Global fluctuations for 1D log-gas dynamics. (2) Covariance kernel and support

Abstract

We consider the hydrodynamic limit in the macroscopic regime of the coupled system of stochastic differential equations, dλti=1N dWti - V'(λti) dt+ β2N Σj=i dtλit-λjt, i=1,…,N, with β>1, sometimes called generalized Dyson's Brownian motion, describing the dissipative dynamics of a log-gas of N equal charges with equilibrium measure corresponding to a β-ensemble, with sufficiently regular convex potential V. The limit N∞ is known to satisfy a mean-field Mc Kean-Vlasov equation. Fluctuations around this limit have been shown by the author to define a Gaussian process solving some explicit martingale problem written in terms of a generalized transport equation. We prove a series of results concerning either the Mc Kean-Vlasov equation for the density t, notably regularity results and time-evolution of the support, or the associated hydrodynamic fluctuation process, whose space-time covariance kernel we compute explicitly.