Add to ORKGWe give a precise description of spectral types of the Mosaic Maryland model with any irrational frequency, which provides a quasi-periodic unbounded model with non-monotone potential has arithmetic phase transition.Comment: arXiv admin note: substantial text overlap with arXiv:2205.04021 by other author
We take non-Hermitian Aubry-Andr\'{e}-Harper models and quasiperiodic Kitaev chains as examples to d...
We consider quasiperiodic Jacobi and Schr\"odinger operators of both a single- and multi-frequency. ...
We study the stability of non-ergodic but extended (NEE) phases in non-Hermitian systems. For this p...
In this paper, we establish the Anderson localization, strong dynamical localization and the $(\frac...
We establish a general mapping from one-dimensional non-Hermitian mosaic models to their non-mosaic ...
We present a special model of random band matrices where, at zero energy, the famous Fyodorov and Mi...
We consider critical eigenstates in a two dimensional quasicrystal and their evolution as a function...
We consider quasiperiodic operators on Zd with unbounded monotone sampling functions ("Maryland-type...
We establish a quantitative version of strong almost reducibility result for $\mathrm{sl}(2,\mathbb{...
We uncover the relationship of topology and disorder in a one-dimensional Su-Schrieffer-Heeger chain...
We prove that once one has the ingredients of a ``single-energy multiscale analysis (MSA) result'' o...
Anderson localization is a famous wave phenomenon that describes the absence of diffusion of waves i...
AbstractWe prove exponential localization at all energies for one-dimensional continuous Anderson-ty...
In this paper, the influence of the quasidisorder on a two-dimensional system is studied. We find th...
We analyze the spectrum of a discrete Schrodinger operator with a potential given by a periodic vari...
We take non-Hermitian Aubry-Andr\'{e}-Harper models and quasiperiodic Kitaev chains as examples to d...
We consider quasiperiodic Jacobi and Schr\"odinger operators of both a single- and multi-frequency. ...
We study the stability of non-ergodic but extended (NEE) phases in non-Hermitian systems. For this p...
In this paper, we establish the Anderson localization, strong dynamical localization and the $(\frac...
We establish a general mapping from one-dimensional non-Hermitian mosaic models to their non-mosaic ...
We present a special model of random band matrices where, at zero energy, the famous Fyodorov and Mi...
We consider critical eigenstates in a two dimensional quasicrystal and their evolution as a function...
We consider quasiperiodic operators on Zd with unbounded monotone sampling functions ("Maryland-type...
We establish a quantitative version of strong almost reducibility result for $\mathrm{sl}(2,\mathbb{...
We uncover the relationship of topology and disorder in a one-dimensional Su-Schrieffer-Heeger chain...
We prove that once one has the ingredients of a ``single-energy multiscale analysis (MSA) result'' o...
Anderson localization is a famous wave phenomenon that describes the absence of diffusion of waves i...
AbstractWe prove exponential localization at all energies for one-dimensional continuous Anderson-ty...
In this paper, the influence of the quasidisorder on a two-dimensional system is studied. We find th...
We analyze the spectrum of a discrete Schrodinger operator with a potential given by a periodic vari...
We take non-Hermitian Aubry-Andr\'{e}-Harper models and quasiperiodic Kitaev chains as examples to d...
We consider quasiperiodic Jacobi and Schr\"odinger operators of both a single- and multi-frequency. ...
We study the stability of non-ergodic but extended (NEE) phases in non-Hermitian systems. For this p...