中文

Coherent states, Path integral, and Semiclassical approximation

高能物理 - 理论 2010-11-01 v2

摘要

Using the generalized coherent states we argue that the path integral formulae for SU(2)SU(2) and SU(1,1)SU(1,1) (in the discrete series) are WKB exact,if the starting point is expressed as the trace of eiTH^e^{-iT\hat H} with H^\hat H being given by a linear combination of generators. In our case,WKB approximation is achieved by taking a large ``spin'' limit: J,KJ,K\rightarrow \infty. The result is obtained directly by knowing that the each coefficient vanishes under the J1J^{-1}(K1K^{-1}) expansion and is examined by another method to be legitimated. We also point out that the discretized form of path integral is indispensable, in other words, the continuum path integral expression leads us to a wrong result. Therefore a great care must be taken when some geometrical action would be adopted, even if it is so beautiful, as the starting ingredient of path integral.

关键词

引用

@article{arxiv.hep-th/9409116,
  title  = {Coherent states, Path integral, and Semiclassical approximation},
  author = {K. Funahashi and T. Kashiwa and S. Sakoda and K. Fujii},
  journal= {arXiv preprint arXiv:hep-th/9409116},
  year   = {2010}
}

备注

latex 33 pages and 2 figures(uuencoded postscript file), KYUSHU-HET-19 We have corrected the proof of the WKB-exactness in the section 3