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A Feedback-Type Optimal Solution for Partially-Observed Linear-Quadratic Risk-Sensitive Optimal Control Problem of Mean-Field Type Stochastic Systems

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dc.contributor.authorOh, Yuna-
dc.contributor.authorMoon, Jun-
dc.date.accessioned2025-09-03T07:00:09Z-
dc.date.available2025-09-03T07:00:09Z-
dc.date.issued2025-08-
dc.identifier.issn0018-9286-
dc.identifier.issn1558-2523-
dc.identifier.urihttps://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/208628-
dc.description.abstractWe study the linear-quadratic (LQ) risk-sensitive optimal control problem for mean-field type stochastic differential equations (MF-SDEs) driven by Brownian motion. The expected values of state and control variables are included in the MF-SDE as well as the objective functional, and the objective functional is of the risk-sensitive type. The control has access to the noisy state information from the mean-field type stochastic observation model. Under this setting, we obtain the practically implementable explicit feedback-type linear optimal solution to the problem. In particular, we decompose the original problem into the (control-constrained) partially observed LQ risk-sensitive control problem and the LQ risk-neutral problem for the mean-field dynamics. While the optimal solution of the former is characterized by the risk-sensitive state estimator and satisfies the associated control constraint, the optimal solution of the latter is represented by the state-feedback mean-field type process. Then, by combining the optimal solutions of these two problems, we obtain the explicit feedback-type linear optimal solution to the original problem. We provide the simulation results of the modified national income problem to demonstrate that our feedback-type optimal solution is practically implementable.-
dc.format.extent8-
dc.language영어-
dc.language.isoENG-
dc.publisherInstitute of Electrical and Electronics Engineers-
dc.titleA Feedback-Type Optimal Solution for Partially-Observed Linear-Quadratic Risk-Sensitive Optimal Control Problem of Mean-Field Type Stochastic Systems-
dc.typeArticle-
dc.publisher.location미국-
dc.identifier.doi10.1109/TAC.2025.3545701-
dc.identifier.scopusid2-s2.0-85219080057-
dc.identifier.wosid001540918500025-
dc.identifier.bibliographicCitationIEEE Transactions on Automatic Control, v.70, no.8, pp 5452 - 5459-
dc.citation.titleIEEE Transactions on Automatic Control-
dc.citation.volume70-
dc.citation.number8-
dc.citation.startPage5452-
dc.citation.endPage5459-
dc.type.docTypeArticle-
dc.description.isOpenAccessN-
dc.description.journalRegisteredClassscie-
dc.description.journalRegisteredClassscopus-
dc.relation.journalResearchAreaAutomation & Control Systems-
dc.relation.journalResearchAreaEngineering-
dc.relation.journalWebOfScienceCategoryAutomation & Control Systems-
dc.relation.journalWebOfScienceCategoryEngineering, Electrical & Electronic-
dc.subject.keywordPlusMAXIMUM PRINCIPLE-
dc.subject.keywordPlusEQUATIONS-
dc.subject.keywordPlusGAMES-
dc.subject.keywordAuthorStochastic processes-
dc.subject.keywordAuthorOptimal control-
dc.subject.keywordAuthorNoise measurement-
dc.subject.keywordAuthorProcess control-
dc.subject.keywordAuthorMathematical models-
dc.subject.keywordAuthorFiltration-
dc.subject.keywordAuthorTraining-
dc.subject.keywordAuthorSymmetric matrices-
dc.subject.keywordAuthorStochastic systems-
dc.subject.keywordAuthorState estimation-
dc.subject.keywordAuthorMean-field type stochastic systems-
dc.subject.keywordAuthoroptimal estimation-
dc.subject.keywordAuthorpartially observed risk-sensitive stochastic control-
dc.identifier.urlhttps://ieeexplore.ieee.org/document/10903991-
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