Abstract. In this paper we investigate numerically the spectrum of some representative examples of discrete one-dimensional Schr¨odinger operators with quasi-periodic potential in terms of a perturbative constant b and the spectral parameter a. Our examples include the well-known Almost Mathieu model, other trigonometric potentials with a single quasi-periodic frequency and generalisations with two and three frequencies. We computed numerically the rotation number and the Lyapunov exponent to detect open and collapsed gaps, resonance tongues and the measure of the spectrum. We found that the case with one frequency was significantly different from the case of several frequencies because the latter has all gaps collapsed for a sufficiently l...
We study the spectral theory of ergodic Schrödinger operators.The focus is on multi-dimensional Schr...
In this note, I wish to describe the first order semiclassical approximation to the spectr...
Abstract. In this note, I wish to describe the first order semiclassical approximation to the spec-t...
Abstract. In this paper we investigate numerically the spectrum of some representative examples of ...
n this article we investigate numerically the spectrum of some representative examples of discrete ...
This talk is a review of some results on spectrum and localized eigen functions of quasi-periodic Sc...
In this paper we investigate numerically the following Hill’s equation x00 + (a + bq(t))x = 0 where ...
Abstract. In this article we review some recent developments in the theory of Schrödinger operators...
AbstractWe consider the Schrödinger operator on the real line with a 2×2 matrix-valued 1-periodic po...
The spectral properties of the Schrödinger operator T_t y = -y"+ q_t y in L²(R) are st...
Consider the Schrödinger operator Ly = -y" + q'y on L²(R) with a periodic distrib...
This paper concerns Hill's equation with a (parametric) forcing that is real analytic and quasi-peri...
This paper concerns Hill’s equation with a (parametric) forcing that is real analytic and quasi-peri...
We consider discrete quasiperiodic Schrödinger operators with analytic samplingfunctions. The thesis...
By using quasi-derivatives we develop a Fourier method for studying the spectral properties of one-d...
We study the spectral theory of ergodic Schrödinger operators.The focus is on multi-dimensional Schr...
In this note, I wish to describe the first order semiclassical approximation to the spectr...
Abstract. In this note, I wish to describe the first order semiclassical approximation to the spec-t...
Abstract. In this paper we investigate numerically the spectrum of some representative examples of ...
n this article we investigate numerically the spectrum of some representative examples of discrete ...
This talk is a review of some results on spectrum and localized eigen functions of quasi-periodic Sc...
In this paper we investigate numerically the following Hill’s equation x00 + (a + bq(t))x = 0 where ...
Abstract. In this article we review some recent developments in the theory of Schrödinger operators...
AbstractWe consider the Schrödinger operator on the real line with a 2×2 matrix-valued 1-periodic po...
The spectral properties of the Schrödinger operator T_t y = -y"+ q_t y in L²(R) are st...
Consider the Schrödinger operator Ly = -y" + q'y on L²(R) with a periodic distrib...
This paper concerns Hill's equation with a (parametric) forcing that is real analytic and quasi-peri...
This paper concerns Hill’s equation with a (parametric) forcing that is real analytic and quasi-peri...
We consider discrete quasiperiodic Schrödinger operators with analytic samplingfunctions. The thesis...
By using quasi-derivatives we develop a Fourier method for studying the spectral properties of one-d...
We study the spectral theory of ergodic Schrödinger operators.The focus is on multi-dimensional Schr...
In this note, I wish to describe the first order semiclassical approximation to the spectr...
Abstract. In this note, I wish to describe the first order semiclassical approximation to the spec-t...