About Kac's Program in Kinetic Theory
Abstract
In this Note we present the main results from the recent work arxiv:1107.3251, which answers several conjectures raised fifty years ago by Kac. There Kac introduced a many-particle stochastic process (now denoted as Kac's master equation) which, for chaotic data, converges to the spatially homogeneous Boltzmann equation. We answer the three following questions raised in \cite{kac}: (1) prove the propagation of chaos for realistic microscopic interactions (i.e. in our results: hard spheres and true Maxwell molecules); (2) relate the time scales of relaxation of the stochastic process and of the limit equation by obtaining rates independent of the number of particles; (3) prove the convergence of the many-particle entropy towards the Boltzmann entropy of the solution to the limit equation (microscopic justification of the -theorem of Boltzmann in this context). These results crucially rely on a new theory of quantitative uniform in time estimates of propagation of chaos.
Cite
@article{arxiv.1111.3472,
title = {About Kac's Program in Kinetic Theory},
author = {Stéphane Mischler and Clément Mouhot},
journal= {arXiv preprint arXiv:1111.3472},
year = {2014}
}
Comments
7 pages. Announcement of the results in arXiv:1107.3251. To appear in Comptes Rendus Acad. Sciences Paris