Abstract
We use time-resolved dynamic light scattering to investigate the slow dynamics of a colloidal gel. The final decay of the average intensity autocorrelation function is well described by g2(q,τ) − 1 ∼ exp [ − (τ/τf)p], with τf ∼ q−1 and p decreasing from 1.5 to 1 with increasing q. We show that the dynamics is not due to a continuous ballistic process, as proposed in previous works, but rather to rare, intermittent rearrangements. We quantify the dynamical fluctuations resulting from intermittency by means of the variance χ(τ,q) of the instantaneous autocorrelation function, the analogous of the dynamical susceptibility χ4 studied in glass formers. The amplitude of χ is found to grow linearly with q. We propose a simple—yet general—model of intermittent dynamics that accounts for the q-dependence of both the average correlation functions and χ.