On optimal control of coupled mean-field forward-backward stochastic equations

Badreddine Mansouri; Brahim Mezerdi; Khaled Bahlali

doi:10.1515/rose-2024-2017

On optimal control of coupled mean-field forward-backward stochastic equations

Badreddine Mansouri^*, Brahim Mezerdi, Khaled Bahlali

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

Abstract

We consider a control problem for a mean-field coupled forward-backward stochastic differential equations, called also McKean–Vlasov equation (MF-FBSDE). For this type of equations, the coefficients depend not only on the state of the system, but also on its marginal distributions. They arise naturally in mean-field control problems and mean-field games. We consider the relaxed control problem where admissible controls are measure-valued processes. We prove the existence of a relaxed optimal control by using a suitable form of Skorokhod representation theorem and Jakubowski’s topology, on the space of càdlàg functions. We use martingale measure to define the relaxed state process. Our results extend to MF-FBSDEs those already known for forward and backward stochastic equations of Itô type.

Original language	English
Pages (from-to)	345-356
Number of pages	12
Journal	Random Operators and Stochastic Equations
Volume	32
Issue number	4
DOIs	https://doi.org/10.1515/rose-2024-2017
State	Published - 1 Nov 2024

Bibliographical note

Publisher Copyright:
© 2024 Walter de Gruyter GmbH. All rights reserved.

Keywords

McKean–Vlasov equation
martingale
mean-field forward-backward stochastic differential equation
relaxed control
stochastic optimal control
tightness
weak convergence

ASJC Scopus subject areas

Analysis
Statistics and Probability

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10.1515/rose-2024-2017

Cite this

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abstract = "We consider a control problem for a mean-field coupled forward-backward stochastic differential equations, called also McKean–Vlasov equation (MF-FBSDE). For this type of equations, the coefficients depend not only on the state of the system, but also on its marginal distributions. They arise naturally in mean-field control problems and mean-field games. We consider the relaxed control problem where admissible controls are measure-valued processes. We prove the existence of a relaxed optimal control by using a suitable form of Skorokhod representation theorem and Jakubowski{\textquoteright}s topology, on the space of c{\`a}dl{\`a}g functions. We use martingale measure to define the relaxed state process. Our results extend to MF-FBSDEs those already known for forward and backward stochastic equations of It{\^o} type.",

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AU - Mansouri, Badreddine

AU - Mezerdi, Brahim

AU - Bahlali, Khaled

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N2 - We consider a control problem for a mean-field coupled forward-backward stochastic differential equations, called also McKean–Vlasov equation (MF-FBSDE). For this type of equations, the coefficients depend not only on the state of the system, but also on its marginal distributions. They arise naturally in mean-field control problems and mean-field games. We consider the relaxed control problem where admissible controls are measure-valued processes. We prove the existence of a relaxed optimal control by using a suitable form of Skorokhod representation theorem and Jakubowski’s topology, on the space of càdlàg functions. We use martingale measure to define the relaxed state process. Our results extend to MF-FBSDEs those already known for forward and backward stochastic equations of Itô type.

AB - We consider a control problem for a mean-field coupled forward-backward stochastic differential equations, called also McKean–Vlasov equation (MF-FBSDE). For this type of equations, the coefficients depend not only on the state of the system, but also on its marginal distributions. They arise naturally in mean-field control problems and mean-field games. We consider the relaxed control problem where admissible controls are measure-valued processes. We prove the existence of a relaxed optimal control by using a suitable form of Skorokhod representation theorem and Jakubowski’s topology, on the space of càdlàg functions. We use martingale measure to define the relaxed state process. Our results extend to MF-FBSDEs those already known for forward and backward stochastic equations of Itô type.

KW - McKean–Vlasov equation

KW - martingale

KW - mean-field forward-backward stochastic differential equation

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KW - stochastic optimal control

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On optimal control of coupled mean-field forward-backward stochastic equations

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

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