Finite-size localization scenarios in condensation transitions

Abstract

We consider the phenomenon of condensation of a globally conserved quantity H=Σi=1N εi distributed on N sites, occurring when the density h= H/N exceeds a critical density hc. We numerically study the dependence of the participation ratio Y2= εi2/(Nh2) on the size N of the system and on the control parameter δ = (h-hc), for various models: (i)~a model with two conservation laws, derived from the Discrete NonLinear Schr\"odinger equation; (ii)~the continuous version of the Zero Range Process class, for different forms of the function f(ε) defining the factorized steady state. Our results show that various localization scenarios may appear for finite N and close to the transition point. These scenarios are characterized by the presence or the absence of a minimum of Y2 when plotted against N and by an exponent γ≥ 2 defined through the relation N* δ-γ, where N* separates the delocalized region (N N*, Y2 vanishes with increasing N) from the localized region (N N*, Y2 is approximately constant). We finally compare our results with the structure of the condensate obtained through the single-site marginal distribution.