AbstractWe consider the Schrödinger operator on the real line with a 2×2 matrix-valued 1-periodic potential. The spectrum of this operator is absolutely continuous and consists of intervals separated by gaps. We define a Lyapunov function which is analytic on a two-sheeted Riemann surface. On each sheet, the Lyapunov function has the same properties as in the scalar case, but it has branch points, which we call resonances. We prove the existence of real as well as non-real resonances for specific potentials. We determine the asymptotics of the periodic and the anti-periodic spectrum and of the resonances at high energy. We show that there exist two type of gaps: (1) stable gaps, where the endpoints are the periodic and the anti-periodic eig...
Abstract. We study the resonances of the operator P(h) = −∆x + V (x) + ϕ(hx). Here V is a periodic ...
In the semi-classical regime (i.e., h ↘ 0), we study the effect of an oscillating decaying pot...
We consider the Schrdinger operator H on the half-line with a periodic potential p plus a compactly ...
Abstract. In this paper we investigate numerically the spectrum of some representative examples of d...
Abstract. In this article we review some recent developments in the theory of Schrödinger operators...
n this article we investigate numerically the spectrum of some representative examples of discrete ...
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...
Abstract. We exhibit a dense set of limit periodic potentials for which the corresponding one-dimens...
Consider the Schrödinger operator Ly = -y" + q'y on L²(R) with a periodic distrib...
In this paper we investigate numerically the following Hill’s equation x00 + (a + bq(t))x = 0 where ...
Let L be the Hill-Schrodinger operator considered with a singular complex-valued potential v of the ...
dx2 C q on the interval Œ0; 1 depending on an L2-potential q and endowed with periodic or anti-peri...
We investigate the Schrödinger operator $L_{(q)}$ in $L_{(2)}(\mathbb{R}^d)\;(d\geq1)$ with the comp...
This paper concerns Hill’s equation with a (parametric) forcing that is real analytic and quasi-peri...
Abstract. We study the resonances of the operator P(h) = −∆x + V (x) + ϕ(hx). Here V is a periodic ...
In the semi-classical regime (i.e., h ↘ 0), we study the effect of an oscillating decaying pot...
We consider the Schrdinger operator H on the half-line with a periodic potential p plus a compactly ...
Abstract. In this paper we investigate numerically the spectrum of some representative examples of d...
Abstract. In this article we review some recent developments in the theory of Schrödinger operators...
n this article we investigate numerically the spectrum of some representative examples of discrete ...
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...
Abstract. We exhibit a dense set of limit periodic potentials for which the corresponding one-dimens...
Consider the Schrödinger operator Ly = -y" + q'y on L²(R) with a periodic distrib...
In this paper we investigate numerically the following Hill’s equation x00 + (a + bq(t))x = 0 where ...
Let L be the Hill-Schrodinger operator considered with a singular complex-valued potential v of the ...
dx2 C q on the interval Œ0; 1 depending on an L2-potential q and endowed with periodic or anti-peri...
We investigate the Schrödinger operator $L_{(q)}$ in $L_{(2)}(\mathbb{R}^d)\;(d\geq1)$ with the comp...
This paper concerns Hill’s equation with a (parametric) forcing that is real analytic and quasi-peri...
Abstract. We study the resonances of the operator P(h) = −∆x + V (x) + ϕ(hx). Here V is a periodic ...
In the semi-classical regime (i.e., h ↘ 0), we study the effect of an oscillating decaying pot...
We consider the Schrdinger operator H on the half-line with a periodic potential p plus a compactly ...