On Mean Field Limits for Dynamical Systems
Mathematical Physics
2015-09-07 v2 Statistical Mechanics
math.MP
Abstract
We present a purely probabilistic proof of propagation of molecular chaos for -particle systems in dimension with interaction forces scaling like with and cut-off at . The proof yields a Gronwall estimate for the maximal distance between exact microscopic and approximate mean-field dynamics. This can be used to show propagation of molecular chaos, i.e. weak convergence of the marginals to the corresponding products of solutions of the respective mean-field equation without cut-off in a quantitative way. Our results thus lead to a derivation of the Vlasov equation from the microscopic -particle dynamics with force term arbitrarily close to the physically relevant Coulomb- and gravitational forces.
Cite
@article{arxiv.1307.2999,
title = {On Mean Field Limits for Dynamical Systems},
author = {Niklas Boers and Peter Pickl},
journal= {arXiv preprint arXiv:1307.2999},
year = {2015}
}
Comments
17 Pages