Hofstadter Rules and Generalized Dimensions of the Spectrum of Harper's Equation
Abstract
We consider the Harper model which describes two dimensional Bloch electrons in a magnetic field. For irrational flux through the unit-cell the corresponding energy spectrum is known to be a Cantor set with multifractal properties. In order to relate the maximal and minimal fractal dimension of the spectrum of Harper's equation to the irrational number involved, we combine a refined version of the Hofstadter rules with results from semiclassical analysis and tunneling in phase space. For quadratic irrationals ω with continued fraction expansion ω = [0;n] the maximal fractal dimension exhibits oscillatory behavior as a function of n, which can be explained by the structure of the renormalization flow. The asymptotic behavior of the minimal fractal dimension is given by const. n / n. As the generalized dimensions can be related to the anomalous diffusion exponents of an initially localized wavepacket, our results imply that the time evolution of high order moments < rq >, q ∞ is sensible to the parity of n.
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