It is proved that, under very restrictive conditins on the perturbation, the quantum Birkhoff normal form converges uniformly with respect to the Planck constant under the conditions of the classical Cherry theorem, namely dimension two and non real frequencies. This yields an exact quantization formula for the eigenvalues of the corresponding Schroedinger operator
Abstract. We consider a class of perturbations of the 2D harmonic oscillator, and of some other dyna...
International audienceWe study a perturbative scheme for normalization problems involving resonances...
International audienceWe derive new expressions for the Rayleigh-Schr\"odinger seriesdescribing the ...
It is proved that, under very restrictive conditins on the perturbation, the quantum Birkhoff normal...
We consider on L-2(T-2) the Schrodinger operator family H-epsilon : epsilon is an element of R with ...
AbstractThe operator −iℏω⋅∇ on L2(Tl), quantizing the linear flow of diophantine frequencies ω=(ω1,…...
{We consider on $L^2(\T^2)$ the \Sc\ operator family $L_\ep: \ep\in\R$ with domain and action define...
International audienceThe operator - i (h) over bar omega.Delta on L-2(T-1), quantizing the linear f...
A class of non-selfadjoint, PT-symmetric operators is identified similar to a selfadjoint one, thus ...
International audienceWe consider some perturbations of a family of pairwise commuting linear quantu...
We show that quantum algorithms can be used to re-prove a classical theorem in approximation theory,...
Let the quantization of the linear flow of diophantine frequencies $\om$ over the torus $\T^l$, $l>1...
International audienceWe present a time dependent quantum perturbation result, uniformin the Planck ...
Abstract. We consider a class of perturbations of the 2D harmonic oscillator, and of some other dyna...
International audienceWe study a perturbative scheme for normalization problems involving resonances...
International audienceWe derive new expressions for the Rayleigh-Schr\"odinger seriesdescribing the ...
It is proved that, under very restrictive conditins on the perturbation, the quantum Birkhoff normal...
We consider on L-2(T-2) the Schrodinger operator family H-epsilon : epsilon is an element of R with ...
AbstractThe operator −iℏω⋅∇ on L2(Tl), quantizing the linear flow of diophantine frequencies ω=(ω1,…...
{We consider on $L^2(\T^2)$ the \Sc\ operator family $L_\ep: \ep\in\R$ with domain and action define...
International audienceThe operator - i (h) over bar omega.Delta on L-2(T-1), quantizing the linear f...
A class of non-selfadjoint, PT-symmetric operators is identified similar to a selfadjoint one, thus ...
International audienceWe consider some perturbations of a family of pairwise commuting linear quantu...
We show that quantum algorithms can be used to re-prove a classical theorem in approximation theory,...
Let the quantization of the linear flow of diophantine frequencies $\om$ over the torus $\T^l$, $l>1...
International audienceWe present a time dependent quantum perturbation result, uniformin the Planck ...
Abstract. We consider a class of perturbations of the 2D harmonic oscillator, and of some other dyna...
International audienceWe study a perturbative scheme for normalization problems involving resonances...
International audienceWe derive new expressions for the Rayleigh-Schr\"odinger seriesdescribing the ...
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