On Recursive State Estimation for Linear State-Space Models Having Quantized Output Data

TL;DR

This paper compares classical and new recursive state estimation methods for linear systems with quantized outputs, analyzing their accuracy and computational efficiency through simulations.

Contribution

It introduces a Gaussian sum filter approach for quantized data and evaluates various resampling techniques in particle filtering.

Findings

Gaussian sum filter effectively models quantized data.

Resampling methods impact particle filter performance.

Simulation results compare accuracy and computational cost.

Abstract

In this paper, we study the problem of estimating the state of a dynamic state-space system where the output is subject to quantization. We compare some classical approaches and a new development in the literature to obtain the filtering and smoothing distributions of the state conditioned to quantized data. The classical approaches include the Extended Kalman filter/smoother in which we consider an approximation of the quantizer non-linearity based on the arctan function, the quantized Kalman filter/smoother, the Unscented Kalman filter/smoother, and the Sequential Monte Carlo sampling method also called particle filter/smoother. We consider a new approach based on the Gaussian sum filter/smoother where the probability mass function of the quantized data given the state is modeled as an integral equation and approximated using Gauss-Legendre quadrature. The Particle filter is addressed considering some resampling methods used to deal with the degeneracy problem. Also, the sample impoverishment caused by the resampling method is addressed by introducing diversity in the samples set using the Markov Chain Monte Carlo method. In this paper, we discuss the implementation of the aforementioned algorithms and the Particle filter/smoother implementation is studied by using different resampling methods combined with two Markov Chain algorithms. A numerical simulation is presented to analyze the accuracy of the estimation and the computational cost.