Stationary fluctuations for a multi-species zero range process with long jumps

Abstract

We consider stationary fluctuations for the multi-species zero range process with long jumps in one dimension, where the underlying transition probability kernel is p(x) = c+ |x|-1-α if x > 0 and = c-|x|-1-α if x < 0. Above, c ≥ 0, α > 0 are parameters. We prove that for 0 < α < 3/2, the density fluctuation fields converge to the stationary solution of a coupled fractional Ornstein-Uhlenbeck process, and for α=3/2, the limit points are concentrated on stationary energy solutions to a coupled fractional Burgers equation.