New Uniqueness Results For A Mean Field Game Of Controls
Abstract
We propose a new approach to proving the uniqueness of solutions to a certain class of mean field games of controls. In this class, the equilibrium is determined by an aggregate quantity Q(t), e.g. the market price or production, which then determines optimal trajectories for agents. Our approach consists in analyzing the relationship between Q(t) and corresponding optimal trajectories to find conditions under which there is at most one equilibrium. We show that our conditions do not match those prescribed by the Lasry-Lions monotonicity condition, nor even displacement monotonicity, but they do apply to economic models that have been proposed in the literature.
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