Wave-packet dynamics at the mobility edge in two- and three-dimensional systems

Abstract

We study the time evolution of wave packets at the mobility edge of disordered non-interacting electrons in two and three spatial dimensions. The results of numerical calculations are found to agree with the predictions of scaling theory. In particular, we find that the k-th moment of the probability density <rk >(t) scales like tk/d in d dimensions. The return probability P(r=0,t) scales like t-D2/d, with the generalized dimension of the participation ratio D2. For long times and short distances the probability density of the wave packet shows power law scaling P(r,t) t-D2/drD2-d. The numerical calculations were performed on network models defined by a unitary time evolution operator providing an efficient model for the study of the wave packet dynamics.

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