中文

Space-Adiabatic Perturbation Theory

数学物理 2007-05-23 v3 math.MP

摘要

We study approximate solutions to the Schr\"odinger equation i\epsiψt(x)/t=H(x,i\epsix)ψt(x)i\epsi\partial\psi_t(x)/\partial t = H(x,-i\epsi\nabla_x) \psi_t(x) with the Hamiltonian given as the Weyl quantization of the symbol H(q,p)H(q,p) taking values in the space of bounded operators on the Hilbert space \Hif\Hi_{\rm f} of fast ``internal'' degrees of freedom. By assumption H(q,p)H(q,p) has an isolated energy band. Using a method of Nenciu and Sordoni \cite{NS} we prove that interband transitions are suppressed to any order in \epsi\epsi. As a consequence, associated to that energy band there exists a subspace of L2(Rd,\Hif)L^2(\mathbb{R}^d,\Hi _{\rm f}) almost invariant under the unitary time evolution. We develop a systematic perturbation scheme for the computation of effective Hamiltonians which govern approximately the intraband time evolution. As examples for the general perturbation scheme we discuss the Dirac and Born-Oppenheimer type Hamiltonians and we reconsider also the time-adiabatic theory.

关键词

引用

@article{arxiv.math-ph/0201055,
  title  = {Space-Adiabatic Perturbation Theory},
  author = {Gianluca Panati and Herbert Spohn and Stefan Teufel},
  journal= {arXiv preprint arXiv:math-ph/0201055},
  year   = {2007}
}

备注

49 pages