A STOCHASTIC MAXIMUM PRINCIPLE FOR GENERAL MEAN-FIELD SYSTEM WITH CONSTRAINTS
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Date
2025
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AMER INST MATHEMATICAL SCIENCES-AIMS
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Green Open Access
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Abstract
In this paper we study the optimal control of a general mean-field stochastic differential equation with constraints. We establish a set of necessary conditions for the optimal control where the coefficients of the controlled system depend nonlinearly on both the state process as well as of its probability law. The control domain is not necessarily convex. The proof of our main result is based on the first-order and second-order derivatives with respect to measure in the Wasserstein space of probability measures and the variational principle. We prove Peng's type necessary optimality conditions for a general mean-field system under state constraints. Our result generalizes the stochastic maximum principle of Buckdahn et al. [2] to the case with constraints.
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Keywords
Stochastic control, stochastic differential equations of mean-field type, variational principle, second-order derivative with respect to measures, maximum principle, OPTIMALITY CONDITIONS, EQUATIONS, DELAY, Second-Order Derivative with Respect to Measures, Variational Principle, Stochastic Differential Equations of Mean-Field Type, Stochastic Control, Maximum Principle, variational principle, equations of mean-field type, maximum principle, second-order derivative with respect to measures, stochastic differential, Optimal stochastic control, stochastic control, Stochastic ordinary differential equations (aspects of stochastic analysis)
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Numerical Algebra, Control and Optimization
Volume
15
Issue
3
Start Page
565
End Page
578
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Scopus : 1
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