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Auteurs principaux: Zhao, Yuhan, Chen, Juntao, Lu, Yingdong, Zhu, Quanyan
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2411.06180
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author Zhao, Yuhan
Chen, Juntao
Lu, Yingdong
Zhu, Quanyan
author_facet Zhao, Yuhan
Chen, Juntao
Lu, Yingdong
Zhu, Quanyan
contents Mean field control provides a robust framework for coordinating large-scale populations with complex interactions and has wide applications across diverse fields. However, the inherent nonlinearity and the presence of unknown system dynamics pose significant challenges for developing effective analytic or numerical solutions. There is a pressing need for data-driven methodologies to construct accurate models and facilitate efficient planning and control. To this end, we leverage Koopman operator theory to advance solution methods for mean field control problems. Our approach involves exploring stochastic Koopman operators using spectral analysis techniques. Through Koopman decomposition, we derive a linear model for mean field control problems in a data-driven fashion. Finally, we develop a model predictive control framework to achieve robust control and reduce the computational complexity for mean field control problems, thereby enhancing the efficacy and applicability of mean field control solutions in various domains.
format Preprint
id arxiv_https___arxiv_org_abs_2411_06180
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Mean Field Control by Stochastic Koopman Operator via a Spectral Method
Zhao, Yuhan
Chen, Juntao
Lu, Yingdong
Zhu, Quanyan
Optimization and Control
Mean field control provides a robust framework for coordinating large-scale populations with complex interactions and has wide applications across diverse fields. However, the inherent nonlinearity and the presence of unknown system dynamics pose significant challenges for developing effective analytic or numerical solutions. There is a pressing need for data-driven methodologies to construct accurate models and facilitate efficient planning and control. To this end, we leverage Koopman operator theory to advance solution methods for mean field control problems. Our approach involves exploring stochastic Koopman operators using spectral analysis techniques. Through Koopman decomposition, we derive a linear model for mean field control problems in a data-driven fashion. Finally, we develop a model predictive control framework to achieve robust control and reduce the computational complexity for mean field control problems, thereby enhancing the efficacy and applicability of mean field control solutions in various domains.
title Mean Field Control by Stochastic Koopman Operator via a Spectral Method
topic Optimization and Control
url https://arxiv.org/abs/2411.06180