On the L2 Rate of Convergence in the Limit from the Hartree to the Vlasovx2013Poisson Equation

Abstract

Using a new stability estimate for the difference of the square roots of two solutions of the Vlasovx2013Poisson equation, we obtain the convergence in the L2 norm of the Wigner transform of a solution of the Hartree equation with Coulomb potential to a solution of the Vlasovx2013Poisson equation, with a rate of convergence proportional to . This improves the 3/4- rate of convergence in L2 obtained in [L.~Lafleche, C.~Saffirio: Analysis & PDE, to appear]. Another reason of interest of this paper is the new method, reminiscent of the ones used to prove the mean-field limit from the many-body Schr\"odinger equation towards the Hartreex2013Fock equation for mixed states.