Approach to Hyperuniformity of Steady States of Facilitated Exchange Processes

Abstract

We consider the fluctuations in the number of particles in a box of size Ld in Zd, d>=1, in the (infinite volume) translation invariant stationary states of the facilitated exclusion process, also called the conserved lattice gas model. When started in a Bernoulli (product) measure at density rho, these systems approach, as t goes to infinity, a "frozen" state for rho<=rhoc, with rhoc=1/2 for d=1 and rhoc<1/2 for d>=2. At rho=rhoc the limiting state is hyperuniform, that is, the variance of the number of particles in the box grows slower than Ld. We give a general description of how the variances at different scales of L behave as rho increases to rhoc. On the largest scale, L>>L2, the fluctuations are normal (in fact the same as in the original product measure), while in a region L1<<L<<L2, with both L1 and L2 going to infinity as rho increases to rhoc, the variance grows faster than normal. For 1<<L<<L1 the variance is the same as in the hyperuniform system. (All results discussed are rigorous for d=1 and based on simulations for d>=2.)