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Quantum chaos in the two-center shell model

Technical Report:

Abstract

Within an axially symmetric two-center shell model single-particle levels with ..cap omega.. = 1/2 are analyzed with respect to their level-spacing distributions and avoided level crossings as functions of the shape parameters. Only for shapes sufficiently far from any additional symmetry, ideal Wigner distributions are found as signature for quantum chaos.
Publication Date:
Mar 01, 1989
Product Type:
Technical Report
Report Number:
GSI-89-25(prepr.)
Reference Number:
DEN-89-005849; EDB-89-074914
Subject:
73 NUCLEAR PHYSICS AND RADIATION PHYSICS; SHELL MODELS; STOCHASTIC PROCESSES; ADIABATIC APPROXIMATION; AXIAL SYMMETRY; COLLECTIVE MODEL; ENERGY LEVELS; ENERGY-LEVEL DENSITY; HAMILTONIANS; NUCLEAR DEFORMATION; NUCLEAR MOLECULES; NUCLEAR STRUCTURE; WIGNER DISTRIBUTION; DEFORMATION; MATHEMATICAL MODELS; MATHEMATICAL OPERATORS; NUCLEAR MODELS; QUANTUM OPERATORS; SYMMETRY; 653001* - Nuclear Theory- Nuclear Structure, Moments, Spin, & Models
OSTI ID:
6065951
Research Organizations:
Gesellschaft fuer Schwerionenforschung m.b.H., Darmstadt (Germany, F.R.)
Country of Origin:
Germany
Language:
English
Availability:
Gesellschaft fuer Schwerionenforschung m.b.H., Darmstadt (Germany, F.R.).
Submitting Site:
DEN
Size:
Pages: 13
Announcement Date:

Technical Report:

Citation Formats

Milek, B, Noerenberg, W, and Rozmej, P. Quantum chaos in the two-center shell model. Germany: N. p., 1989. Web.
Milek, B, Noerenberg, W, & Rozmej, P. Quantum chaos in the two-center shell model. Germany.
Milek, B, Noerenberg, W, and Rozmej, P. 1989. "Quantum chaos in the two-center shell model." Germany.
@misc{etde_6065951,
title = {Quantum chaos in the two-center shell model}
author = {Milek, B, Noerenberg, W, and Rozmej, P}
abstractNote = {Within an axially symmetric two-center shell model single-particle levels with ..cap omega.. = 1/2 are analyzed with respect to their level-spacing distributions and avoided level crossings as functions of the shape parameters. Only for shapes sufficiently far from any additional symmetry, ideal Wigner distributions are found as signature for quantum chaos.}
place = {Germany}
year = {1989}
month = {Mar}
}