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Semiclassical Analysis of the Largest Gap of Quasi-PeriodicSchrödinger Operators

Published online by Cambridge University Press:  12 May 2010

H. Krüger*
Affiliation:
Department of Mathematics, Rice University, Houston, TX 77005, USA
*
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Abstract

In this note, I wish to describe the first order semiclassical approximation to thespectrum of one frequency quasi-periodic operators. In the case of a sampling functionwith two critical points, the spectrum exhibits two gaps in the leading orderapproximation. Furthermore, I will give an example of a two frequency quasi-periodicoperator, which has no gaps in the leading order of the semiclassical approximation.

Type
Research Article
Copyright
© EDP Sciences, 2010

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References

Avila, A., Bochi, J., Damanik, D.. Cantor spectrum for Schrödinger operators with potentials arising from generalized skew-shifts . Duke Math. J., 146 (2009), No. 2, 253280.CrossRefGoogle Scholar
Avila, A., Jitomirskaya, S.. The Ten Martini Problem . Ann. of Math., 170 (2009), No. 1, 303342.CrossRefGoogle Scholar
J. Bourgain. Positive Lyapounov exponents for most energies. Geometric aspects of functional analysis, 37–66, Lecture Notes in Math. No. 1745, Springer, Berlin, 2000.
J. Bourgain. Green’s function estimates for lattice Schrödinger operators and applications. Annals of Mathematics Studies, 158. Princeton University Press, Princeton, NJ, 2005.
Chulaevsky, V.A., Sinai, Y. G.. Anderson localization for the 1-D discrete Schrödinger operator with two-frequency potential . Comm. Math. Phys., 125 (1989), No. 1, 91112.CrossRefGoogle Scholar
M. Goldstein, W. Schlag. On resonances and the formation of gaps in the spectrum of quasi-periodic Schrödinger equations. Ann. of Math., (to appear).
Gordon, A. Y., Jitomirskaya, S., Last, Y., Simon, B.. Duality and singular continuous spectrum in the almost Mathieu equation . Acta Math., 178 (1997), 169183. CrossRefGoogle Scholar
Guillement, J.P., Helffer, B., Treton, P.. Walk inside Hofstadter’s butterfly . J. Phys. France, 50 (1989), 20192058.CrossRefGoogle Scholar
B. Helffer, P. Kerdelhué, J. Sjöstrand. Le papillon de Hofstadter revisité. Mém. Soc. Math. France (N.S.), No. 43 (1990), 87 pp.
Hofstadter, D.. Energy levels and wave functions of Bloch electrons in rational and irrational magnetic fields . Phys. Rev. B, 14 (1976), 2239.CrossRefGoogle Scholar
Krüger, H.. Probabilistic averages of Jacobi operators , Comm. Math. Phys., 295 (2010), No. 3, 853875.CrossRefGoogle Scholar
H. Krüger. In preparation.
G. Teschl. Jacobi Operators and Completely Integrable Nonlinear Lattices, Math. Surv. and Mon., 72, Amer. Math. Soc., Rhode Island, 2000.