Perturbative diagonalization and spectral gaps of quasiperiodic operators on $\ell^2(\Z^d)$ with monotone potentials

arXiv - MATH - Spectral Theory Pub Date : 2024-08-10 DOI:arxiv-2408.05650
Ilya Kachkovskiy, Leonid Parnovski, Roman Shterenberg
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Abstract

We obtain a perturbative proof of localization for quasiperiodic operators on $\ell^2(\Z^d)$ with one-dimensional phase space and monotone sampling functions, in the regime of small hopping. The proof is based on an iterative scheme which can be considered as a local (in the energy and the phase) and convergent version of KAM-type diagonalization, whose result is a covariant family of uniformly localized eigenvalues and eigenvectors. We also proof that the spectra of such operators contain infinitely many gaps.
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具有单调势的$\ell^2(\Z^d)$上准周期算子的惯性对角化和谱隙
我们得到了关于$\ell^2(\Z^d)$上具有一维相空间和单调采样函数的准周期算子在小跳变制度下的局部化的微扰证明。证明基于一个迭代方案,该方案可视为 KAM 型对角化的局部(能量和相位)和收敛版本,其结果是一个均匀局部化特征值和特征向量的协方差族。我们还证明了这类算子的谱包含无穷多个间隙。
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arXiv - MATH - Spectral Theory
arXiv - MATH - Spectral Theory
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