Exploration of resonances by analytic continuation in the coupling constant

1 July 1997

journal article
research article
Published by American Physical Society (APS) in Physical Review C

Vol. 56 (1) , 562-565
https://doi.org/10.1103/physrevc.56.562

Abstract

The energy and the width of resonance states are determined by analytic continuation of bound-state energies as a function of the coupling constant (potential strength). The advantage of the method is that the existing techniques for calculation of bound states can be applied, without any modifications, to determine the position of resonances. Various numerical examples show the applicability of the method for three-body systems, including the excited states of the

^{6}

He and

^{6}

Li.

Keywords

All Related Versions

Version 1, 1997-03-18, ArXiv

This publication has 13 references indexed in Scilit:

Precise solution of few-body problems with the stochastic variational method on a correlated Gaussian basis
Physical Review C, 1995
Three-body resonances in ${}^{6}{He}$ , ${}^{6}{Li}$ , and ${}^{6}{Be}$ , and the soft dipole mode problem of neutron halo nuclei
Physical Review C, 1994
α-dresonances and the low-lying states of ${}^{6}{Li}$
Physical Review C, 1992
Back-rotation of the wave function in the complex scaling method
Physical Review A, 1990
The method of complex coordinate rotation and its applications to atomic collision processes
Physics Reports, 1983
Gamow, a program for calculating the resonant state solution of the radial Schrödinger equation in an arbitrary optical potential
Computer Physics Communications, 1982
Three-body resonances in theLi6nucleus
Physical Review C, 1980
A stochastic variational method for few-body systems
Journal of Physics G: Nuclear Physics, 1977
Description of few-body systems via analytical continuation in coupling constant
Journal of Physics A: General Physics, 1977
Stabilization Method of Calculating Resonance Energies: Model Problem
Physical Review A, 1970