Freezing of dynamical exponents in low dimensional random media
Abstract
A particle in a random potential with logarithmic correlations in dimensions d=1,2 is shown to undergo a dynamical transition at Tdyn>0. In d=1 exact results demonstrate that Tdyn=Tc, the static glass transition temperature, and that the dynamical exponent changes from z(T)=2 + 2 (Tc/T)2 at high temperature to z(T)= 4 Tc/T in the glass phase. The same formulae are argued to hold in d=2. Dynamical freezing is also predicted in the 2D random gauge XY model and related systems. In d=1 a mapping between dynamics and statics is unveiled and freezing involves barriers as well as valleys. Anomalous scaling occurs in the creep dynamics.
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