高斯求积
集合卡尔曼滤波器
卡尔曼滤波器
高斯分布
数学
扩展卡尔曼滤波器
算法
应用数学
非线性系统
高斯噪声
高斯过程
高斯滤波器
赫米特多项式
高斯-厄米特求积
Gauss–Kronrod求积公式
高斯和
数学分析
统计
离散数学
尼氏法
物理
积分方程
量子力学
作者
Ienkaran Arasaratnam,S. Haykin,Robert J. Elliott
出处
期刊:Proceedings of the IEEE
[Institute of Electrical and Electronics Engineers]
日期:2007-05-01
卷期号:95 (5): 953-977
被引量:615
标识
DOI:10.1109/jproc.2007.894705
摘要
In this paper, a new version of the quadrature Kalman filter (QKF) is developed theoretically and tested experimentally. We first derive the new QKF for nonlinear systems with additive Gaussian noise by linearizing the process and measurement functions using statistical linear regression (SLR) through a set of Gauss-Hermite quadrature points that parameterize the Gaussian density. Moreover, we discuss how the new QKF can be extended and modified to take into account specific details of a given application. We then go on to extend the use of the new QKF to discrete-time, nonlinear systems with additive, possibly non-Gaussian noise. A bank of parallel QKFs, called the Gaussian sum-quadrature Kalman filter (GS-QKF) approximates the predicted and posterior densities as a finite number of weighted sums of Gaussian densities. The weights are obtained from the residuals of the QKFs. Three different Gaussian mixture reduction techniques are presented to alleviate the growing number of the Gaussian sum terms inherent to the GS-QKFs. Simulation results exhibit a significant improvement of the GS-QKFs over other nonlinear filtering approaches, namely, the basic bootstrap (particle) filters and Gaussian-sum extended Kalman filters, to solve nonlinear non- Gaussian filtering problems.
科研通智能强力驱动
Strongly Powered by AbleSci AI