; Arnaud Doucet; Neil Gordon

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Optimal Estimation and Cramér-Rao Bounds for Partial Non-Gaussian State Space Models

机译：局部非高斯状态空间模型的最优估计和Cramér-Rao界

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摘要

Partial non-Gaussian state-space models include many models of interest while keeping a convenient analytical structure. In this paper, two problems related to partial non-Gaussian models are addressed. First, we present an efficient sequential Monte Carlo method to perform Bayesian inference. Second, we derive simple recursions to compute posterior Cramér-Rao bounds (PCRB). An application to jump Markov linear systems (JMLS) is given.

机译：部分非高斯状态空间模型包括许多感兴趣的模型，同时保留了便利的分析结构。在本文中，解决了与部分非高斯模型有关的两个问题。首先，我们提出一种有效的顺序蒙特卡洛方法来执行贝叶斯推理。其次，我们推导简单的递归来计算后Cramér-Rao边界（PCRB）。给出了跳跃马尔可夫线性系统（JMLS）的应用。

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来源
《Annals of the Institute of Statistical Mathematics》 |2001年第1期|97-112|共16页
作者
Niclas Bergman; Arnaud Doucet; Neil Gordon;
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作者单位

Division of Automatic Control Linköping University;

Signal Processing Group Department of Engineering University of Cambridge;

Defence Evaluation and Research Agency;

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正文语种 eng
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关键词
Optimal estimation; Bayesian inference; sequential Monte Carlo methods; posterior Cramér-Rao bounds;

机译：最优估计;贝叶斯推断;顺序蒙特卡洛方法;后Cramér-Rao边界;

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Optimal Estimation and Cramér-Rao Bounds for Partial Non-Gaussian State Space Models

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