From Landau Equation and Large Deviations to Efficient Simulations of Dynamical Fluctuations

Abstract

The (deterministic) Landau equation captures the mean long-term evolution of dynamically hot long-range interacting finite-N systems. Though successful, this kinetic equation fundamentally ignores dynamical fluctuations. Building upon Large Deviation Theory, we present a physically-consistent system of Langevin equations that simultaneously recovers the mean Landau dynamics and accurately captures the corresponding fluctuations among different realizations. We show in particular how these Langevin equations can be derived from Rostoker's principle in the limit of weak two-body deflections. We extensively validate these equations against tailored direct N-body simulations, showing an exquisite level of agreement.