Semiclassical propagation of coherent states / Propagação semiclassica de estados coerentes
AUTOR(ES)
Fernando Roberto de Luna Parisio Filho
DATA DE PUBLICAÇÃO
2005
RESUMO
This thesis addresses di®erent aspects of the semiclassical propagation of coherent states. We have derived a general expression for the propagator connecting these states which, di®erently from previous formulae in the literature, is valid for packets of arbitrary widths. The result, obtained via functional integration, depends on classical trajectories in a complex phase space. Approximations based on real orbits are also analyzed and it is demonstrated that the Heller and BAKKS Gaussian propagators belong to the same category. Next we make a detailed study of the semiclassical propagation of coherent states in the position representation. The obtained formal results are applied to the case of a Gaussian packet under the influence of a smooth repulsive potential. For this system the solution of Hamilton s equations and the semiclassical wave function can be expressed analytically. The problem of non-contributing solutions, which originates from the application of the stationary exponent method, is solved by the introduction of some criteria of physical consistency. The e®ects of caustics in phase space, points where the lowest order semiclassical approximation diverges, are controlled by introducing corrections involving Airy functions
ASSUNTO(S)
fisica matematica mathematical physics estados coerentes limite semiclassico coherent states semiclassical limit
