Establishes global existence of entropy-regularized equilibria for time-inconsistent continuous-time MFGs via Schauder fixed-point arguments and proves their convergence to original equilibria using compactness and Young measures, plus convergence of a policy iteration algorithm under short-horizon
(2025): Mean field game of controls with stat e reflections: Existence and limit theory
3 Pith papers cite this work. Polarity classification is still indexing.
abstract
This paper studies mean field game (MFG) of controls by featuring the state-control joint distribution and the reflected state process at an exogenous stochastic reflection boundary. We contribute to the literature with a customized relaxed formulation and some new compactification arguments to establish the existence of a Markovian mean field equilibrium (MFE) in the weak sense. We consider an enlarged canonical space, utilizing the dynamic Skorokhod mapping, to accommodate the stochastic reflection boundary process. A fixed-point argument on the extended space using an extension transformation technique is developed to tackle challenges from the joint measure flow of the state and the relaxed control that may not be continuous. Furthermore, the bidirectional connections between the MFG and the $N$-player game are established. We first show that any weak limit of empirical measures induced by $\boldsymbol{\epsilon}$-Nash equilibria in $N$-player games must be supported exclusively on the set of relaxed mean field equilibria, analogous to the propagation of chaos in mean field control problems. We then prove the convergence result that a Markovian MFE in the weak sense can be approximated by a sequence of constructed $\boldsymbol{\epsilon}$-Nash equilibria in the weak sense in $N$-player games when $N$ tends to infinity.
verdicts
UNVERDICTED 3representative citing papers
Existence and uniqueness are established for ergodic mean field games of controls with state constraints under monotone coupling and Hamiltonians with at most quadratic growth.
Establishes existence of mean field equilibrium for a benchmark-tracking portfolio game using PDE methods on reflected processes and constructs approximate Nash equilibria for large finite populations.
citing papers explorer
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Ergodic Mean Field Games of Controls with State Constraints
Existence and uniqueness are established for ergodic mean field games of controls with state constraints under monotone coupling and Hamiltonians with at most quadratic growth.