A semi-discrete approximation for first-order stationary mean field games
Abstract
We provide an approximation scheme for first-order stationary mean field games with a separable Hamiltonian. First, we discretize Hamilton-Jacobi equations by discretizing in time, and then prove the existence of minimizing holonomic measures for mean field games. At last, we obtain two sequences of solutions \ui\ of discrete Hamilton-Jacobi equations and minimizing holonomic measures \mi\ for mean field games and show that (ui,mi) converges to a solution of the stationary mean field games.
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