Aging dynamics in interacting many-body systems

Abstract

Low-dimensional, complex systems are often characterized by logarithmically slow dynamics. We study the generic motion of a labeled particle in an ensemble of identical diffusing particles with hardcore interactions in a strongly disordered, one-dimensional environment. Each particle in this single file is trapped for a random waiting time τ with power law distribution (τ)τ-1- α, such that the τ values are independent, local quantities for all particles. From scaling arguments and simulations, we find that for the scale-free waiting time case 0<α<1, the tracer particle dynamics is ultra-slow with a logarithmic mean square displacement (MSD) x2(t)( t)1/2. This extreme slowing down compared to regular single file motion x2(t) t1/2 is due to the high likelihood that the labeled particle keeps encountering strongly immobilized neighbors. For the case 1<α<2 we observe the MSD scaling x2(t) tγ, where γ<1/2, while for α>2 we recover Harris law t1/2.