Asymptotics for the survival probability of a Rouse chain monomer

Abstract

We study the long-time asymptotical behavior of the survival probability Pt of a tagged monomer of an infinitely long Rouse chain in presence of two fixed absorbing boundaries, placed at x = L. Mean-square displacement of a tagged monomer obeys X2(t) t1/2 at all times, which signifies that its dynamics is an anomalous diffusion process. Constructing lower and upper bounds on Pt, which have the same time-dependence but slightly differ by numerical factors in the definition of the characteristic relaxation time, we show that Pt is a stretched-exponential function of time, (Pt) - t1/2/L2. This implies that the distribution function of the first exit time from a fixed interval [-L,L] for such an anomalous diffusion has all moments.