Around the Quantum Lenard-Balescu equation

Abstract

In the mean-field regime, a gas of quantum particles with Boltzmann statistics can be described by the Hartree-Fock equation. This dynamics becomes trivial if the initial distribution of particle is invariant by translation. However, the first correction is given on time of order O(N) by the quantum Lenard--Balescu equation. In the first part of the present article, we justify this equation until time of order O(( N)1-δ) (for any δ∈(0,1)). A similar phenomenon exists in the classical setting (with a similar validity time obtained by Duerinckx Duerinckx). In a second time, we prove the convergence for dimension d≥ 2 of the solutions of the quantum Lenard--Balescu equation to the solutions of its classical counterpart in the semi-classical limit. This problem can be interpreted as a grazing collision limit: the quantum Lenard--Balescu equation looks like a cut-off Boltzmann equation, when the classical one looks like the Landau equation.