A Canonical Quantization of the Baker's Map
Abstract
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 . We then use as the quantum algebra of observables the subalgebra of operators on generated by . We construct a unitary propagator such that as the classical dynamics is returned. For Planck's constant , we show that the dynamics can be reduced to the dynamics on an -dimensional Hilbert space, and the unitary matrix propagator is the same as given in ref. \QCITE{cite}{}{BV} except for a small correction of order . This correction is shown to preserve the classical symmetry and in the quantum dynamics for periodic boundary conditions.
Cite
@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}
}
Comments
27 pages, 3 figures. Annals of Physics, to appear