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On a generalized Aharonov-Bohm plus oscillator system

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Abstract

Dynamical algebras, of the so(3,2) and so(3) types, are obtained for a generalized Aharonov-Bohm plus oscillator (ABO) system. Two types of coherent states are introduced for this generalized ABO system. A (q,p)-analogue of this system is proposed that reduces to the generalized ABO system in the limiting case p=q{sup -1}=1. Finally, the classical motions for the generalized ABO system are briefly described. (author) 39 refs.
Authors:
Publication Date:
Jun 01, 1993
Product Type:
Technical Report
Report Number:
LYCEN-9327
Reference Number:
SCA: 661100; PA: AIX-25:023397; EDB-94:058526; ERA-19:013372; NTS-94:016603; SN: 94001172333
Resource Relation:
Other Information: DN: Submitted to Physics Letters, (Section) A (NL).; PBD: Jun 1993
Subject:
71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; AHARONOV-BOHM EFFECT; DYNAMICAL GROUPS; OSCILLATORS; ALGEBRA; ANNIHILATION OPERATORS; EIGENSTATES; 661100; CLASSICAL AND QUANTUM MECHANICS
OSTI ID:
10136908
Research Organizations:
Lyon-1 Univ., 69 - Villeurbanne (France). Inst. de Physique Nucleaire
Country of Origin:
France
Language:
English
Other Identifying Numbers:
Other: ON: DE94618369; TRN: FR9400479023397
Availability:
OSTI; NTIS (US Sales Only); INIS
Submitting Site:
FRN
Size:
14 p.
Announcement Date:
Jul 05, 2005

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Citation Formats

Kibler, M, and Campigotto, C. On a generalized Aharonov-Bohm plus oscillator system. France: N. p., 1993. Web.
Kibler, M, & Campigotto, C. On a generalized Aharonov-Bohm plus oscillator system. France.
Kibler, M, and Campigotto, C. 1993. "On a generalized Aharonov-Bohm plus oscillator system." France.
@misc{etde_10136908,
title = {On a generalized Aharonov-Bohm plus oscillator system}
 author = {Kibler, M, and Campigotto, C}
 abstractNote = {Dynamical algebras, of the so(3,2) and so(3) types, are obtained for a generalized Aharonov-Bohm plus oscillator (ABO) system. Two types of coherent states are introduced for this generalized ABO system. A (q,p)-analogue of this system is proposed that reduces to the generalized ABO system in the limiting case p=q{sup -1}=1. Finally, the classical motions for the generalized ABO system are briefly described. (author) 39 refs.}
 place = {France}
 year = {1993}
 month = {Jun}
 }