Journal article
TDHF equations of motion for algebraic hamiltonians in a coherent state representation
Physics letters. B, v 90(4), pp 327-330
1980
Abstract
Time-dependent Hartee-Fock (TDHF) equations are derived for nuclear systems with internal dynamical group U(
r). The coordinates which appear in the TDHF equations are the coordinates which parameterize the U(
r) coherent states. The TDHF orbits for the hamiltonian
H
are identical with equations of motion for a classical system described by the hamiltonian function 〈
H
〉 obtained directly from the operator
H
. This quantum-classical correspondence facilitates interpretation of TDHF orbits. The phenomena of coexistence and critical elongation are discusses, as is the relation between the critical points of the function 〈
H
〉 and the spectral properties fo the operator
H
.
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Details
- Title
- TDHF equations of motion for algebraic hamiltonians in a coherent state representation
- Creators
- Da Hsuan Feng - The Niels Bohr Institute, University of Copenhagen, DK-2100 Copenhagen ∅, DenmarkRobert Gilmore - Institute For Defense Analyses
- Publication Details
- Physics letters. B, v 90(4), pp 327-330
- Publisher
- Elsevier
- Resource Type
- Journal article
- Language
- English
- Academic Unit
- [Retired Faculty]
- Scopus ID
- 2-s2.0-0039616792
- Other Identifier
- 991019173944804721