Hydrodynamic limit in a particle system with topological interactions

Abstract

We study a system of particles in the interval [0,ε-1] Z, ε-1 a positive integer. The particles move as symmetric independent random walks (with reflections at the endpoints); simultaneously new particles are injected at site 0 at rate jε (j>0) and removed at same rate from the rightmost occupied site. The removal mechanism is therefore of topological rather than metric nature. The determination of the rightmost occupied site requires a knowledge of the entire configuration and prevents from using correlation functions techniques. We prove using stochastic inequalities that the system has a hydrodynamic limit, namely that under suitable assumptions on the initial configurations, the law of the density fields ε Σ φ(ε x) ε-2t(x) (φ a test function, t(x) the number of particles at site x at time t) concentrates in the limit ε 0 on the deterministic value ∫ φ t, t interpreted as the limit density at time t. We characterize the limit t as a weak solution in terms of barriers of a limit free boundary problem.