On the derivation of the Hartree equation in the mean field limit: Uniformity in the Planck constant

Abstract

In this paper the Hartree equation is derived from the N-body Schr\''odinger equation in the mean-field limit, with convergence rate estimates that are uniform in the Planck constant . Specifically, we consider the two following cases:(a) T\''oplitz initial data and Lipschitz interaction forces, and (b) analytic initial data and interaction potential, over short time intervals independent of . The convergence rates in these two cases are 1/ N and 1/N respectively. The treatment of the second case is entirely self-contained and all the constants appearing in the final estimate are explicit. It provides a derivation of the Vlasov equation from the N-body classical dynamics using BBGKY hierarchies instead of empirical measures.