State Estimation for Linear Systems with Non-Gaussian Measurement Noise via Dynamic Programming
Systems and Control
2025-09-09 v1 Systems and Control
Abstract
We propose a new recursive estimator for linear dynamical systems under Gaussian process noise and non-Gaussian measurement noise. Specifically, we develop an approximate maximum a posteriori (MAP) estimator using dynamic programming and tools from convex analysis. Our approach does not rely on restrictive noise assumptions and employs a Bellman-like update instead of a Bayesian update. Our proposed estimator is computationally efficient, with only modest overhead compared to a standard Kalman filter. Simulations demonstrate that our estimator achieves lower root mean squared error (RMSE) than the Kalman filter and has comparable performance to state-of-the-art estimators, while requiring significantly less computational power.
Cite
@article{arxiv.2509.05482,
title = {State Estimation for Linear Systems with Non-Gaussian Measurement Noise via Dynamic Programming},
author = {Mohammad Hussein Yoosefian Nooshabadi and Laurent Lessard},
journal= {arXiv preprint arXiv:2509.05482},
year = {2025}
}