DOIAbstract
AbstractWe study relations between quantum dynamics and spectral properties, concentrating on spectral decompositions which arise from decomposing measures with respect to dimensional Hausdorff measures
AbstractWe study relations between quantum dynamics and spectral properties, concentrating on spectral decompositions which arise from decomposing measures with respect to dimensional Hausdorff measures
AbstractWe study the connections between dynamical properties of Schrödinger operators H on separabl...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
Poincare's recurrence theorem, which states that every Hamiltonian dynamics enclosed in a finite vol...
AbstractWe study relations between quantum dynamics and spectral properties, concentrating on spectr...
AbstractWe investigate the large time behaviour of various solutions of the Schrödinger equation in ...
Abstract: Spectral measures arise in numerous applications such as quantum mechanics, signal process...
We construct one-dimensional potentials V(x) so that if H = - d^2/dx^2 + V(x) on L^2(ℝ), then H has ...
We construct one-dimensional potentials V(x) so that if H = - d^2/dx^2 + V(x) on L^2(ℝ), then H has ...
We present an extension of the Gilbert-Pearson theory of subordinacy, which relates dimensional Haus...
I Finite-dimensional quantum systems are represented by vectors in a Hilbert space |ψ〉 I Quantum sta...
In this Dissertation thesis the spectral theory of Schrödinger operators modeling quasicrystals in d...
AbstractWe study the connections between dynamical properties of Schrödinger operators H on separabl...
AbstractWe investigate the large time behaviour of various solutions of the Schrödinger equation in ...
The spectral theory of linear operators plays a key role in the mathematical formulation of quantum ...
The diagonal elements of the time correlation matrix are used to probe closed quantum systems that a...
AbstractWe study the connections between dynamical properties of Schrödinger operators H on separabl...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
Poincare's recurrence theorem, which states that every Hamiltonian dynamics enclosed in a finite vol...
AbstractWe study relations between quantum dynamics and spectral properties, concentrating on spectr...
AbstractWe investigate the large time behaviour of various solutions of the Schrödinger equation in ...
Abstract: Spectral measures arise in numerous applications such as quantum mechanics, signal process...
We construct one-dimensional potentials V(x) so that if H = - d^2/dx^2 + V(x) on L^2(ℝ), then H has ...
We construct one-dimensional potentials V(x) so that if H = - d^2/dx^2 + V(x) on L^2(ℝ), then H has ...
We present an extension of the Gilbert-Pearson theory of subordinacy, which relates dimensional Haus...
I Finite-dimensional quantum systems are represented by vectors in a Hilbert space |ψ〉 I Quantum sta...
In this Dissertation thesis the spectral theory of Schrödinger operators modeling quasicrystals in d...
AbstractWe study the connections between dynamical properties of Schrödinger operators H on separabl...
AbstractWe investigate the large time behaviour of various solutions of the Schrödinger equation in ...
The spectral theory of linear operators plays a key role in the mathematical formulation of quantum ...
The diagonal elements of the time correlation matrix are used to probe closed quantum systems that a...
AbstractWe study the connections between dynamical properties of Schrödinger operators H on separabl...
We link linear prediction of Chebyshev and Fourier expansions to analytic continuation. We push the ...
Poincare's recurrence theorem, which states that every Hamiltonian dynamics enclosed in a finite vol...
Add to ORKG