The Fractal Dimension of the Spectrum of the Fibonacci Hamiltonian

Anton Gorodetski (Caltech); David Damanik (Rice); Mark Embree (Rice); Serguei Tcheremchantsev (Universite d'Orleans)

arxiv: 0705.0338 · v1 · pith:KUH55TWNnew · submitted 2007-05-02 · 🧮 math-ph · math.MP· math.SP

The Fractal Dimension of the Spectrum of the Fibonacci Hamiltonian

David Damanik (Rice) , Mark Embree (Rice) , Anton Gorodetski (Caltech) , Serguei Tcheremchantsev (Universite d'Orleans) This is my paper

classification 🧮 math-ph math.MPmath.SP

keywords fibonaccihamiltonianlambdaboundsdimensionfractalspectrumaccording

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We study the spectrum of the Fibonacci Hamiltonian and prove upper and lower bounds for its fractal dimension in the large coupling regime. These bounds show that as $\lambda \to \infty$, $\dim (\sigma(H_\lambda)) \cdot \log \lambda$ converges to an explicit constant ($\approx 0.88137$). We also discuss consequences of these results for the rate of propagation of a wavepacket that evolves according to Schr\"odinger dynamics generated by the Fibonacci Hamiltonian.

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The Fractal Dimension of the Spectrum of the Fibonacci Hamiltonian

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