It is well known that quantum-mechanical perturbation theory often give rise to divergent series that require proper resummation. Here I discuss simple ways in which these divergences can be avoided in the first place. Using the elementary technique of relaxed fixed-point iteration, I obtain convergent expressions for various challenging ground states wavefunctions, including quartic, sextic and octic anharmonic oscillators, the hydrogenic Zeeman problem, and the Herbst-Simon Hamiltonian (with finite energy but vanishing Rayleigh-Schr\"odinger coefficients), all at arbitarily strong coupling. These results challenge the notion that non-analytic functions of coupling constants are intrinsically "non-perturbative". A possible application to e...
Certain quantum mechanical potentials give rise to a vanishing perturbation series for at least one ...
We study the anharmonic double well in quantum mechanics using exact Wentzel-Kramers-Brillouin (WKB)...
AbstractCertain quantum mechanical potentials give rise to a vanishing perturbation series for at le...
We study quantum mechanical systems with a discrete spectrum. We show that the asymptotic series ass...
The RSPT (Chapter III) allows one to get an approximation to the eigenvalues (En) of a given Hamilto...
The perturbation method is an approximation scheme with a solvable leading order. The standard way i...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Only a few quantum mechanical problems can be solved exactly. However, if the system Hamil-tonian ca...
A new general approach is introduced for defining an optimum zero-order Hamiltonian for Rayleigh–Sch...
For a large class of quantum mechanical models of matter and radiation we develop an analytic pertur...
A method for the resummation of a nonalternating divergent perturbation series is described. The pro...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
It is shown that for the one-dimensional quantum anharmonic oscillator with potential $V(x)= x^2+g^2...
Starting from the divergence pattern of perturbative quantum chromodynamics, we propose a novel, non...
Adaptive perturbation is a new method for perturbatively computing the eigenvalues and eigenstates o...
Certain quantum mechanical potentials give rise to a vanishing perturbation series for at least one ...
We study the anharmonic double well in quantum mechanics using exact Wentzel-Kramers-Brillouin (WKB)...
AbstractCertain quantum mechanical potentials give rise to a vanishing perturbation series for at le...
We study quantum mechanical systems with a discrete spectrum. We show that the asymptotic series ass...
The RSPT (Chapter III) allows one to get an approximation to the eigenvalues (En) of a given Hamilto...
The perturbation method is an approximation scheme with a solvable leading order. The standard way i...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Only a few quantum mechanical problems can be solved exactly. However, if the system Hamil-tonian ca...
A new general approach is introduced for defining an optimum zero-order Hamiltonian for Rayleigh–Sch...
For a large class of quantum mechanical models of matter and radiation we develop an analytic pertur...
A method for the resummation of a nonalternating divergent perturbation series is described. The pro...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
It is shown that for the one-dimensional quantum anharmonic oscillator with potential $V(x)= x^2+g^2...
Starting from the divergence pattern of perturbative quantum chromodynamics, we propose a novel, non...
Adaptive perturbation is a new method for perturbatively computing the eigenvalues and eigenstates o...
Certain quantum mechanical potentials give rise to a vanishing perturbation series for at least one ...
We study the anharmonic double well in quantum mechanics using exact Wentzel-Kramers-Brillouin (WKB)...
AbstractCertain quantum mechanical potentials give rise to a vanishing perturbation series for at le...