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On the Herman-Kluk Semiclassical Approximation

Mathematical Physics 2015-05-13 v1 math.MP

Abstract

For a subquadratic symbol HH on Rd×Rd=T(Rd)\R^d\times\R^d = T^*(\R^d), the quantum propagator of the time dependent Schr\"odinger equation iψt=H^ψi\hbar\frac{\partial\psi}{\partial t} = \hat H\psi is a Semiclassical Fourier-Integral Operator when H^=H(x,Dx)\hat H=H(x,\hbar D_x) (\hbar-Weyl quantization of HH). Its Schwartz kernel is describe by a quadratic phase and an amplitude. At every time tt, when \hbar is small, it is "essentially supported" in a neighborhood of the graph of the classical flow generated by HH, with a full uniform asymptotic expansion in \hbar for the amplitude. In this paper our goal is to revisit this well known and fondamental result with emphasis on the flexibility for the choice of a quadratic complex phase function and on global L2L^2 estimates when \hbar is small and time tt is large. One of the simplest choice of the phase is known in chemical physics as Herman-Kluk formula. Moreover we prove that the semiclassical expansion for the propagator is valid for t<<14δlog| t| << \frac{1}{4\delta}|\log\hbar| where δ>0\delta>0 is a stability parameter for the classical system.

Keywords

Cite

@article{arxiv.0908.0847,
  title  = {On the Herman-Kluk Semiclassical Approximation},
  author = {Didier Robert},
  journal= {arXiv preprint arXiv:0908.0847},
  year   = {2015}
}
R2 v1 2026-06-21T13:33:03.615Z