Wang Jiaolong, Zhang Chengxi, Zhao Shunyi, Wu Jin, Liu Ming
Key Laboratory of Advanced Process Control for Light Industry (Ministry of Education), Jiangnan University, Wuxi, Jiangsu, China.
Department of Electronic and Computer Engineering, Hong Kong University of Science and Technology, Hong Kong, China.
ISA Trans. 2024 Jun;149:307-313. doi: 10.1016/j.isatra.2024.04.024. Epub 2024 Apr 24.
For nonlinear systems with continuous dynamic and discrete measurements, a Log-Euclidean metric (LEM) based novel scheme is proposed to refine the covariance integration steps of continuous-discrete Extended Kalman filter (CDEKF). In CDEKF, the covariance differential equation is usually integrated with regular Euclidean matrix operations, which actually ignores the Riemannian structure of underlying space and poses a limit on the further improvement of estimation accuracy. To overcome this drawback, this work proposes to define the covariance variable on the manifold of symmetric positive definite (SPD) matrices and propagate it using the Log-Euclidean metric. To embed the LEM based novel propagation scheme, the manifold integration of the covariance for LEMCDEKF is proposed together with the details of efficient realization, which can integrate the covariance on SPD manifold and avoid the drawback of Euclidean scheme. Numerical simulations certify the new method's superior accuracy than conventional methods.
针对具有连续动态和离散测量的非线性系统,提出了一种基于对数欧几里得度量(LEM)的新颖方案,以优化连续-离散扩展卡尔曼滤波器(CDEKF)的协方差积分步骤。在CDEKF中,协方差微分方程通常通过常规的欧几里得矩阵运算进行积分,这实际上忽略了基础空间的黎曼结构,并对估计精度的进一步提高造成了限制。为克服这一缺点,本文提出在对称正定(SPD)矩阵流形上定义协方差变量,并使用对数欧几里得度量进行传播。为了嵌入基于LEM的新颖传播方案,提出了LEMCDEKF协方差的流形积分以及高效实现的细节,该方案可以在SPD流形上对协方差进行积分,并避免欧几里得方案的缺点。数值模拟证明了新方法比传统方法具有更高的精度。
