What determines the spreading of a wave packet?

Abstract

The multifractal dimensions D2mu and D2psi of the energy spectrum and eigenfunctions, resp., are shown to determine the asymptotic scaling of the width of a spreading wave packet. For systems where the shape of the wave packet is preserved the k-th moment increases as t(k*beta) with beta=D2mu/D2psi, while in general t(k*beta) is an optimal lower bound. Furthermore, we show that in d dimensions asymptotically in time the center of any wave packet decreases spatially as a power law with exponent D2psi - d and present numerical support for these results.

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