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Ju lattice math11/7/2023 Kotani, S.: Lyapunov indices determine absolutely continuous spectra of stationary random onedimensional Schrödinger operators. Krikorian, R.: Global density of reducible quasi-periodic cocycles on \(\mathbb )\). Krikorian, R.: Réductibilité des systèmes produits-croisés à valeurs das des groupes compacts. Krikorian, R.: Réductibilité presque partout des flots fibrés quasi-périodiques à valeurs dans les groupes compacts. Jorba, A., Simó, C.: On the reducibility of linear differential equations with quasi-periodic coefficients. Johnson, R., Sell, G.: Smoothness of spectral subbundles and reducibility of quasi-periodic linear differential systems. Johnson, R., Moser, J.: The rotation number for almost periodic potentials. Her, H., You, J.: Full measure reducibility for generic one-parameter family of quasi-periodic linear systems. ![]() 9, 279–289 (1975)Įliasson, H.: Floquet solutions for the one-dimensional quasiperiodic Schrödinger equation. Springer, Berlin (1978)ĭinaburg, E., Sinai, Ya.: The one-dimensional Schrödinger equation with a quasi-periodic potential. (2010)Ĭoppel, W.: Dichotomies in Stability Theory. 31, 741–769 (2010)Ĭhavaudret, C.: Strong almost reducibility for analytic and Gevrey quasi-periodic cocycles. 148, 453–463 (2002)Ĭhavaudret, C., Reducibility of quasi-periodic cocycles in Linear Lie groups. Dedicated to the memory of Tom Wolffīourgain, J., Jitomirskaya, S.: Absolutely continuous spectrum for 1D quasiperiodic operators. Springer, New York (1976)īourgain, J., On the spectrum of lattice Schrödinger operators with deterministic potential. 287, 565–588 (2009)īogoljubov, N.N., Mitropolski, Ju.A., Samoilenko, A.M.: Methods of Accelerated Convergence in Nonlinear Mechanics. 21, 1001–1019 (2011)īen Hadj Amor, S., Hölder continuity of the rotation number for quasi-periodic co-cycles in SL(2,ℝ). ![]() 164, 911–940 (2006)Īvila, A., Fayad, B., Krikorian, R.: A KAM scheme for SL(2,ℝ) cocycles with Liouvillean frequencies. 12, 93–131 (2010)Īvila, A., Krikorian, R.: Reducibility or non-uniform hyperbolicity for quasiperiodic Schrödinger cocycles. arXiv: 0905.3902 (2009)Īvila, A., Jitomirskaya, S.: Almost localization and almost reducibility. 3, 631–636 (2009)Īvila, A.: Global theory of one-frequency Schrödinger operators I: stratified analyticity of the Lyapunov exponent and the boundary of nonuniform hyperbolicity. Hilger, Bristol (1980)Īvila, A.: Density of positive Lyapunov exponents for quasiperiodic SL(2,ℝ)-cocycles in arbitrary dimension. In: Grouptheoretical Methods in Physics, Proc. ![]() Aubry, S., André, G.: Analyticity breaking and Anderson localization in incommensurate lattices.
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