On the long time convergence of potential MFG
Abstract
We look at the long time behavior of potential Mean Field Games (briefly MFG) using some standard tools from weak KAM theory. We first show that the time-dependent minimization problem converges to an ergodic constant -λ, then we provide a class of examples where the value of the stationary MFG minimization problem is strictly greater than -λ. This will imply that the trajectories of the time-dependent MFG system do not converge to static equilibria.
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