Add to ORKGWe present results on the self-energy correction to the energy levels of hydrogen and hydrogenlike ions. The self energy represents the largest QED correction to the relativistic (Dirac-Coulomb) energy of a bound electron. We focus on the perturbation expansion of the self energy of non-S states, and provide estimates of the so-called A60 perturbative coefficient, which can be considered as a relativistic Bethe logarithm. Precise values of A60 are given for many P, D, F and G states, while estimates are given for other electronic states. These results can be used in high-precision spectroscopy experiments in hydrogen and hydrogenlike ions. They yield the best available estimate of the self-energy correction of many atomic states
Two-loop Bethe logarithms are calculated for excited P and D states in hydrogenlike systems, and est...
We present an improved calculation of higher-order corrections to the one-loop self-energy of 2P sta...
Self-energy corrections involving logarithms of the parameter Z α can often be derived within a simp...
The method and status of a study to provide numerical, high-precision values of the self-energy leve...
The method and status of a study to provide numerical, high-precision values of the self-energy leve...
We investigate the asymptotic properties of higher-order binding corrections to the one-loop self-en...
The self-energy corrections to the hyperfine splitting is evaluated for higher excited states in hyd...
We describe a nonperturbative (in Z α ) numerical evaluation of the one-photon electron self-energy ...
A nonperturbative numerical evaluation of the one-photon electron self-energy for the 3S and 4S stat...
The radiative self-energy correction to the bound-electron g factor of 2P1/2 and 2P3/2 states in one...
A nonperturbative numerical evaluation of the one-photon electron self-energy for the K- and L-shell...
The one-loop self-energy is evaluated for d{sub 3/2} and d{sub 5/2} states in hydrogenic ions, and g...
State-dependent quantum electrodynamic corrections are evaluated for the hyperfine splitting of nS s...
Abstract: We substantiate the need for a “nonperturbative” account of the self-interaction of the el...
Canonically, the quantum electrodynamic radiative corrections in bound systems have been evaluated i...
Two-loop Bethe logarithms are calculated for excited P and D states in hydrogenlike systems, and est...
We present an improved calculation of higher-order corrections to the one-loop self-energy of 2P sta...
Self-energy corrections involving logarithms of the parameter Z α can often be derived within a simp...
The method and status of a study to provide numerical, high-precision values of the self-energy leve...
The method and status of a study to provide numerical, high-precision values of the self-energy leve...
We investigate the asymptotic properties of higher-order binding corrections to the one-loop self-en...
The self-energy corrections to the hyperfine splitting is evaluated for higher excited states in hyd...
We describe a nonperturbative (in Z α ) numerical evaluation of the one-photon electron self-energy ...
A nonperturbative numerical evaluation of the one-photon electron self-energy for the 3S and 4S stat...
The radiative self-energy correction to the bound-electron g factor of 2P1/2 and 2P3/2 states in one...
A nonperturbative numerical evaluation of the one-photon electron self-energy for the K- and L-shell...
The one-loop self-energy is evaluated for d{sub 3/2} and d{sub 5/2} states in hydrogenic ions, and g...
State-dependent quantum electrodynamic corrections are evaluated for the hyperfine splitting of nS s...
Abstract: We substantiate the need for a “nonperturbative” account of the self-interaction of the el...
Canonically, the quantum electrodynamic radiative corrections in bound systems have been evaluated i...
Two-loop Bethe logarithms are calculated for excited P and D states in hydrogenlike systems, and est...
We present an improved calculation of higher-order corrections to the one-loop self-energy of 2P sta...
Self-energy corrections involving logarithms of the parameter Z α can often be derived within a simp...