Antibound poles in cut-off Woods-Saxon and strictly finite-range potentials

Autor: J. Darai, Péter Salamon, R. G. Lovas, Anett Racz
Jazyk: angličtina
Rok vydání: 2012
Předmět:
Popis: The motion of l=0 antibound poles of the S-matrix with varying potential strength is calculated in a cutoff Woods-Saxon (WS) potential and in the Salamon-Vertse (SV) potential, which goes to zero smoothly at a finite distance. The pole position of the antibound states as well as of the resonances depend on the cutoff radius, especially for higher node numbers. The starting points (at potential zero) of the pole trajectories correlate well with the range of the potential. The normalized antibound radial wave functions on the imaginary k-axis below and above the coalescence point have been found to be real and imaginary, respectively.
Databáze: OpenAIRE