Abstract
The paper reviews two types of quasipotential equations. An equation with a non-local potential is derived from the equations of motion of quantum electrodynamics. It is also related to a Bethe-Salpeter type of equation for the retarded Green function. Most of the paper is devoted to a systematic study of a local version of the Logunov-Tavkhelidze quasipotential approach.
Rizov, V A;
Todorov, I T
[1]
- Bylgarska Akademiya na Naukite, Sofia. Inst. za Yadrena Izsledvaniya i Yadrena Energetika
Citation Formats
Rizov, V A, and Todorov, I T.
Quasi-potential approach to the problem of bound states in quantum electrodynamics.
USSR: N. p.,
1975.
Web.
Rizov, V A, & Todorov, I T.
Quasi-potential approach to the problem of bound states in quantum electrodynamics.
USSR.
Rizov, V A, and Todorov, I T.
1975.
"Quasi-potential approach to the problem of bound states in quantum electrodynamics."
USSR.
@misc{etde_5107086,
title = {Quasi-potential approach to the problem of bound states in quantum electrodynamics}
author = {Rizov, V A, and Todorov, I T}
abstractNote = {The paper reviews two types of quasipotential equations. An equation with a non-local potential is derived from the equations of motion of quantum electrodynamics. It is also related to a Bethe-Salpeter type of equation for the retarded Green function. Most of the paper is devoted to a systematic study of a local version of the Logunov-Tavkhelidze quasipotential approach.}
journal = []
volume = {6:3}
journal type = {AC}
place = {USSR}
year = {1975}
month = {Jul}
}
title = {Quasi-potential approach to the problem of bound states in quantum electrodynamics}
author = {Rizov, V A, and Todorov, I T}
abstractNote = {The paper reviews two types of quasipotential equations. An equation with a non-local potential is derived from the equations of motion of quantum electrodynamics. It is also related to a Bethe-Salpeter type of equation for the retarded Green function. Most of the paper is devoted to a systematic study of a local version of the Logunov-Tavkhelidze quasipotential approach.}
journal = []
volume = {6:3}
journal type = {AC}
place = {USSR}
year = {1975}
month = {Jul}
}