Flux fluctuations in the one dimensional nearest neighbors symmetric simple exclusion process
arXiv:math/0103233 · doi:10.1023/A:1014577928229
Abstract
Let $J(t)$ be the the integrated flux of particles in the symmetric simple exclusion process starting with the product invariant measure $ν_Ï$ with density $Ï$. We compute its rescaled asymptotic variance: \[ \lim_{t\to\infty} t^{-1/2} \V J(t) = \sqrt{2/Ï} (1-Ï)Ï\] Furthermore we show that $t^{-1/4}J(t)$ converges weakly to a centered normal random variable with this variance. From these results we compute the asymptotic variance of a tagged particle in the nearest neighbor case and show the corresponding central limit theorem, results previously proven by Arratia.
7 pages. A short discussion about the relationship of the flux fluctuations and the equilibrium density fluctuation fields was added at the end