Robust Square Root Unscented Kalman filter of graph signals

Jinhui Hu, Haiquan Zhao, Yi Peng
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Abstract

Considering the problem of nonlinear and non-gaussian filtering of the graph signal, in this paper, a robust square root unscented Kalman filter based on graph signal processing is proposed. The algorithm uses a graph topology to generate measurements and an unscented transformation is used to obtain the priori state estimates. In addition, in order to enhance the numerical stability of the unscented Kalman filter, the algorithm combines the double square root decomposition method to update the covariance matrix in the graph frequency domain. Furthermore, to handle the non-Gaussian noise problem in the state estimation process, an error augmentation model is constructed in the graph frequency domain by unifying the measurement error and state error, which utilizes the Laplace matrix of the graph to effectively reduce the cumulative error at each vertex. Then the general robust cost function is adopted as the optimal criterion to deal with the error, which has more parameter options so that effectively suppresses the problems of random outliers and abnormal measurement values in the state estimation process. Finally, the convergence of the error of the proposed algorithm is firstly verified theoretically, and then the robustness of the proposed algorithm is verified by experimental simulation.
图信号的鲁棒平方根无痕卡尔曼滤波器
考虑到图形信号的非线性和非高斯滤波问题,本文提出了一种基于图形信号处理的鲁棒平方根无cented 卡尔曼滤波器。该算法使用图拓扑生成测量值,并使用无cented变换获得先验状态估计值。此外,为了增强无特征卡尔曼滤波器的数值稳定性,该算法结合了双平方根分解方法来更新图频域中的协方差矩阵。此外,为了处理状态估计过程中的非高斯噪声问题,通过统一测量误差和状态误差,在图频域中构建了误差增强模型,利用图的拉普拉斯矩阵有效减少了每个顶点的累积误差。然后,采用一般鲁棒代价函数作为处理误差的最优准则,该准则具有更多的参数选项,可有效抑制状态估计过程中的随机离群值和异常测量值问题。最后,首先从理论上验证了所提算法误差的收敛性,然后通过实验模拟验证了所提算法的鲁棒性。
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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