中文

The Quantum Adiabatic Approximation and the Geometric Phase

高能物理 - 理论 2009-10-30 v1

摘要

A precise definition of an adiabaticity parameter ν\nu of a time-dependent Hamiltonian is proposed. A variation of the time-dependent perturbation theory is presented which yields a series expansion of the evolution operator U(τ)=U()(τ)U(\tau)=\sum_\ell U^{(\ell)}(\tau) with U()(τ)U^{(\ell)}(\tau) being at least of the order ν\nu^\ell. In particular U(0)(τ)U^{(0)}(\tau) corresponds to the adiabatic approximation and yields Berry's adiabatic phase. It is shown that this series expansion has nothing to do with the 1/τ1/\tau-expansion of U(τ)U(\tau). It is also shown that the non-adiabatic part of the evolution operator is generated by a transformed Hamiltonian which is off-diagonal in the eigenbasis of the initial Hamiltonian. Some related issues concerning the geometric phase are also discussed.

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引用

@article{arxiv.hep-th/9606053,
  title  = {The Quantum Adiabatic Approximation and the Geometric Phase},
  author = {Ali Mostafazadeh},
  journal= {arXiv preprint arXiv:hep-th/9606053},
  year   = {2009}
}

备注

uuencoded LaTeX file, 19 pages