Add to ORKGIn this master thesis, a new approximation scheme to non-relativistic potential scattering is developed and discussed. The starting points are two exact path integral representations of the T-matrix, which permit the application of the Feynman-Jensen variational method. A simple Ansatz for the trial action is made, and, in both cases, the variational procedure singles out a particular one-particle classical equation of motion, given in integral form. While the first is real, in the second representation this trajectory is complex and evolves according to an effective, time dependent potential. Using a cumulant expansion, the first correction to the variational approximation is also evaluated. The high energy behavior of the approximation is...
Corrections to the primitive semi-classical amplitude for multiple inelastic scattering are obtained...
We present a path-integral solution for the exact propagation of the Wigner distribution in phase sp...
The present paper developed two kinds of new time-dependent methods in quantum scattering calculatio...
In this master thesis, a new approximation scheme to non-relativistic potential scattering is develo...
Abstract.: Using a recent path integral representation for the T -matrix in nonrelativistic potentia...
A new formulation of nonrelativistic scattering theory is developed which expresses the S matrix as ...
The quantum theory of scattering is discussed from the point of view of a time independent formulati...
Several path integral representations for the T-matrix in nonrelativistic potential scattering are g...
A method is proposed for reducing the complexity of scattering calculations carried out using the Ko...
The Schwinger variational principle for the scattering amplitude is applied to the study of various ...
AbstractHoffman, Kouri, and collaborators have calculated nonrelativistic quantum scattering amplitu...
A new procedure, the variational method, is proposed for the evaluation of Regge trajeotories from t...
We derive an alternative representation for the relativistic non--local kinetic energy operator and ...
This thesis consists of two independent parts, both of which are applications of the quantum mechani...
We propose a variational method for scattering in which the functional is of a fractional form as fo...
Corrections to the primitive semi-classical amplitude for multiple inelastic scattering are obtained...
We present a path-integral solution for the exact propagation of the Wigner distribution in phase sp...
The present paper developed two kinds of new time-dependent methods in quantum scattering calculatio...
In this master thesis, a new approximation scheme to non-relativistic potential scattering is develo...
Abstract.: Using a recent path integral representation for the T -matrix in nonrelativistic potentia...
A new formulation of nonrelativistic scattering theory is developed which expresses the S matrix as ...
The quantum theory of scattering is discussed from the point of view of a time independent formulati...
Several path integral representations for the T-matrix in nonrelativistic potential scattering are g...
A method is proposed for reducing the complexity of scattering calculations carried out using the Ko...
The Schwinger variational principle for the scattering amplitude is applied to the study of various ...
AbstractHoffman, Kouri, and collaborators have calculated nonrelativistic quantum scattering amplitu...
A new procedure, the variational method, is proposed for the evaluation of Regge trajeotories from t...
We derive an alternative representation for the relativistic non--local kinetic energy operator and ...
This thesis consists of two independent parts, both of which are applications of the quantum mechani...
We propose a variational method for scattering in which the functional is of a fractional form as fo...
Corrections to the primitive semi-classical amplitude for multiple inelastic scattering are obtained...
We present a path-integral solution for the exact propagation of the Wigner distribution in phase sp...
The present paper developed two kinds of new time-dependent methods in quantum scattering calculatio...