AbstractA characterization of resonance functions in terms of amplitude and phase is given for radial Schrödinger operators. The potential is a sum of an analytic background potential as, for example, the Coulomb potential and an exponentially decaying term
AbstractWe determine the leading asymptotics of the resonance counting function for a class of Schrö...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
We consider semiclassical Schrödinger operators on Rn, with C ∞ potentials decaying polynomially at ...
AbstractA characterization of resonance functions in terms of amplitude and phase is given for radia...
AbstractWe study resonances for the radial Schrödinger operator with Coulomb potential perturbed by ...
AbstractWe study resonances for the radial Schrödinger operator with Coulomb potential perturbed by ...
AbstractSchrödinger operators on L2(R3) of the form −Δ + Vλ with potentials Vλ real-analytic in λ ar...
AbstractWe consider two-body Schrödinger operators with multiplicative, exponentially decreasing and...
AbstractWe study resonances for a three-dimensional Schrödinger operator with Coulomb potential pert...
We obtain new results about the high-energy distribution of resonances for the one-dimensional Schr\...
AbstractWe study resonances for a three-dimensional Schrödinger operator with Coulomb potential pert...
AbstractLet H = −Δ + VE(¦x¦)+ V(x) be a Schrödinger operator in Rn. Here VE(¦x¦) is an “exploding” r...
Dans cette thèse, on étudie le comportement en temps grand des solutions de l’équation de Schrödinge...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
AbstractWe determine the leading asymptotics of the resonance counting function for a class of Schrö...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
We consider semiclassical Schrödinger operators on Rn, with C ∞ potentials decaying polynomially at ...
AbstractA characterization of resonance functions in terms of amplitude and phase is given for radia...
AbstractWe study resonances for the radial Schrödinger operator with Coulomb potential perturbed by ...
AbstractWe study resonances for the radial Schrödinger operator with Coulomb potential perturbed by ...
AbstractSchrödinger operators on L2(R3) of the form −Δ + Vλ with potentials Vλ real-analytic in λ ar...
AbstractWe consider two-body Schrödinger operators with multiplicative, exponentially decreasing and...
AbstractWe study resonances for a three-dimensional Schrödinger operator with Coulomb potential pert...
We obtain new results about the high-energy distribution of resonances for the one-dimensional Schr\...
AbstractWe study resonances for a three-dimensional Schrödinger operator with Coulomb potential pert...
AbstractLet H = −Δ + VE(¦x¦)+ V(x) be a Schrödinger operator in Rn. Here VE(¦x¦) is an “exploding” r...
Dans cette thèse, on étudie le comportement en temps grand des solutions de l’équation de Schrödinge...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
AbstractWe determine the leading asymptotics of the resonance counting function for a class of Schrö...
We propose a definition for the resonances of Schr"o-dinger operators with slowly decaying $CC^inf...
We consider semiclassical Schrödinger operators on Rn, with C ∞ potentials decaying polynomially at ...
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