6533b831fe1ef96bd1299b74

RESEARCH PRODUCT

The relaxation dynamics of a viscous silica melt: II The intermediate scattering functions

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We use molecular dynamics computer simulations to study the relaxation dynamics of a viscous melt of silica. The coherent and incoherent intermediate scattering functions, F_d(q,t) and F_s(q,t), show a crossover from a nearly exponential decay at high temperatures to a two-step relaxation at low temperatures. Close to the critical temperature of mode-coupling theory (MCT) the correlators obey in the alpha-regime the time temperature superposition principle (TTSP) and show a weak stretching. We determine the wave-vector dependence of the stretching parameter and find that for F_d(q,t) it shows oscillations which are in phase with the static structure factor. The temperature dependence of the alpha- relaxation times tau shows a crossover from an Arrhenius law at low temperatures to a weaker T-dependence at intermediate and high temperatures. At the latter temperatures the T-dependence is described well by a power law. We find that the exponent gamma of the power law for tau are significantly larger than the one for the diffusion constant. The q-dependence of the alpha-relaxation times for F_d(q,t) oscillates around tau(q) for F_s(q,t) and is in phase with the structure factor. Due to the strong vibrational component of the dynamics at short times the TTSP is not valid in the beta- relaxation regime. We show, however, that in this time window the shape of the curves is independent of the correlator and is given by a functional form proposed by MCT. We find that the value of the von Schweidler exponent and the value of gamma for finite q are compatible with the expression proposed by MCT. We conclude that, in the temperature regime where the relaxation times are mesoscopic, many aspects of the dynamics of this strong glass former can be rationalized very well by MCT.