THE BERRY CONNECTION AND BORN-OPPENHEIMER METHOD

被引:39
作者
BOHM, A
KENDRICK, B
LOEWE, ME
BOYA, LJ
机构
[1] Center for Particle Theory, University of Texas at Austin, Austin
来源
JOURNAL OF MATHEMATICAL PHYSICS | 1992年 / 33卷 / 03期
关键词
D O I
10.1063/1.529751
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
By performing the most general Born-Oppenheimer procedure, the (non-Abelian) Berry connection for quantum systems in a quantum environment is derived. This method is then applied to the rapid rotation of a particle about a slowly changing axis, as exemplified by the electronic motion of a diatomic molecule. The angular part of the resulting dynamics for the quantum environment is equivalent to that of a monopole.
引用
收藏
页码:977 / 989
页数:13
相关论文
共 27 条
[1]   PHASE-CHANGE DURING A CYCLIC QUANTUM EVOLUTION [J].
AHARONOV, Y ;
ANANDAN, J .
PHYSICAL REVIEW LETTERS, 1987, 58 (16) :1593-1596
[2]   GEOMETRIC QUANTUM PHASE AND ANGLES [J].
ANANDAN, J ;
AHARONOV, Y .
PHYSICAL REVIEW D, 1988, 38 (06) :1863-1870
[3]  
Berry M. V., 1989, GEOMETRIC PHASES PHY
[4]   QUANTAL PHASE-FACTORS ACCOMPANYING ADIABATIC CHANGES [J].
BERRY, MV .
PROCEEDINGS OF THE ROYAL SOCIETY OF LONDON SERIES A-MATHEMATICAL AND PHYSICAL SCIENCES, 1984, 392 (1802) :45-57
[5]   THE BORN-OPPENHEIMER ELECTRIC GAUGE FORCE IS REPULSIVE NEAR DEGENERACIES [J].
BERRY, MV ;
LIM, R .
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 1990, 23 (13) :L655-L657
[6]  
BERRY MV, 1989, GEOMETRIC PHASES PHY, P14
[7]  
BOHM A, 1989, SYMMETRY SCI, V3, P85
[8]  
BOHM A, 1986, QUANTUM MECHANICS, V5
[9]  
Born M, 1927, ANN PHYS-BERLIN, V84, P0457
[10]  
Born M., 1956, DYNAMICAL THEORY CRY
123