Sharp arithmetic delocalization for quasiperiodic operators with potentials of semi-bounded variation

Svetlana Jitomirskaya, Ilya Kachkovskiy
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Abstract

We obtain the sharp arithmetic Gordon's theorem: that is, absence of eigenvalues on the set of energies with Lyapunov exponent bounded by the exponential rate of approximation of frequency by the rationals, for a large class of one-dimensional quasiperiodic Schr\"odinger operators, with no (modulus of) continuity required. The class includes all unbounded monotone potentials with finite Lyapunov exponents and all potentials of bounded variation. The main tool is a new uniform upper bound on iterates of cocycles of bounded variation.
具有半约束变化势的准周期算子的锐算脱域问题
我们得到了尖锐的算术戈登定理:即对于一大类一维准周期薛定谔算子,在不要求连续性(模数)的情况下,不存在李亚普诺夫指数以有理数逼近频率的指数率为界的能量集合上的特征值。该类包括所有具有有限李雅普诺夫指数的无界单势和所有有界变化的势。主要工具是有界变化循环迭代的新统一上界。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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