It is shown that the "geometrical phase factor" recently found by Berry in his study of the quantum adiabatic theorem is precisely the holonomy in a Hermitian line bundle since the adiabatic theorem naturally defines a connection in such a bundle. This not only takes the mystery out of Berry's phase factor and provides calculational simple formulas, but makes a connection between Berry's work and that of Thouless et al. This connection allows the author to use Berry's ideas to interpret the integers of Thouless et al. in terms of eigenvalue degeneracies
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
The adiabatic theorem states that if the Hamiltonian of a quantum system is changed sufficiently slo...
AbstractBerry's phase is the holonomy of the natural connection on the canonical circle bundle over ...
It is shown that the "geometrical phase factor" recently found by Berry in his study of the quantum ...
Holonomy in nonrelativistic quantum mechanics is examined in the context of the adiabatic theorem. T...
We present a formal geometric framework for the study of adiabatic quantum mechanics for arbitrary f...
We give a simplified proof of the quantum adiabatic theorem for a system of possibly degenerate Hami...
Journal ArticleRecently, Berry recognized in quantum mechanics a topological phase factor arising fr...
We propose a new formula for the adiabatic Berry phase which is based on phase-space formulation of ...
We investigate the phase relation among different eigenstates of a parameterized Hamiltonian evolvin...
The recent discovery of inconsistency (MS inconsistency) in the adiabatic approximation is discussed...
During the last few years, considerable interest has been focused on the phase that waves accumulate...
Journal ArticleIt is pointed out that, contrary to naive expectation, the gauge structure or Berry c...
A wave function picks up, in addition to the dynamic phase, the geometric (Berry) phase when travers...
Berry's phase is calculated as a term in the derivative expansion of the effective action of a syst...
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
The adiabatic theorem states that if the Hamiltonian of a quantum system is changed sufficiently slo...
AbstractBerry's phase is the holonomy of the natural connection on the canonical circle bundle over ...
It is shown that the "geometrical phase factor" recently found by Berry in his study of the quantum ...
Holonomy in nonrelativistic quantum mechanics is examined in the context of the adiabatic theorem. T...
We present a formal geometric framework for the study of adiabatic quantum mechanics for arbitrary f...
We give a simplified proof of the quantum adiabatic theorem for a system of possibly degenerate Hami...
Journal ArticleRecently, Berry recognized in quantum mechanics a topological phase factor arising fr...
We propose a new formula for the adiabatic Berry phase which is based on phase-space formulation of ...
We investigate the phase relation among different eigenstates of a parameterized Hamiltonian evolvin...
The recent discovery of inconsistency (MS inconsistency) in the adiabatic approximation is discussed...
During the last few years, considerable interest has been focused on the phase that waves accumulate...
Journal ArticleIt is pointed out that, contrary to naive expectation, the gauge structure or Berry c...
A wave function picks up, in addition to the dynamic phase, the geometric (Berry) phase when travers...
Berry's phase is calculated as a term in the derivative expansion of the effective action of a syst...
We are accustomed to think the phase of single particle states does not matter. After all, the phase...
The adiabatic theorem states that if the Hamiltonian of a quantum system is changed sufficiently slo...
AbstractBerry's phase is the holonomy of the natural connection on the canonical circle bundle over ...