Approach to Hyperuniformity in the One-Dimensional Facilitated Exclusion Process
Abstract
For the one-dimensional Facilitated Exclusion Process with initial state a product measure of density =1/2-δ, δ0, there exists an infinite-time limiting state in which all particles are isolated and hence cannot move. We study the variance V(L), under , of the number of particles in an interval of L sites. Under 1/2 either all odd or all even sites are occupied, so that V(L)=0 for L even and V(L)=1/4 for L odd: the state is hyperuniform, since V(L) grows more slowly than L. We prove that for densities approaching 1/2 from below there exist three regimes in L, in which the variance grows at different rates: for Lδ-2, V(L)(1-)L, just as in the initial state; for A(δ) Lδ-2, with A(δ)=δ-2/3 for L odd and A(δ)=1 for L even, V(L) CL3/2 with C=22/π/3; and for Lδ-2/3 with L odd, V(L)1/4. The analysis is based on a careful study of a renewal process with a long tail. Our study is motivated by simulation results showing similar behavior in higher dimensions; we discuss this background briefly.
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