/ 01 08 02 2 v 1 6 A ug 2 00 1 QUANTUM TRAJECTORIES

  • A . Bouda, T . Djama, Laboratoire de Physique Théorique
  • Published 2008

Abstract

Through the constant potential, the linear potential and the harmonic oscillator, we show in one dimension that to each classical trajectory there is a family of quantum trajectories which all pass through some points constituting nodes and belonging to the classical trajectory. We also discuss the generalization to any potential and give a new definition for de Broglie’s wavelength in such a way as to link it with the length separating adjacent nodes. In particular, we show how quantum trajectories have as a limit when h̄ → 0 the classical ones. PACS: 03.65.Bz; 03.65.Ca

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Cite this paper

@inproceedings{Bouda200800, title={/ 01 08 02 2 v 1 6 A ug 2 00 1 QUANTUM TRAJECTORIES}, author={A . Bouda and T . Djama and Laboratoire de Physique Th{\'e}orique}, year={2008} }