Add to ORKGWe consider the family of operators H(ε):=-d2dx2+εV in R with almost-periodic potential V. We study the behaviour of the integrated density of states (IDS) N(H (ε) ; λ) when ε→ 0 and λ is a fixed energy. When V is quasi-periodic (i.e. is a finite sum of complex exponentials), we prove that for each λ the IDS has a complete asymptotic expansion in powers of ε; these powers are either integer, or in some special cases half-integer. These results are new even for periodic V. We also prove that when the potential is neither periodic nor quasi-periodic, there is an exceptional set S of energies (which we call the super-resonance set) such that for any λ∉S there is a complete power asymptotic expansion of IDS, and when λ∈S, then even two-terms po...
We consider discrete Schrödinger operators in H = Δ + V in ℓ^2(Z^d) with d ≥ 1, and study the eigenv...
Abstract. We prove the complete asymptotic expansion of the spectral function (the integral kernel o...
AbstractOur goal is to show that large classes of Schrödinger operatorsH=−Δ+VinL2(Rd) exhibit interv...
In the semi-classical regime (i.e., h ↘ 0), we study the effect of an oscillating decaying pot...
AbstractWe study the spectral shift function s(λ,h) and the resonances of the operator P(h)=-Δ+V(x)+...
We establish a quantitative version of strong almost reducibility result for $\mathrm{sl}(2,\mathbb{...
In this article we consider asymptotics for the spectral function of Schr¨odinger operators on the r...
We study the Schrödinger operator $H_{\alpha}=-\frac{\der^2}{\der x^2}+V(x)+W(x^{\alpha})$ in $L_2(\...
In this paper, we establish the Anderson localization, strong dynamical localization and the $(\frac...
AbstractWe study the convolution of semi-classical spectral distributions associated to h-pseudodiff...
We obtain new results about the high-energy distribution of resonances for the one-dimensional Schr\...
AbstractThis paper deals with asymptotic behavior for (weak) solutions of the equation utt − Δu + β(...
In this talk, we report on results about the width of the resonances for a slowly varying perturbati...
We review the recent rigorous literature on the one-dimensional Schrödinger equation, H = −d2/dx2 + ...
We consider the equation ∆u = Vu in the half-space Rd+ , d ≥ 2 where V has certain periodicity prope...
We consider discrete Schrödinger operators in H = Δ + V in ℓ^2(Z^d) with d ≥ 1, and study the eigenv...
Abstract. We prove the complete asymptotic expansion of the spectral function (the integral kernel o...
AbstractOur goal is to show that large classes of Schrödinger operatorsH=−Δ+VinL2(Rd) exhibit interv...
In the semi-classical regime (i.e., h ↘ 0), we study the effect of an oscillating decaying pot...
AbstractWe study the spectral shift function s(λ,h) and the resonances of the operator P(h)=-Δ+V(x)+...
We establish a quantitative version of strong almost reducibility result for $\mathrm{sl}(2,\mathbb{...
In this article we consider asymptotics for the spectral function of Schr¨odinger operators on the r...
We study the Schrödinger operator $H_{\alpha}=-\frac{\der^2}{\der x^2}+V(x)+W(x^{\alpha})$ in $L_2(\...
In this paper, we establish the Anderson localization, strong dynamical localization and the $(\frac...
AbstractWe study the convolution of semi-classical spectral distributions associated to h-pseudodiff...
We obtain new results about the high-energy distribution of resonances for the one-dimensional Schr\...
AbstractThis paper deals with asymptotic behavior for (weak) solutions of the equation utt − Δu + β(...
In this talk, we report on results about the width of the resonances for a slowly varying perturbati...
We review the recent rigorous literature on the one-dimensional Schrödinger equation, H = −d2/dx2 + ...
We consider the equation ∆u = Vu in the half-space Rd+ , d ≥ 2 where V has certain periodicity prope...
We consider discrete Schrödinger operators in H = Δ + V in ℓ^2(Z^d) with d ≥ 1, and study the eigenv...
Abstract. We prove the complete asymptotic expansion of the spectral function (the integral kernel o...
AbstractOur goal is to show that large classes of Schrödinger operatorsH=−Δ+VinL2(Rd) exhibit interv...