Wavepacket dynamics of the nonlinear Harper model

Abstract

The destruction of anomalous diffusion of the Harper model at criticality, due to weak nonlinearity , is analyzed. It is shown that the second moment grows subdiffusively as <m2> tα up to time t* γ. The exponents α and γ reflect the multifractal properties of the spectra and the eigenfunctions of the linear model. For t>t*, the anomalous diffusion law is recovered, although the evolving profile has a different shape than in the linear case. These results are applicable in wave propagation through nonlinear waveguide arrays and transport of Bose-Einstein condensates in optical lattices.

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