中文

A Canonical Quantization of the Baker's Map

量子物理 2009-10-31 v1

摘要

We present here a canonical quantization for the baker's map. The method we use is quite different from that used in Balazs and Voros (ref. \QCITE{cite}{}{BV}) and Saraceno (ref. \QCITE{cite}{}{S}). We first construct a natural ``baker covering map'' on the plane \QTOmathbbR2\QTO{mathbb}{\mathbb{R}}^{2}. We then use as the quantum algebra of observables the subalgebra of operators on L2(\QTOmathbbR)L^{2}(\QTO{mathbb}{\mathbb{R}}) generated by {exp(2πix^),exp(2πip^)}\left\{\exp (2\pi i\hat{x}) ,\exp (2\pi i\hat{p}) \right\} . We construct a unitary propagator such that as 0\hbar \to 0 the classical dynamics is returned. For Planck's constant h=1/Nh=1/N, we show that the dynamics can be reduced to the dynamics on an NN-dimensional Hilbert space, and the unitary N×NN\times N matrix propagator is the same as given in ref. \QCITE{cite}{}{BV} except for a small correction of order hh. This correction is shown to preserve the classical symmetry x1xx\to 1-x and p1pp\to 1-p in the quantum dynamics for periodic boundary conditions.

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引用

@article{arxiv.quant-ph/9807045,
  title  = {A Canonical Quantization of the Baker's Map},
  author = {Ron Rubin and Nathan Salwen},
  journal= {arXiv preprint arXiv:quant-ph/9807045},
  year   = {2009}
}

备注

27 pages, 3 figures. Annals of Physics, to appear