Diffusion of interacting particles in discrete geometries: Equilibrium and dynamical properties

“…Recently, we have studied the diffusive behavior of a lattice model of interacting particles [41][42][43]. The original motivation was the study of diffusion in nanoporous materials [44].…”

“…The rates at which a reservoir cavity at chemical potential μ adds ( + k n ) or removes ( − k n ) one particle from a cavity containing n particles are This model is a GEP [35] with a stochastic thermodynamical interpretation for the equilibrium statistics and dynamics. When defined like this it is an adequate model for the understanding of the equilibrium and diffusive behavior of particles in nanoporous materials [41][42][43]. For = n 1 max the model reduces to the SSEP.…”

“…The free energy can be written as = + + F n n cn f n ( ) ln ! ( ), with c a constant [41,42]. The first term accounts for the indistinguishability of the particles.…”

Current fluctuations in boundary driven diffusive systems in different dimensions: a numerical study

“…Recently, we have studied the diffusive behavior of a lattice model of interacting particles [41][42][43]. The original motivation was the study of diffusion in nanoporous materials [44].…”

“…The rates at which a reservoir cavity at chemical potential μ adds ( + k n ) or removes ( − k n ) one particle from a cavity containing n particles are This model is a GEP [35] with a stochastic thermodynamical interpretation for the equilibrium statistics and dynamics. When defined like this it is an adequate model for the understanding of the equilibrium and diffusive behavior of particles in nanoporous materials [41][42][43]. For = n 1 max the model reduces to the SSEP.…”

“…The free energy can be written as = + + F n n cn f n ( ) ln ! ( ), with c a constant [41,42]. The first term accounts for the indistinguishability of the particles.…”

Current fluctuations in boundary driven diffusive systems in different dimensions: a numerical study

“…Even though the ρ-dependence is qualitatively reproduced, the numerically obtained value of the diffusion coefficient is lower. From extensive numerical simulations [2,4,6] we suspect that correlations always lower the diffusion. We refer to [4] for a detailed discussion of the influence of correlations upon the diffusion.…”

“…Refs. [2,4] for a description of the simulation methods. In two and three dimensions the algorithm of Schulze [5] is used.…”

Comment on “Generalized exclusion processes: Transport coefficients”

Short-range and long-range correlations in driven dense colloidal mixtures in narrow pores