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Auteurs principaux: Ozcan, Selin Ezgi, Ankarali, Mustafa Mert
Format: Preprint
Publié: 2026
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Accès en ligne:https://arxiv.org/abs/2601.06315
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author Ozcan, Selin Ezgi
Ankarali, Mustafa Mert
author_facet Ozcan, Selin Ezgi
Ankarali, Mustafa Mert
contents Koopman operator recently gained increasing attention in the control systems community for its abilities to bridge linear and nonlinear systems. Data driven Koopman operator approximations have established themselves as key enablers for system identification and model predictive control. Nonetheless, such methods commonly entail a preselected definition of states in the function space leading to high dimensional overfitting models and degraded long term prediction performances. We address this problem by proposing a hierarchical probabilistic approach for the Koopman model identification problem. In our method, elements of the model are treated as random variables and the posterior estimates are found using variational Bayesian (VB) inference updates. Our model distinguishes from others in the integration of inclusion flags. By the help of the inclusion flags, we intuitively threshold the probability of each state in the model. We then propose a graph search based algorithm to reduce the preselected states of the Koopman model. We demonstrate that our reduction method overcomes numerical instabilities and the reduced models maintain performance in simulated and real experiments.
format Preprint
id arxiv_https___arxiv_org_abs_2601_06315
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Koopman Model Dimension Reduction via Variational Bayesian Inference and Graph Search
Ozcan, Selin Ezgi
Ankarali, Mustafa Mert
Systems and Control
Koopman operator recently gained increasing attention in the control systems community for its abilities to bridge linear and nonlinear systems. Data driven Koopman operator approximations have established themselves as key enablers for system identification and model predictive control. Nonetheless, such methods commonly entail a preselected definition of states in the function space leading to high dimensional overfitting models and degraded long term prediction performances. We address this problem by proposing a hierarchical probabilistic approach for the Koopman model identification problem. In our method, elements of the model are treated as random variables and the posterior estimates are found using variational Bayesian (VB) inference updates. Our model distinguishes from others in the integration of inclusion flags. By the help of the inclusion flags, we intuitively threshold the probability of each state in the model. We then propose a graph search based algorithm to reduce the preselected states of the Koopman model. We demonstrate that our reduction method overcomes numerical instabilities and the reduced models maintain performance in simulated and real experiments.
title Koopman Model Dimension Reduction via Variational Bayesian Inference and Graph Search
topic Systems and Control
url https://arxiv.org/abs/2601.06315